Method and system for gear engagement

TECHNICAL FIELD

The disclosure relates to a method for motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence. The disclosure also relates to a corresponding system. The method and system according to the disclosure can typically be implemented in a stepped gear transmission of the vehicle, such as a car.

Although the disclosure will be described in relation to a car, the disclosure is not restricted to this particular vehicle, but may as well be installed in other type of vehicles such as minivans, recreational vehicles, off-road vehicles, trucks, buses or the like.

BACKGROUND

For gear shifting in for example hybrid vehicles dual clutch transmissions (DCT) and automated manual transmissions (AMT) are often used. DCT and AMT are stepped gear transmission that for example may use conventional mechanical synchronization systems, operated for example by automated electrically, hydraulically or pneumatically operated shifting actuators. Alternatively, or in combination with mechanical synchronisers, one or more electrical motors may be used for performing the desired speed synchronisation.

The high-level gear shifting process can for example be divided into following phases:

1. Torque ramp down

2. Sleeve to Neutral

3. Speed Synchronization

4. Sleeve to Gear Engagement

5. Torque Ramp up.

The quality of gear shift as perceived by driver depends on various factors, such as for example the gear shift time taken from torque ramp down to torque ramp up and noise caused by the gear shifting process. Moreover, the overall reliability and life span of the transmission is also an important quality factor for the driver.

Despite the activities in the field, there is still a demand for a further improved gear shifting control method that contributes to quicker gear shifts, reduced gear shift noise and improved transmission reliability.

SUMMARY

This section provides a general summary of the disclosure, and is not a comprehensive disclosure of its full scope or all of its features.

Throughout the last decades, reducing emissions has been the main focus of the automotive industry. Also, the introduction of stricter legislation during the recent years has made the hybridization even more popular. The introduction of electric motors (EM) for traction in the vehicles have significantly reduced the usage of internal combustion engines (ICE). ICE is one of the main source of noise in the vehicle. When the usage of ICE is decreased other noise sources in the vehicle, which were not deemed important in the past become more emphasized. One specific noise source is noise generation during gear shifting, in particular noise caused by mechanical interference and impact between shift sleeve teeth and gear wheel teeth. Moreover, such teeth interference and impacts are also responsible for delaying the completion of shift and contributing to wear of the dog teeth, hence reducing the lifespan of the transmission.

An object of the present disclosure is consequently to provide a gearshift synchronisation and engagement control method that enables reduced amount of mechanical interference and impact between shift sleeve teeth and gear wheel teeth during gear shift.

This and other objects are at least partly achieved by a control method and system as defined in the accompanying independent claims.

In particular, according to a first aspect of the present disclosure, the objective is at least partly achieved by a method for motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence for avoiding gear teeth interference, wherein the stepped gear transmission comprises an axially displaceable shift sleeve arranged on and rotationally secured to a shaft, and a constant mesh gear wheel arranged on and rotatable relative to said shaft.

The method comprising:

- receiving a gear shift command,
- determining a first phase plane trajectory defining a relationship between a rotational speed difference between the shift sleeve and the gear wheel and a relative displacement between the sleeve teeth and gear teeth, wherein the relative displacement according to the first phase plane trajectory equals the target relative displacement when said rotational speed difference becomes zero at the end of the synchronisation phase,
- determining a second phase plane trajectory defining the relationship between the rotational speed difference between the shift sleeve and the gear wheel and the relative displacement between the sleeve teeth and gear teeth, wherein the relative displacement according to the second phase plane trajectory equals the target relative displacement when said rotational speed difference becomes zero at the end of the synchronisation phase, applying a synchronisation torque, and
- controlling said synchronisation torque for keeping the real relative displacement between the sleeve teeth and gear teeth within the boundaries of the first and second phase plane trajectories for any rotational speed difference, such that the real relative displacement between the sleeve teeth and gear teeth reaches said target relative displacement simultaneously with said rotational speed difference becomes zero at the end of the synchronisation phase.

Moreover, according to a second aspect of the present disclosure, the objective is also at least partly achieved by a method for motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence for avoiding gear teeth interference, wherein the stepped gear transmission comprises an axially displaceable shift sleeve arranged on and rotationally secured to a shaft, and a constant mesh gear wheel arranged on and rotatable relative to said shaft.

The method comprising:

- receiving a gear shift command,
- determining a target relative displacement between the sleeve teeth and gear teeth for a state when a gear wheel rotational speed reaches a shift sleeve rotational speed at the end of a synchronisation phase, which target relative displacement is determined for avoiding impact between sleeve teeth and gear teeth during a following gear engagement phase,
- determining a starting relative displacement between the sleeve teeth and gear teeth that causes the shift sleeve and gear wheel to reach said target relative displacement simultaneously with said rotational speed difference becomes zero at the end of the synchronisation phase when applying a synchronisation torque from the start to the end of a synchronisation phase, and
- starting to apply said synchronisation torque when the real relative displacement reaches said starting relative displacement.

Moreover, according to a third aspect of the present disclosure, the objective is also at least partly achieved by control system for motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence for avoiding gear teeth interference, wherein the stepped gear transmission comprises an axially displaceable shift sleeve arranged on and rotationally secured to a shaft, and a constant mesh gear wheel arranged on and rotatable relative to said shaft.

The control system being configured for performing the following steps:

- receiving a gear shift command,
- determining a target relative displacement between the sleeve teeth and gear teeth for a state when a gear wheel rotational speed reaches a shift sleeve rotational speed at an end of the synchronisation phase, which target relative displacement is determined for avoiding impact between sleeve teeth and gear teeth during a following gear engagement phase,
- determining a first phase plane trajectory defining a relationship between a rotational speed difference between the shift sleeve and the gear wheel and a relative displacement between the sleeve teeth and gear teeth, wherein the relative displacement according to the first phase plane trajectory equals the target relative displacement when said rotational speed difference becomes zero at the end of the synchronisation phase,
- determining a second phase plane trajectory defining the relationship between the rotational speed difference between the shift sleeve and the gear wheel and the relative displacement between the sleeve teeth and gear teeth, wherein the relative displacement according to the second phase plane trajectory equals the target relative displacement when said rotational speed difference becomes zero at the end of the synchronisation phase,
- applying a synchronisation torque,
- controlling said synchronisation torque for keeping the real relative displacement between the sleeve teeth and gear teeth within the boundaries of the first and second phase plane trajectories for any rotational speed difference, such that the real relative displacement between the sleeve teeth and gear teeth reaches said target relative displacement simultaneously with said rotational speed difference becomes zero at the end of the synchronisation phase.

In this way, due to the fact that synchronisation and gear engagement process is performed basically without, or at least with reduced amount of mechanical interference and impact between shift sleeve teeth and gear wheel teeth during gear shift, the gear shift process generates less noise, goes more swiftly and generates less teeth wear. Moreover, the method and system does not require any significant increase of processing power and may this be implemented in conventional electronic transmission controllers, and generally also using existing and conventional shift actuators, such as for example an electro-mechanical shift actuator.

Further advantages are achieved by implementing one or several of the features of the dependent claims.

In one example embodiment, the method comprises controlling said synchronisation torque by a closed loop controller for keeping the real relative displacement between the sleeve teeth and gear teeth within the boundaries of the first and second phase plane trajectories. Thereby inaccuracies in detection of the real relative displacement between sleeve teeth and gear teeth can be taken care of.

In one example embodiment, the closed loop controller is an on-off controller. This enables a cost-efficient implementation without need for new types of synchronisation actuators.

In a further example embodiment, the step of determining the first phase plane trajectory is based on application of a first angular acceleration, and the step of determining the second phase plane trajectory is based on application of a second reduced angular acceleration that is lower than the first angular acceleration, or based on deriving the second phase plane trajectory from the first phase plane trajectory and an offset. Thereby two converging phase plane trajectories are provided, whereby when the detected real relative displacement between sleeve teeth and gear teeth is accurate the real relative displacement between sleeve teeth and gear teeth will follow the first phase plane trajectory with no or very few synchronisation torque interruptions.

In some example embodiments, the step of determining the first angular acceleration involves taking into account a rotational speed dependent drag torque. The drag torque acting on a gear wheel assembly in a transmission, caused for example by lubrication losses, sealing friction, churning, etc. is generally rotational speed dependent, and by taking the rotational speed dependent drag torque into account when determining the first angular acceleration, a more accurate calculation of the first phase plane trajectory is accomplished, thereby enabling improved gear engagement at the end of a synchronisation sequence.

In still a further example embodiment, the relative displacement according to the second phase plane trajectory is smaller or equal to the relative displacement of the first phase plane trajectory minus a maximal relative displacement at the rotational speed difference when the closed loop controller is configured to start. Thereby it is ensured that the real relative displacement between sleeve teeth and gear teeth located within the scope of the first and second phase plane trajectories at start of the closed loop control, irrespective of accuracy of the detection of said real relative displacement.

In one example embodiment, the method comprises determining said first and second phase plane trajectories by performing one or more backward in time calculations starting from the time point when said rotational speed difference becomes zero at the end of the synchronisation phase and ending at a predetermined rotational speed difference based on a predetermined gear shift map, wherein the phase plane trajectories are stored in lookup tables in a computer memory for enabling prompt access by an electronic transmission controller. Thereby online calculations is drastically reduced and the processing requirements of the transmission controller is kept relatively low.

In one example embodiment, each of the first and second phase plane trajectories extends between a rotational speed difference corresponding to the start of the synchronisation phase to the state when said rotational speed difference becomes zero at the end of the synchronisation phase, and the method comprising operating said closed loop controller from the beginning to the end of the first and second phase plane trajectories. Thereby potential corrections of the real relative displacement with respect to rotational speed difference for better conformity with the first phase plane trajectory can be performed at an early stage when the rotational speed difference is still high, thereby enabling a short time delay and thus a quick gear shift.

In a further example embodiment, the method includes the step of, when the real relative displacement between the sleeve teeth and gear teeth at the rotational speed difference when the closed loop controller is configured to start controlling said synchronisation torque is larger than the relative displacement of the first trajectory at said rotational speed difference, shifting said first and second trajectories with an integer times a maximal relative displacement, such that the real relative displacement becomes located between an offset first trajectory and an offset second trajectory, and/or when the real relative displacement between the sleeve teeth and gear teeth at the rotational speed difference when the closed loop controller is configured to start controlling said synchronisation torque is smaller than the relative displacement of the second trajectory at said rotational speed difference, shifting said first and second trajectories with an integer times the maximal relative displacement, such that real relative displacement becomes located between an offset first trajectory and an offset second trajectory. Thereby it is ensured that the real relative displacement between sleeve teeth and gear teeth located within the scope of the first and second phase plane trajectories at start of the closed loop control, irrespective of accuracy of the detection of said real relative displacement.

In a further example embodiment, the method comprising operating two sequential controllers: an initial open loop controller and subsequently a closed loop controller, wherein operation of the open loop controller involves keeping the synchronisation torque zero or at a compensation torque level for as long as real relative displacement is different from a starting relative displacement, and applying the synchronisation torque as soon as the real relative displacement is equal to the starting relative displacement, and wherein operation of the closed loop controller involves controlling the synchronisation torque for keeping the real relative displacement within the boundaries of the first and second phase plane trajectories. This way a reliable, cost-efficient control method delivering quick gear shifts may be provided.

In still a further example embodiment, the closed loop controller for the purpose of keeping the real relative displacement within the boundaries of the first and second phase plane trajectories comprises:

- applying synchronisation torque and monitoring the real relative displacement and the rotational speed difference,
- if the real relative displacement falls below the second trajectory for any given rotational speed difference, stop applying the synchronisation torque, or start applying only a compensation torque in a direction opposite to drag torque,
- monitoring the real relative displacement, and start applying the synchronisation torque again when the real relative displacement is equal to the first trajectory for any given rotational speed difference, and
- reiterating above steps in same order until rotational speed difference becomes zero at the end of the synchronisation phase. Thereby a cost-efficient control method delivering quick gear shifts is provided that can be implemented using existing synchronisation actuators and control units.

In one example embodiment, the method comprises starting to apply said synchronisation torque substantially directly upon receiving the gear shift command and independent of current relative displacement between the sleeve teeth and gear teeth. Thereby the gear shift speed may be further increased.

In one example embodiment, the method comprises initiating the closed loop control first after at least 5%, specifically at least 25%, and more specifically at least 50%, of the total rotational speed difference between the shift sleeve and the gear wheel, from the start to the end of the synchronisation phase, has passed. Thereby also driver controlled gear shifting can be handled.

In a further example embodiment, the method involves determining the target relative displacement, a compensation torque applied on the gear wheel in a direction opposite to drag torque and a shift sleeve axial engagement speed, for any specific sleeve teeth and gear teeth geometry, such that the sleeve teeth is determined to enter in the space between neighboring gear teeth to maximal engagement depth substantially without mutual contact, and preferably with a sleeve teeth side surface near or in side contact with an opposite gear teeth side surface. Thereby, gear shifting with less gear impact may be provided, such that noise and wear is reduced and gear shift speed is increased.

In one example embodiment, the target relative displacement at the time point when said rotational speed difference becomes zero at the end of the synchronisation phase is calculated by:

y_sg*(t_synch)=y_sg(t_end)+R_g×0.5×{t_end²−t_synch²}×(T_comp−T_d)÷J_g

wherein the compensation torque is selected to fulfil the following criteria:

$T_{comp} - T_{d} = \frac{[y_{s g} (t_{s d c n t}) < y_{s g} s d \max] - y_{s g} s d \min}{R_{g} \times 0.5 \times {t_{e n d}^{2} - t_{s d c n t}^{2}} \div J_{g}}$

Thereby, gear shifting with less gear impact may be provided, such that noise and wear is reduced and gear shift speed is increased.

In one example embodiment, the method comprises determining a starting relative displacement between the sleeve teeth and gear teeth that causes the shift sleeve and gear wheel to reach said target relative displacement simultaneously with said rotational speed difference becomes zero at the end of the synchronisation phase when applying a synchronisation torque from the start to the end of a synchronisation phase, and starting to apply said synchronisation torque when the real relative displacement reaches said starting relative displacement. Thereby a straight-forwards and easily implemented gear shift control method is provided that enables gear shifting with less gear impact, reduced noise and wear and increased gear shift speed.

Further features of, and advantages with, the present disclosure will become apparent when studying the appended claims and the following description. The skilled person realize that different features of the present disclosure may be combined to create embodiments other than those described in the following, without departing from the scope of the present disclosure.

BRIEF DESCRIPTION OF THE DRAWINGS

The various example embodiments of the disclosure, including its particular features and example advantages, will be readily understood from the following illustrative and non-limiting detailed description and the accompanying drawings, in which:

FIG. 1A shows a side view of a vehicle having a control system for a transmission according to the disclosure;

FIG. 1B shows a schematic view of an example drive train on which the control method according to the disclosure may be implemented;

FIG. 2 shows a speed synchronization trajectory

FIG. 3 shows an example embodiment of a mechanical synchronizer and teeth representation

FIG. 4 shows an example illustration of unblocking of sleeve teeth

FIG. 5 shows an example embodiment of teeth geometry and frame definition

FIG. 6 shows an example embodiment of when relative displacement between sleeve and gear goes outside the limits

FIG. 7 shows an example embodiment of a sleeve engagement

FIG. 8 shows an example embodiment of sleeve tip point trajectory limits

FIG. 9 shows an example embodiment of y_sgat torque ramp up

FIG. 10 shows an example embodiment of a gear engagement model

FIG. 11 shows an example embodiment of a sleeve tip point trajectory with y_sg*(t_synch)

FIG. 12 shows an example embodiment of a sleeve tip point trajectories from batch simulation

FIG. 13 shows example embodiments a selected catch simulation results

FIG. 14 shows example embodiments of gear engagement times from batch simulations

FIG. 15 shows example embodiments of frontal contact force for selected batch simulations

FIG. 16 shows example embodiments of maximum frontal contact force for batch simulations

FIG. 17 shows an example embodiment of existence of multiple side contacts for batch simulations

FIG. 18 shows an example embodiment of a sleeve teeth position sensor added to shift fork

FIG. 19 shows an example embodiment of reading marks on sleeve

FIG. 20 shows an example embodiment of an idler gear dog teeth position sensor added to shift fork

FIG. 21 shows an example embodiment of a synchronizer with added teeth position sensors

FIG. 22 shows example embodiments of sensor output and teeth position

FIG. 23 shows an example embodiment of an algorithm for dog teeth position from velocity and sensor signal

FIG. 24 shows an example embodiment of a resulting y_gfrom ω_g=40→0 rad/sec

FIG. 25 shows an example embodiment of a sensor signal smoother for an upshift

FIG. 26 shows example embodiments of Sawtooth and Smoothened sensor signals

FIG. 27 shows an example embodiment of backwards in time simulation

FIG. 28 shows an example embodiment of a phase plane trajectory with Maximum α_gfor ω_sg(t₀)=−100 rad/sec and y_sg*(t_synch)=4.245 mm

FIG. 29 shows Open loop control block diagram

FIG. 30 shows an example embodiment of an open loop control logic for upshifts

FIG. 31 shows an example embodiment of an offset phase plane trajectory

FIG. 32 shows an example embodiment of an upshift speed synchronization trajectory after application of open loop control

FIGS. 33A-C show an example embodiment of an open loop control simulation

FIG. 34 shows an example embodiment of a phase plan trajectory for two accelerations

FIG. 35 shows an example embodiment of a closed loop controller arrangement

FIG. 36 shows an example embodiment of a closed loop control logic

FIG. 37 shows an example embodiment of a working principle of closed loop control logic

FIG. 38 shows example embodiments of offset phase plane trajectories

FIG. 39 shows an example embodiment of an upshift speed synchronization trajectory after application of open and close loop control

FIG. 40 shows example embodiments of Wait times for ω_sg

FIGS. 41A-D show an example embodiment of a closed loop control simulation,

FIGS. 42A-E show various phase plane trajectories according to a further alternative embodiment, and

FIGS. 43 and 44 show two further example embodiments of the backwards in time calculation.

DETAILED DESCRIPTION

The present disclosure will now be described more fully hereinafter with reference to the accompanying drawings, in which exemplary embodiments of the disclosure are shown. The disclosure may, however, be embodied in many different forms and should not be construed as limited to the embodiments set forth herein; rather, these embodiments are provided for thoroughness and completeness. Like reference characters refer to like elements throughout the description. The drawings are not necessarily to scale and certain features may be exaggerated in order to better illustrate and explain the exemplary embodiments of the present disclosure.

This disclosure presents a model based control strategy aimed to reduce noise and wear during gearshifts in conventional and hybrid Dual Clutch Transmissions (DCT and DCTH) and Automated Manual Transmissions (AMT). The control strategy is based on a dog teeth position sensors, rotational speed sensors in the transmission and a simulation model for gear engagement. During gear shifting, noise is generated because of impacts between the sleeve teeth and the idler gear dog teeth after speed synchronization. Besides noise, these impacts are also responsible for delaying the completion of shift and contribute to wear in the dog teeth, hence reducing the lifespan of the transmission.

The simulation model for gear engagement can simulate these impacts. Based on the simulation model and optimal control theory, an ideal dog teeth position trajectory is formulated that avoids the impact between sleeve and idler gear dog teeth, before the start of torque ramp up.

Consequently, based on the sensor information, a control strategy comprising one or two sequential controllers may be implemented, wherein the control strategy controls the gear actuator and/or an electric motor during speed synchronization such that the sleeve teeth never impact with idler gear dog teeth before the start of torque ramp up.

Specifically, according to some of the example embodiments of the disclosure, the strategy controls the synchronization torque during speed synchronization in such a way that the dog teeth position during shift is regulated to the ideal dog teeth position trajectory. Since the control strategy is based on optimal control theory, its effect on speed synchronization time is little or even minimal.

The control strategy is designed in such a way that it can easily be applied in the existing transmission control software. By applying the control strategy on the simulation model, it is shown that the impacts during gear engagement are reduced.

Referring now to FIG. 1A, there is depicted an example embodiment of a car 1 having propulsion power source 2, such as internal combustion engine (ICE) and/or an electric motor (EM), driving connected to driving wheels 3 of the car via a stepped gear transmission, i.e. a transmission with a plurality of discrete gears each having a unique gear ratio.

A schematic illustration of a simplified two-gear version of a drive line train 4 of automated manual transmission ATM is shown in FIG. 1B. The drive train comprises an ICE 2a, a clutch 5, a transmission 6 and a set of driving wheel 3. The transmission according to this example simplified embodiment has a main shaft 7, an input shaft 8, first constant mesh gear 9 having an initial gear ratio, a second constant mesh gear 10 having a target gear ratio, a final constant mesh gear 11 having a final drive ratio and a driveshaft 12, and an electrical motor 2b drivingly connected to the input shaft 8 via an electric motor gear ratio 13.

The first constant mesh gear 9 includes a gear 14 rotationally secured to the input shaft 8 and in constant mesh with a gear wheel 15 arranged on and rotatable relative to said main shaft 7, and the second constant mesh gear 10 includes a gear 16 rotationally secured to the input shaft 8 and in constant mesh with a gear wheel 17 arranged on and rotatable relative to said main shaft 7.

An axially displaceable shift sleeve 18 arranged on and rotationally secured to the main shaft 7 via a hub 19 comprises a set of sleeve teeth, also referred to as dog teeth or simply dogs, may be axially shifted by an axial force 25 providable by a shifting actuator (not showed) for engaging corresponding teeth, dog teeth or simply dogs of any of the associated gear wheels 15, 17 of the first and second constant mesh gears 9, 10 for selectively changing the total transmission ratio between the input shaft 8 and driveshaft 12.

The gear shift from initial gear ratio to target gear ratio contains two distinct phases.

1. Speed synchronization

2. Gear engagement

During speed synchronization, the speed ω_gof oncoming idler gear 17, or simply referred to as gear 17 henceforth, is matched with sleeve speed ω_s. As it can be seen from FIG. 1B, the sleeve 18 is rotationally connected to the wheels 3. It is assumed that the vehicle velocity v_vehwill remain constant during the gear shift since the vehicle 1 does not have much time to decelerate if the shift is fast. The angular velocity of driveshaft 12 will be

ω_{drive shaft}=v_veh÷R_w (1)

where R_wis the wheel radius. From ω_{drive shaft}in equation 1, ω_scan be calculated by

ω_s=ω_{drive shaft}×Final Drive Ratio (2)

The driveshaft 12 is assumed to be infinitely stiff, so there is no torsional degree of freedom between sleeve 18 and wheels 3.

At the start of speed synchronization at time t₀the velocity of gear ω_g(t₀) is calculated by

ω_g(t₀)=ω_s×(Initial Gear Ratio÷Target Gear Ratio) (3)

A synchronization torque T_synchis then applied on gear 17 such that its velocity at synchronization time t_synchis equal to ω_sfrom equation 2 as shown in FIG. 2, which shows speed synchronization trajectories.

T_synchcan be provided either by synchronizer ring and/or by electric motor as explained by [1]. The resulting angular acceleration α_gin oncoming idler gear 17 is calculated by for upshifts by

α_g=(−T_synch−T_d)÷J_g (4)

and for downshifts by

α_g=(T_synch−T_d)÷J_g (5)

where J_gis the inertia of idler gear 17, input shaft 8 and electric motor, and T_dis the drag torque caused for example on lubrication fluid within the transmission 6. Calculation of J_gdepends on whether the synchronization is done with synchronizer rings or electric motor as explained by [1].

The synchronization time t_synchcan be calculated by

t_synch=|ω_sg(t₀)÷α_g| (6)

where ω_sg(t₀) is relative velocity between sleeve and idler gear dog teeth at time t₀and is calculated by

ω_sg(t₀)=ω_s−ω_g(t₀) (7)

An example embodiment of a mechanical synchronizer and a teeth representation is shown in the left view of FIG. 3. The basic components of the mechanical synchronizer is hub 19 rotationally secured to main shaft 7 via splines, the shift sleeve 18 rotationally secured to and axially displaceable with respect to the hub 19, and the blocker ring 20 having a friction surface intended to cooperate with a friction surface of the gear wheel 17 for rotational speed synchronisation of the sleeve 18 and gear wheel 17. The sleeve 18 has sleeve teeth configured to engage with gear teeth 24 of the gear wheel 17.

Analysis of synchronizers becomes very convenient when each individual component is represented by its teeth as also shown in the right side of FIG. 3, which schematically shows the sleeve teeth 22, blocker ring teeth 23 and idler gear dog teeth 24.

FIG. 4 shows speeds and torques on individual teeth during transition between speed synchronization phase and gear engagement phase. At the end of speed synchronization phase at time t_synch(shown by dashed line in FIG. 4), relative velocity ω_sg(t_synch) between sleeve 18 and oncoming idler gear 17 is zero. This results in T_synchbecoming smaller than indexation torque T_I.

This reversal of torque relationship or “ring unblocking” is explained in detail in [2] when the speed synchronization is done by synchronizer rings in synchronizer. If speed synchronization is done by electric motor the torque balancing relationships explained in [2] must still be respected to avoid unblocking before speed synchronization. After the torque reversal, sleeve teeth 22 can push the blocker ring teeth 23 aside and move towards idler gear dog teeth 24 for engagement. Blocking position as explained by [3] is denoted by x_synchin FIG. 4. Axial force 25 applied on sleeve 18 by actuator mechanism is denoted by F_axand is explained more in detail in [1], which in included here by reference.

The sleeve axial velocity {dot over (x)}_sin gear engagement phase is assumed to be constant. Axial force 25 from actuator mechanism is responsible for maintaining {dot over (x)}_s. Actuator mechanism is designed to have enough axial force 25 to provide clamping torque for synchronizer rings in synchronizers. Compared to that, the axial force required to maintain a constant {dot over (x)}_sis very small so it is a valid assumption. Based on this assumption, the axial force 25 of actuator will not be discussed in subsequent sections and only {dot over (x)}_swill be dealt with.

At the end of speed synchronization ω_s(t_synch)=ω_g(t_synch), but as sleeve 18 moves forward from x_synch, synchronization torque T_synchon gear 17 disappears as explained in the previous section. Since drag torque is always present on the gear 17, at a time>t_synch, ω_g(time=t_synch)>ω_g(time>t_synch). It means that with time sleeve 18 and gear 17 will go increasingly out of synchronization. To compensate this behaviour, a compensation torque T_compis applied on idler gear 17 in the direction of ω_sand opposite to T_d. Compensation torque T_compmay for example be applied by the electric motor 2b and/or by a main clutch 5. Drag torque although is speed dependent but for such small intervals of time can be estimated to be a constant and its value can be extracted from the methods explained in [4]. The relation between T_comp, T_dand ω_g(t>t_synch) and ω_sis

$\begin{matrix} ω_{g} (time > t_{s y n c h}) is {\begin{matrix} > ω_{s} & if T_{comp} > T_{d} \\ < ω_{s} & if T_{comp} < T_{d} \\ = ω_{s} & if T_{comp} = T_{d} \end{matrix} & (8) \end{matrix}$

Teeth geometry of sleeve 18 and gear 17 are shown in left half of FIG. 5. The back angle on teeth is ignored since it affects disengagement and disengagement is not discussed here. It is also assumed that sleeve teeth 22 and gear dog teeth 24 have same teeth width w_dogand teeth half angle β as shown in FIG. 5. The tangential clearance between two meshed teeth is ct and it is measured when sleeve teeth 22 are engaged with gear dog teeth 24 as shown by dotted outline of sleeve teeth. The time when engagement is finished is denoted by t_endand it is measured when sleeve 18 has travelled a distance x_end. After sleeve 18 has reached x_endtorque ramp up can start. The trajectory 26 of tip point of sleeve dog 22 is shown by solid curve in FIG. 5.

The radial direction that is y-axis of left half of FIG. 5 goes from 0 to 360 degrees because sleeve 18 and gear 17 have independent radial movement in the absence of synchronization torque. The term “radial direction” refers herein to a circumferential direction of the sleeve 18 and gear 17. If the radial direction is divided into windows shown by dotted rectangle of width x_synchto x_endand height y_sgmax such that

y_sgmax=2×w_dog+ct (9)

Then the trajectory 26 of tip point of sleeve teeth is same in each window as shown in FIG. 5. By using this convention y-axis can be changed to circumferential relative displacement y_sgbetween sleeve 18 and gear 17, whose limits are between 0 to maximal circumferential relative displacement y_sgmax, as measured for example in millimetres. The term circumferential relative displacement y_sgused herein may alternatively be referred to as radial relative displacement.

Since maximal circumferential relative displacement y_sgmax is the distance between two consecutive teeth tips following holds

y_sgmax=2π×R_g÷n_dog (10)

where R_gis gear radius or sleeve radius and n_dogis number of dog teeth 22, 24. The relative displacement at time t_synch, is denoted by y_sg(t_synch) and at time t_endby y_sg(t_end) as shown in FIG. 5, which shows teeth geometry and frame definition.

The relationship between T_compand T_dcan be used to define the curve of sleeve tip point trajectory 26 at any time instance t_i∈[t_synch, t_end] before impact with gear teeth.

y_sg(t_i)=y_sg(t_synch)−R_g×0.5×{t_i²−t_synch²} . . . ×(T_comp−T_d)÷J_g (11)

Assuming that resulting y_sg(t_i)∈[0, y_sgmax] and based on the fact that {t_i²−t_synch²} term in equation 11 is a positive number since t_irefers to a time later than t_synch, following relationship between T_comp, T_d, y_sg(t_i) and y_sg(t_synch) can be derived from equation 11

$\begin{matrix} y_{s g} (t_{i}) is {\begin{matrix} < y_{s g} (t_{s y n c h}) & if T_{comp} > T_{d} \\ > y_{s g} (t_{s y n c h}) & if T_{comp} < T_{d} \\ = y_{s g} (t_{s y n c h}) & if T_{comp} = T_{d} \end{matrix} & (12) \end{matrix}$

If y_sg(t_synch) is close to 0 or y_sgmax then y_sg(t_i) might leave the window containing y_sg(t_synch) shown in FIG. 5 and will move to an upper or lower window. An example of such a situation where T_comp>T_dand y_sg(t_synch) is close to 0 is shown in left half of FIG. 6, which shows relative displacement between sleeve 18 and gear 17 goes outside the limits.

As it can be seen in left half of FIG. 6, y_sg(t_i) calculated by equation 11 denoted by y_sg(t_i) goes to the window lower than the one containing y_sg(t_synch). In this case, a new value of y_sg(t_i), Lim y_sg(t_i) is calculated such that Lim y_sg(t_i)∈[0,y_sgmax] by

Lim y_sg(t_i)=y_sgmax×[(y_sg(t_i)÷y_sgmax)− . . . └(y_sg(t_i)÷y_sgmax)┘] (13)

The resulting sleeve tip point trajectory 26 is shown in right half of FIG. 6. As it can be seen from dotted circles in left half of FIG. 6, Lim y_sg(t_i) and y_sg(t_i) are at same positions with respect to idler gear dog teeth 24.

If T_comp=T_d, then according to equation 11 ω_sg(t>t_synch)=0 and equation 12 implies y_sg(t_i)=y_sg(t_synch), so the sleeve tip point trajectory 26 will be straight with respect to time. Using T_comp=T_dthe sleeve teeth 22 travel from end of speed synchronization phase to the end of gear engagement phase is shown in FIG. 7 from t_synchto t_endin downwards direction through subfigures a through e.

In FIG. 7, bouncing back of sleeve 18 caused by hitting gear dog teeth 24 is not considered since the purpose here merely is to define the area where the sleeve tip point can exist. If the sleeve 18 bounces back it will still be in this area. Also, the sleeve 18 can leave the area only when a hit with gear teeth results in material penetration which is discussed in simulation results later in the disclosure.

For subfigures to the left in FIG. 7, y_sg(t_synch)=y_sgmax and in the subfigures to the right y_sg(t_synch)=0. The window 27 of width x_synchto x_endand height 0 to y_sgmax is shown by dotted rectangles in FIG. 7, portion a and is repeated in all subfigures.

When sleeve 18 starts to move towards engagement with a constant velocity, the front of sleeve teeth 22 will not hit the gear until x_s≥x_frcntas shown in FIG. 7, portion b. This movement is referred to in literature as free flight. If sleeve tip point trajectory 26 is seen with respect to gear teeth 24 there is no difference between left and right subfigures in FIG. 7, portion a, and FIG. 7, portion b. There is a difference however when x_s>x_frcntas it can be seen in FIG. 7, portion c, where left and right subfigures show sleeve teeth 22 contact with different flanks of gear teeth 24. The front of sleeve teeth 22 then starts sliding on the gear teeth 24 until x_s≤x_sdcntas shown in FIG. 7, portion d.

For x_s>x_sdcntthe front surface 28 of sleeve teeth 22 will not be in contact with gear teeth 24 but a side surface 29 of the sleeve teeth 22 can be. The distance between x_frcntand x_sdcntis calculated by

x_sdcnt−x_frcnt=w_dog÷tan β (14)

As shown by left and right subfigures of FIG. 7, portion d, y_sgwhen x_s=x_sdcntis defined by y_sgsdmax and y_sgsdmin. y_sgsdmax and y_sgsdmin are limits on y_sgif side surface 29 of sleeve teeth 22 is in contact with the dog teeth 24 and are calculated by

y_sgsdmin=w_dog (15)
y_sgsdmax=w_dog+ct (16)

FIG. 7, portion e, shows the sleeve reaching x_endfrom x_sdcnt. The sleeve tip point trajectories 26 from all subfigures in FIG. 7 when collected together from x_synchto x_endgive the area in which sleeve tip point can exist during gear engagement phase as shown in FIG. 8. x_synchand x_frcntare defined by synchronizer geometry and x_endis defined in transmission control software. Rest of points required for drawing FIG. 8, can be derived using equations 10, 14, 15 and 16.

Based on location of sleeve tip point inside the hatched area 30 in FIG. 8, the kind of contact between sleeve 18 and gear 17 can be described as frontal contact, side contact or no contact.

If sleeve tip point trajectory y_sg(t_synch, t_end) hits the solid line 31 in FIG. 8 when x_s∈[x_frcnt, x_sdcnt], the contact is a frontal contact. This kind of contact produces a force on sleeve 18 that is in the opposite direction of sleeve movement as shown in FIG. 7, portion c. The resulting contact force produces a clonk kind of noise and wear in transmission.

If sleeve tip point trajectory y_sg(t_synch, t_end) hits either y_sgsdmin or y_sgsdmax line 32 in FIG. 8 when x_s∈(x_sdcnt,x_end], the contact is a side contact.

A rattling kind of noise is produced if y_sghits both y_sgsdmin and y_sgsdmax 32 when x_s∈(x_sdcnt,x_end]. This kind of contact is referred to as multiple side contact.

If sleeve tip point trajectory y_sg(t_synch,t_end) hits the dashed line when x_s∈[x_synch,x_frcnt) or does not hit either solid 31 or dot-dashed line 32, there is no contact between sleeve 18 and gear 17 until the start of torque ramp up. This kind of gear engagement does not produce any noise or wear and is fastest.

Sleeve teeth side surface 29 contact is inevitable when torque ramp up starts so at x_s=x_end, y_sg(t_end) will be on either y_sgsdmin or y_sgsdmax. The transition between end of gear engagement phase and start of torque ramp up is shown in FIG. 9, which shows y_sgat torque ramp up.

In left half of FIG. 9, at time t_endwhen x_s=x_end, y_sg(t_end)∈[y_sgsdmin, y_sgsdmax]. At time>t_endtorque ramp up starts and since the direction of ramp up torque for driving the vehicle is always same as ω_s, ramp up torque will push the oncoming idler gear 17 to sleeve 18 as shown in right half of FIG. 9. So

y_sg(time>t_end)=y_sgsdmin (17)

If y_sg(t_end)≠y_sgsdmin, there will be an impact between sleeve dog teeth 22 and gear dog teeth 24 when torque ramp up starts. To avoid this impact

y_sg(t_end)=y_sgsdmin (18)

Also, to avoid multiple side contacts

if x_s∈(x_sdcnt,x_end] then y_sg≠y_sgsdmax (19)

If direction of ω_sand ω_gare reversed only then y_sg(t>t_end) would be =y_sgsdmax.

y_sg*(t_synch) refers to a value of y_sgat time t_synchsuch that:

The resulting sleeve tip point trajectory must not have either frontal or multiple side contact with idler gear dog teeth.

The resulting y_sg(t_end) must be as close to y_sgsdmin as possible.

Fulfilment of condition 1 guarantees that the gear engagement will be fastest and will be without noise and wear. Fulfilling the condition 2 above guarantees minimum impact when torque ramp up starts according to equation 17 and 18.

The absence of frontal contact implies there will be no force on sleeve 18 during engagement in the direction opposite to {dot over (x)}_s, the minimum engagement time t_end−t_synchcan then be calculated by

t_end−t_synch=(x_end−x_synch)÷{dot over (x)}_s (20)

The velocity difference between sleeve 18 and gear 17 after time t_end−t_synch, will be

ω_s−ω_g(t_end)=−[(T_comp−T_d)×(t_end−t_synch)÷J_g] (21)

From equation 21, larger the value of T_comp−T_d, larger will be the velocity difference. As mentioned in [5], larger velocity difference leads to more severe impacts, so ideally T_comp−T_d, must be zero. If it is not zero then the allowable value that guarantees absence of multiple side contacts is defined in the subsequent section.

A time instance t_sdcntcan also be defined as time when x_s=x_sdcnt. It is important to note that time instance t_sdcntdoes not represent the time instance shown in FIG. 7, portion d, because in FIG. 7, there is contact between dog teeth. Time t_sdcnt−t_synchis the time taken for x_sto go from x_synchto x_sdcntwithout frontal contact so

t_sdcnt−t_synch=(x_sdcnt−x_synch)÷{dot over (x)}_s (22)

The absence of frontal contact also implies that equation 11, can be rewritten for y_sg(t_end) and y_sg(t_sdcnt) as

y_sg(t_end)=y_sg*(t_synch)−R_g×0.5×{t_end²−t_synch²} . . . ×(T_comp−T_d)÷J_g (23)
y_sg(t_sdcnt)=y_sg*(t_synch)−R_g×0.5×{t_sdcnt²−t_synch²} . . . ×(T_comp−T_d)÷J_g (24)

Subtracting equation 24 from equation 23 results in

y_sg(t_end)−y_sg(t_sdcnt)=−R_g×0.5×{t_end²−t_sdcnt²} . . . ×(T_comp−T_d)÷J_g (25)

In equation 25, {t_end²−t_sdcnt²} is always positive, so following relationship between T_comp, T_d, y_sg(t_end) and y_sg(t_sdcnt) can be derived

$\begin{matrix} y_{s g} (t_{e n d}) is {\begin{matrix} < y_{s g} (t_{s d c n t}) & if T_{comp} > T_{d} \\ > y_{s g} (t_{s d c n t}) & if T_{comp} < T_{d} \\ = y_{s g} (t_{s d c n t}) & if T_{comp} = T_{d} \end{matrix} & (26) \end{matrix}$

Equation 26, in combination with equation 18 and constraint 19 can be used to define limits on difference between T_comp−T_d, if multiple side contacts is to be avoided. So, if for instance T_comp>T_dand y_sg(t_end) is according to equation 18, then if y_sg(t_sdcnt)<y_sgsdmax, multiple side contact can be avoided when:

$\begin{matrix} T_{comp} - T_{d} = \frac{[y_{s g} (t_{s d c n t}) < y_{s g} s d \max] - y_{s g} s d \min}{R_{g} \times 0 .5 \times {t_{e n d}^{2} - t_{s d c n t}^{2}} \div J_{g}} & (27) \end{matrix}$

Equation 27 shows if for instance y_sg(t_sd)<<y_sgsdmax to keep probability of multiple side contacts very small, then T_comp−T_dshould be very small, or if y_sg(t_sd)→y_sgsdmin then T_comp−T_d→0 as mention by 3rd relation in equation 26.

Equation 27 also shows the relation between {dot over (x)}_sand T_comp−T_d, by {t_end²−t_sdcnt²} term in the denominator. If for instance {dot over (x)}_sis decreased then according to equation 20 and 22 t_endand t_sdcntwill increase, making the {t_end²−t_sdcnt²} term increase. In such a scenario if the inequality in 26, is kept unchanged then T_comp−T_dmust be decreased.

For T_comp<T_d, y_sg(t_sd) must be <y_sg(t_end)=y_sgsdmin according to 2nd condition in equation 25, but y_sgsdmin is the lowest boundary of y_sgwhen x_s∈(x_sdcnt,x_end] as shown in FIG. 8. So, if direction of ω_sis as shown in FIG. 9, T_compmust not be <T_dif impact at torque ramp up needs to be avoided.

By calculating the minimum value of T_comp−T_dfrom equation 27 and equation 21, y_sg*(t_synch) can be calculated directly from equation 23.

In other words, the method involves determining the target relative displacement (y*_sg), the compensation torque (T_comp) applied on the gear wheel in a direction opposite to drag torque (T_d) and the shift sleeve axial engagement speed ({dot over (x)}_s), for any specific sleeve teeth and gear teeth geometry, such that the sleeve teeth is determined to enter in the space between neighbouring gear teeth to maximal engagement depth substantially without mutual contact, and preferably with a sleeve teeth side surface near or in side contact with an opposite gear teeth side surface.

The term “substantially without mutual contact” means that there may be a single side contact between sleeve teeth side surface and the opposite gear teeth side surface upon reaching said maximal engagement depth.

Moreover, the term “sleeve teeth side surface near an opposite gear teeth side surface” means that the sleeve teeth are preferably not located in the centre of the space between neighbouring gear teeth, but in a side region of said space, such that the mechanical impact between the sleeve teeth and gear teeth upon Torque Ramp Up remains low. For example, a gap between the sleeve teeth and a closest opposite gear teeth side surface may be less than 30%, specifically less than 15%, of a maximal gap between the sleeve teeth and the opposite gear teeth side surface.

Specifically, the target relative displacement (y*_sg) at the time point (t_synch) when said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase may be calculated by:

y_sg*(t_synch)=y_sg(t_end)+R_g×0.5×{t_end²−t_synch²}×(T_comp−T_d)÷J_g

wherein the compensation torque (T_comp) is selected to fulfil the following criteria:

$T_{comp} - T_{d} = \frac{[y_{s g} (t_{s d c n t}) < y_{s g} s d \max] - y_{s g} s d \min}{R_{g} \times 0 .5 \times {t_{e n d}^{2} - t_{s d c n t}^{2}} \div J_{g}}$

Clearly, depending on aspects such as synchronizer sleeve geometry, synchronizer sleeve axial velocity {dot over (x)}_sin gear engagement phase and drag torque Td, the sleeve teeth may in certain embodiment of the control system and transmission be controlled to enter in the space between neighbouring gear teeth to maximal engagement depth substantially without mutual contact also without applying a compensation torque Tcomp, i.e. having Tcomp=0.

Simulation Model

A simulation has been performed to verify and validate the gear engagement model described above. Teeth parameters implemented in simulation are shown in Table 1.

TABLE 1

Teeth Geometry Parameters

W_dog
4 mm

ct
0.5 mm

β
45 degrees

y_sgmax
8.5 mm

y_sgsdmin
4 mm

y_sgsdmin
4.5 mm

x_frcnt-x_synch
2 mm

x_sdcnt-x_frcnt
4 mm

x_end-x_synch
8 mm

{dot over (x)}_s
500 mm/sec

Teeth contact Parameters

Stiffness of teeth for contact
1e10 N/m

Damping of teeth for contact
1e4 N/m/s

Limit penetration for contact
1e-3 mm

Viscous friction for contact
5 N/m/s

Friction coefficient for contact
0.3

The teeth contact parameters in Table 1 are chosen to be nominal values based on experience and are explained in [5]. Accurate values of these parameters can be calculated by the experimental method shown in [6]. The consequence of not using accurate values will be that the contact forces will not be accurate but the relative magnitude of contact forces resulting from different y_sg(t_synch) will still be the same. Hence, the level of noise generated by different frontal contacts can be evaluated. Using this approach multiple side contacts and consequent rattling noise cannot be evaluated. But the potential of multiple side contacts resulting from different y_sg(t_synch) can still be evaluated.

Gear engagement model made in a simulation software (LMS Imagine AMESim) is shown in FIG. 10. The model is initialized at the end of synchronization at time t_synch. The model can be initialized at any y_sg(t_synch)∈[0,y_sgmax] and then the resulting sleeve tip point trajectory 26 is plotted inside the hatched area 30 shown by FIG. 8.

Simulation Results

Using teeth parameters given in Table 1, T_comp−T_d=19 Nm satisfies equation 27 with y_sg(t_sdcnt)+1 mm=y_sgsdmax as shown by the dotted curve 33 in FIG. 11, which shows sleeve tip point trajectory with y_sg*(t_synch).

In FIG. 11, x axis is from 0 to 8 mm, where for sake of simplicity x_synchis assumed to be 0 and then x_end=8 mm according to FIG. 11. Using equation 21, T_comp−T_d=19 Nm leads to ω_s−ω_g(t_end)=−2 rad/sec. Any value of T_comp−T_d∈[0, 19 Nm) will satisfy equation 27 and lead to ω_s−ω_g(t_end)∈(−2 rad/sec, 0]. Using T_comp−T_d=5 Nm leads to ω_s−ω_g(t_end)=−0.5 rad/sec and leads to y_sg*(t_synch) to be 4.245 mm as shown by solid curve 34 in FIG. 11.

A magnification view 35 of the sleeve tip point trajectories in the range 6 mm≤x≤8 mm is also shown in FIG. 11.

A batch simulation is run on the model shown in FIG. 10 such that y_sg(t_synch) for all simulations is changing from 1.245 mm till 7.245 mm with a step of 0.2 mm. Since the batch simulation is run with a constant T_comp−T_d=5 Nm, y_sg*(t_synch) will be =4.245 mm. The resulting sleeve tip point trajectories are shown in FIG. 12.

In FIG. 12 only sleeve tip point trajectory for y_sg*(t_synch) and y_sg*(t_synch)+0.2 mm, denoted 36 and 36, do not make a frontal contact. All other shown trajectories exhibit a frontal contact with sleeve.

A zoomed in view of the sleeve tip point trajectories in the range 6 mm≤x≤8 mm of FIG. 12 but including only some selected batch runs is shown in FIG. 13. It can be seen that y_sg(t_end) for the trajectory generated by y_sg(t_synch)=4.265 mm is not according to equation 18. The trajectories generated by y_sg(t_synch)=1.245 mm and 7.245 mm will have more potential of multiple side contacts and rattling noise according to the criteria described before.

Since T_comp>T_dso according to equation 8 ω_gis >ω_s. With directions of ω_gand ω_sshown by FIG. 9, it can be concluded that frontal contacts made by the lower trajectories 37 in FIG. 12 will be more severe because in that case the sleeve hits the idler gear 17 that is approaching it. The frontal contacts made by the upper 38 trajectories is such that the idler gear 17 is moving away from the sleeve 18. Since the magnitude of frontal force defines the friction between sleeve 18 and gear 17, so in general lower frontal contact trajectories 37 have more gear engagement time as compared to upper frontal contact trajectories 38. The resulting gear engagement times are shown in FIG. 14 on y-axis for each y_sg(t_synch) on x-axis.

From FIG. 14, it can be seen that gear engagement times for the lower trajectories 37 in FIG. 12 are generally higher than the upper trajectories 38. Furthermore, it can be concluded that y_sg*(t_synch)=4.245 mm leads to the fastest gear engagement.

Maximum frontal contact force for the selected batch runs in FIG. 12 is shown in FIG. 15. It can be seen from FIG. 15 that the contact force is higher for y_sg(t_synch)=1.245 mm than it is for y_sg(t_synch)=7.245 mm as discussed earlier. Also, the small-time scale and large value of contact force in FIG. 15 indicates that the contact force will generate a clonk kind of noise. Maximum value of frontal contact force for all batch simulations shown in FIG. 12 are shown on y-axis in FIG. 16 with corresponding values of y_sg(t_synch) shown on x-axis.

From FIG. 14 and FIG. 16 it can be seen that trajectories from y_sg(t_synch) values less than y_sg*(t_synch) start giving frontal contacts and hence clonk noise as well as delayed gear engagement within y_sg*(t_synch)−0.2 mm but for y_sg(t_synch) values larger y_sg*(t_synch) than the clonk noise and delayed gear engagement shows up after y_sg*(t_synch)+0.4 mm. This kind of analysis can thus be used to define the tolerance level with which y_sg*(t_synch) must be controlled in either direction.

The existence of multiple side contacts is shown in FIG. 17 for all batch simulations in FIG. 12. On y-axis in FIG. 17 is the true/false of whether more than one side contact occur for the corresponding y_sg(t_synch) on x-axis.

From FIG. 17 it can be seen multiple side contact and hence more probability of rattling exists when y_sg(t_synch) is far from y_sg*(t_synch).

From the trajectory for y_sg(t_synch)=7.245 mm in FIG. 13 it can be seen that at x_s≅7.65 mm marked by the circle, the sleeve teeth are pushing so hard against the gear teeth, that the simulation result shows a material penetration of about 0.2 mm. Same behaviour can be seen for trajectories resulting from other values of y_sg(t_synch) as shown by circle in FIG. 12. High side contact force increases the friction between sleeve and gear hence delaying the gear engagement as shown by the sudden increase in gear engagement time marked by circle in FIG. 14. But since the delay it generates is small (of the order of few ms) as compared to delays generated because of frontal contacts (of the order of 10 ms) it can be ignored.

Based on the simulation results it can be concluded that, for the specific circumstances of this simulation example, y_sg*(t_synch)=4.245 mm results in minimum engagement times, zero frontal contact forces, less probability of multiple side contacts and y_sg(t_end)=y_sgsdmin, subsequently leading to best shift quality with least noise and wear.

Corresponding simulations may be performed to identify optimal y_sg*(t_synch) for each gear shift situation planned to occur according to a predetermined transmission shift map, possibly also taking into account variation in drag torque Td caused be variation of transmission fluid temperature.

In order to identify rotational position of the sleeve and gear dog teeth 22, 24, teeth position sensors must be positioned in a way that sleeve and idler gear dog teeth 22, 24 can be detected.

In the case of an axially shiftable sleeve 18, the sensor must follow it in axial direction as long as the movement is part of shifting process. On the shift forks 41 shown in FIG. 18, the sleeve teeth position sensor 39 is added.

Since the sleeve teeth 22 are internal, reading marks 40 may for example be made on the outer surface of sleeve 18, wherein the reading marks 40 may be aligned with the positions of the inner dog teeth 22 as shown in FIG. 19.

The sensor 43 for idler gear dog teeth 24 may for example be added to a fork rod 42 as shown in FIG. 20, but its position may differ for different transmission concepts. The idler gear dog teeth sensor 43 is preferably at a fixed position in space. An example embodiment of the complete assembly of sensors, synchronizer, shift fork and rod is shown in FIG. 21.

According to one example embodiment, the sensor produces a binary signal i.e. 0 for no teeth and 1 for teeth as shown in FIG. 22. Since this example embodiment includes two similar sensors, one for sleeve teeth 22 and one for idler gear dog teeth 24, signal processing for idler gear dog teeth sensor 43 will be shown here, the signal processing for sleeve teeth sensor 39 will be exactly same.

If idler gear dog teeth 24 are moving in the direction of rotation as shown in FIG. 22, the sensor gives rising edges at times t₁and t₃and falling edges at times t₂and t₄. The teeth position y_gat time t₁as shown in FIG. 22 would be

y_g(t₁)=y_gmax−w_dog/2 (28)

where y_gmax is same as y_sgmax and is defined by equations 9 and 10. Similarly, teeth position at time t₂would be

y_g(t₂)=w_dog/2 (29)

Values of y_gbetween time t₁and time t₂can be calculated by

y_g(t∈[t₁,t₂])=R×(∫ω_gdt+y_g(t₁)/R) (30)

If y_gresulting from equation 30 is not between 0 and y_sgmax equation 13 is applied to make it so. Similarly values of y_gbetween time t₂and t₃can be calculated by

y_g(t∈[t₂,t₃)=R×(∫ω_gdt+y_g(t₂)/R) (31)

For values of y_gbetween times t₃and t₄equation 30 can be used again. In essence y_gat any time can be calculated by integrals in equations 30 and 31, which are triggered by either a rising or a falling edge and reset by the other.

If direction of rotation or equivalently sign of ω_gis changed in FIG. 22, then falling edges will be at times t₁and t₃and rising edges at times t₂and t₄. In that case the triggers for integral equations 30 and 31 must be interchanged. An example of the logic implemented in Simulink is shown in FIG. 23.

In FIG. 23, the first If Then Else block denoted 51 changes the trigger conditions between the integrators based on sign of angular velocity. Second If Then Else block activates the integrator blocks based on rising or falling edges in sensor signal and integrates the velocity signal with respective initial conditions. The resulting y_gfrom a decreasing ω_gand corresponding sensor signal is shown in FIG. 24, which shows resulting y_gfrom ω_g=40→0 rad/sec.

It can be seen in FIG. 24, that the sensor signal rising and falling edges are in accordance with FIG. 22 and dog teeth parameters from Table 1.

Similar logic can be used to get sleeve teeth position y_sat any time based on the sensor signal for sleeve teeth 22 and sleeve velocity ω_s. Based on y_sand y_g, the real relative displacement y_sgrbetween sleeve teeth 22 and idler gear dog teeth 24 at any time instance t_ican be calculated by

$\begin{matrix} y_{s g r} (t_{i}) = {\begin{matrix} y_{g} (t_{i}) - y_{s} (t_{i}) & if y_{g} (t_{i}) > y_{s} (t_{i}) \\ y_{s g} \max - y_{s} (t_{i}) + y_{g} (t_{i}) & if y_{s} (t_{i}) > y_{g} (t_{i}) \end{matrix} & (32) \end{matrix}$

The resulting y_sgrwill be a sawtooth wave like radial displacement plot in FIG. 24. Since y_sgrsignal is used in feed back control strategy, it may be better to transform the signal from a sawtooth wave to smooth signal. The logic to smoothen the signal implemented in Simulink for an upshift is shown in FIG. 25. Both the sawtooth and the resulting smoothened sensor signal from a sawtooth wave is shown in FIG. 26.

The aim of the control algorithm is to have y_sgr(t_synch)=y_sg*(t_synch). The control algorithm may have various design, depending on desired performance, sensor output quality, etc. For example, according to first example embodiment, the control algorithm may contain two sequential controllers:

1. Initial open loop controller for ensuring desired relative displacement between sleeve teeth 22 and gear teeth 24 at start of synchronisation phase, such that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase.

2. Closed loop controller as extra safety measure for ensuring that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase despite potential errors in sensor rotational position detection and/or inaccuracy of timing of start of synchronisation phase.

Alternatively, according to second example embodiment, the control algorithm may contain merely a single initial open loop controller for ensuring desired relative displacement between sleeve teeth 22 and gear teeth 24 at start of synchronisation phase, such that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase. The accuracy and reliability of the sensor relative displacement detection is deemed sufficient for allowing omission of the closed loop controller.

Still more alternatively, according to third example embodiment, the control algorithm may be designed for omitting the initial open loop controller, and instead being configured for starting the synchronisation phase immediately upon receiving a gear shift command, and subsequently, at a certain relative position ω_sgbetween the sleeve 18 and gear 17, initiating closed loop control of the synchronisation torque such that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase.

A control algorithm according to the first example embodiment is described as hereinafter. The purpose of the open loop controller is to calculate a y_sg(t₀) such that when an angular acceleration α_gcorresponding to equation 4 or 5 is applied at time t₀, y_sgrat time t_synchis equal to y_sg*(t_synch).

If values of y_gand y_sat time t_synchare such that

y_g(t_synch)=y_sg*(t_synch) (33)
y_s(t_synch)=0 (34)

then according to first condition in equation 32 y_sgr(t_synch)=y_sg*(t_synch).

From equation 33 angular displacement of gear θ_gat time t_synchcan be calculated to be

θ_g(t_synch)=y_sg*(t_synch)/R_g (35)

Similarly, from equation 34 angular displacement of sleeve θ_sat time t_synchcan be calculated to be

θ_s(t_synch)=0 (36)

A simulation running backwards in time from time t_synchto time t₀with a small decremental step of δt is shown in FIG. 27. The initial conditions for the angular displacements θ_gand θ_sfor the simulation are equations 35 and 36 respectively. Initial condition for ω_gis ω_g(t_synch)=ω_s. The simulation is run with α_g=Max(α_g).

When the simulation stops after (t_synch−t₀)÷δt iterations as shown in FIG. 27 the results are collected and post processed to get ω_sg(t),∀t∈[t₀, t_synch] and y_sg1(t),∀t∈[t₀, t_synch]. The curve y_sg1(t) is post processed in such a way that y_sg1(t₀) ∈[0,y_sgmax] and Lim y_sg1(t_synch) calculated by equation 13 is =y_sg*(t_synch).

A first phase plane trajectory generated for an upshift with ω_sg(t₀)=−100 rad/sec and y_sg*(t_synch)=4.245 mm is shown in FIG. 28.

An open loop controller can then be designed such that

$\begin{matrix} α_{g} is {\begin{matrix} = 0 & if y_{s g r} from Sensor \neq y_{s g 1} (t_{0}) \\ = Max (α_{g}) & if y_{s g r} from Sensor = y_{s g 1} (t_{0}) \end{matrix} & (37) \end{matrix}$

The block diagram for open loop control is shown in FIG. 29.

When the shift command is generated from high level software at time instance t_init<t₀the angle sensors start working and α_gmust be kept to zero, for a time duration t₀−t_inituntil y_sgrgenerated by sensors is equal to y_sg1(t₀) resulting from FIG. 28. Once they are equal, maximum α_gis applied. The angular acceleration α_gin equation 37 is controlled by synchronization torque T_synchbased on equation 5 for upshift or equation 5 for downshift. So, the interface of control logic with the hardware is in terms of synchronization torque T_synch. The implementation of open loop control for an upshift in FIG. 29 is shown in FIG. 30.

It can be seen from FIG. 30 that for time duration t_intto t₀, T_synchis kept at T_d, which gives α_g=0 according to equation 4. At time instance t₀, when maximum torque is applied y_sgrwill start following the first trajectory y_sg1. After time t_synch, ω_sg(t_synch) will be 0 and Lim y_sgr(t_synch) will be =y_sg*(t_synch)=Lim y_sg1(t_synch).

Since y_sgr(t₀) and y_sg1(t₀) both ∈[0,y_sgmax], it is not necessary that y_sgr(t₀)<y_sg1(t₀) as shown in FIG. 30. In that case the first trajectory y_sg1need to be offset by y_sgmax. So

if y_sgr(t₀)>y_sg1(t₀)
then offset y_sg(t)=y_sg(t)+y_sgmax (38)

Using equation 13 on offset y_sg(t) at time=t_synchfrom equation 38, it can be calculated such that Lim offset y_sg1(t)=y_sg*(t_synch). The offset phase plane is shown by dotted line and original phase plane is shown by solid lines in FIG. 31.

So, if y_sgr(t_init)>y_sg1(t₀), then offset y_sg1trajectory will be followed at time≥t₀instead of y_sg1as explained earlier.

Since during time duration t_0-t_init, α_g=0, the speed synchronization is delayed by this duration. So, speed synchronization trajectory shown for upshift in FIG. 2 will be updated as shown in FIG. 32, which shows upshift speed synchronization trajectory after application of open loop control.

Time duration t_0-t_initcan be calculated by

$\begin{matrix} t_{0 -} t_{i n i t} = Δ y_{s g} \div [R_{g} \times ω_{s g} (t_{0})] where Δ y_{s g} = \dots {\begin{matrix} y_{s g 1} (t_{0}) - y_{s g r} (t_{i n i t}) & if y_{s g}^{*} (t_{0}) > y_{s g} R (t_{i n i t}) \\ y_{s g} \max + y_{s g} (t_{0}) - y_{s g r} (t_{i n i t}) & if y_{s g}^{*} (t_{0}) < y_{s g} R (t_{i n i t}) \end{matrix} & (39) \end{matrix}$

It can be seen from equation 39, that time duration t_0-t_initis quite small since the numerator term Δy_sgcan be maximum equal to y_sgmax and denominator contains terms R_gand ω_sg(t₀) which are far larger than Δy_sg.

The simulation results for y_sgr(t_init)=0; 2; 4; 8.4 mm are shown in FIG. 33A. FIG. 33B shows the zoom in view of FIG. 33A at time t₀and FIG. 33C shows the zoomed in view at time t_synch.

In FIG. 33, phase plane trajectory 47 denotes for y_sgr(t_init)=0 mm, phase plane trajectory 48 denotes for y_sgr(t_init)=2 mm, phase plane trajectory 49 denotes for y_sgr(t_init)=4 mm, and phase plane trajectory 50 denotes for y_sgr(t_init)=8.4 mm.

From FIG. 28, y_sg1(t₀)=7.238 mm and y_sg1(t_synch)=250.746 mm as shown in FIG. 33B and FIG. 33C respectively. Since y_sgr(t_init)=8.4 mm is larger than y_sg1(t₀)=7.238 mm so the phase plane trajectory for y_sgr(t_init)=8.4 mm denoted 50 follows the offset trajectory shown by dotted line in FIG. 33. Using equation 13 it can be calculated that Lim y_sg1(t_synch)=4.245 mm=y_sg*(t_synch). From FIG. 33B it can be seen that for different values of y_sgr(t_init), the open loop control algorithm makes sure that y_sgrat time t_synchfor all y_sgr(t_init), is =y_sg*(t_synch), as shown in FIG. 33C.

The open loop controller guarantees y_sgrat time t_synchis equal to y_sg*(t_synch) by changing y_sgrat time t₀to a fixed y_sg(t₀). But during the time interval t₀to t_synch, y_sgrmay need to be controlled, for example if the starting relative position of the sleeve and gear y_sgat the start of the synchronisation phase did not match the desired starting relative position y_sgfor any reason. This is achieved by the closed loop controller.

In the subsequent section closed loop controller is designed, such that the open loop controller is turned off and closed loop controller controls y_sgrfrom time t₀to t_synch. In such a case the control effort from the closed loop controller will be greatest. But a similar closed loop controller can be designed that controls y_sgrduring time interval t_i>t₀to t_synch. The only effect will be the increase in synchronization time due to application of closed loop controller, which will be discussed in later sections.

From the simulation running backwards in time in FIG. 27, a second phase plane trajectory of ω_sg2(t),∀t∈[t₀, t_synch] and y_sg2(t),∀t∈[t₀, t_synch], can be drawn for a value of α_g<Max(α_g). The requirement on reduced α_gfor upshifts is such that

y_sg2(t₀)≤y_sg1(t₀)−y_sgmax (40)

Consequently, the second phase plane trajectory y_sg2 thus differs from the first phase plane trajectory y_sg1, even if both the first and second phase plane trajectories y_sg1, y_sg2 have the same end point, i.e. the same circumferential relative displacement y_sg equal the target circumferential relative displacement y*_sg when said rotational speed difference ω_sg becomes zero at the end of the synchronisation phase.

Both the first and the second phase plane trajectories for an upshift with ω_sg(t₀)=−100 rad/sec and y_sg*(t_synch)=4.245 mm are shown by solid curves in FIG. 34.

Consequently, in more general terms, the disclosure relates to method for motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence for avoiding gear teeth interference, wherein the stepped gear transmission comprises an axially displaceable shift sleeve arranged on and rotationally secured to a shaft, and a constant mesh gear wheel arranged on and rotatable relative to said shaft, the method comprising:

- receiving a gear shift command,
- determining a target relative displacement (y*_sg) between the sleeve teeth and gear teeth for a state when a gear wheel rotational speed (ω_g) reaches a shift sleeve rotational speed (ω_s) at an end of the synchronisation phase, which target relative displacement (y*_sg) is determined for avoiding impact between sleeve teeth and gear teeth during a following gear engagement phase,
- determining a first phase plane trajectory (y_sg1) defining a relationship between a rotational speed difference (ω_sg) between the shift sleeve and the gear wheel and a relative displacement (y_sg) between the sleeve teeth and gear teeth, wherein the relative displacement (y_sg) according to the first phase plane trajectory (y_sg1) equals the target relative displacement (y*_sg) when said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase,
- determining a second phase plane trajectory (y_sg2) defining the relationship between the rotational speed difference (ω_sg) between the shift sleeve and the gear wheel and the relative displacement (y_sg) between the sleeve teeth and gear teeth, wherein the relative displacement (y_sg) according to the second phase plane trajectory (y_sg2) equals the target relative displacement (y*_sg) when said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase,
- applying a synchronisation torque (T_synch),
- controlling said synchronisation torque (T_synch) for keeping the real relative displacement (y_sgr) between the sleeve teeth and gear teeth within the boundaries of the first and second phase plane trajectories (y_sg1, y_sg2) for any rotational speed difference (ω_sg), such that the real relative displacement (y_sgr) between the sleeve teeth and gear teeth reaches said target relative displacement (y*_sg) simultaneously with said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase.

The rotational speed difference (ω_sg) between the shift sleeve and the gear wheel is for example determined based on sensor input from a first rotational speed sensor detecting the speed of the shift sleeve 18 and a second rotational speed sensor detecting the speed of the gear wheel 17.

The relative displacement (y_sg) between the sleeve teeth 22 and gear teeth 24 may be determined based on sensor input from a first teeth sensor detecting the presence of a sleeve tooth passing by the sensor, and input from a second teeth sensor detecting the presence of a gear tooth passing by the sensor, combined with information about the rotational speed difference (ω_sg) between the shift sleeve and the gear wheel.

Moreover, in more general terms, the step of determining the first phase plane trajectory (y_sg1) may be based on application of a first angular acceleration (α_g), and the step of determining the second phase plane trajectory (y_sg2) may be based on application of a second reduced angular acceleration (α_g) that is lower than the first angular acceleration (α_g).

In addition, in more general terms, the relative displacement (y_sg) according to the second phase plane trajectory (y_sg2) is smaller or equal to the relative displacement of the first phase plane trajectory (y_sg1) minus a maximal relative displacement (y_sg_max) at the rotational speed difference (ω_sg, ω_sgtip) when the closed loop controller is configured to start.

Furthermore, in general terms, the control method involves determining said first and second phase plane trajectories (y_sg1, y_sg2) by performing backward in time calculations starting from the time point (t_synch) when said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase and ending at a predetermined rotational speed difference (ω_sg) based on a predetermined gear shift map, wherein the phase plane trajectories (y_sg1, y_sg2) are stored in pre-calculated lookup tables in a computer memory for enabling prompt access by an electronic transmission controller.

Each of the first and second phase plane trajectories (y_sg1, y_sg2) may extend between a rotational speed difference (ω_sg) corresponding to the start of the synchronisation phase to the state when said rotational speed difference becomes zero at the end of the synchronisation phase (ω_sg(t_synch)), and the control strategy may comprise operating said closed loop controller from the beginning to the end of the first and second phase plane trajectories.

The control method of the disclosure thus in general terms involve operation of two sequential controllers: an initial open loop controller and subsequently a closed loop controller,

wherein operation of the open loop controller involves keeping the synchronisation torque (T_synch) zero or at a compensation torque level (T_comp) for as long as real relative displacement (y_sgr) is different from a starting relative displacement (y_sg1(t_0)), and applying the synchronisation torque (T_synch) as soon as the real relative displacement (y_sgr) is equal to the starting relative displacement (y_sg1(t_0)), and

wherein operation of the closed loop controller involves controlling the synchronisation torque (T_synch) for keeping real relative displacement (y_sgr) within the boundaries of the first and second phase plane trajectories.

As it can be seen in FIG. 34, both trajectories have Lim y_sg1(t_synch)=Lim y_sg2(t_synch)=at y_sg*(t_synch) so if y_sgr(t) is kept between trajectories for all ω_sg(t), then at time t_synch, y_sgr(t_synch) will be =y_sg*(t_synch). The arrangement of the closed loop controller is shown in FIG. 35.

In FIG. 35, it can be seen that the input to control logic is the values of y_sg1and y_sg2calculated for example offline and subsequently providable by look-up tables using phase planes shown in FIG. 34 based on ω_sgsignal from the transmission. Also in FIG. 35, it can be seen that input to the control logic is the smooth y_sgrsignal from the logic implemented in FIG. 25.

The closed loop control logic implemented in FIG. 35 is shown in FIG. 36, and its working principle is shown in FIG. 37.

In the upper half of FIG. 37 the first phase plane trajectory y_sg1(t) with maximum angular acceleration α_gand the second phase plane trajectory y_sg2(t) with reduced angular acceleration α_gare shown as they were in FIG. 34. At time t₀, the signal from teeth position sensor y_sgr(t₀), is between y_sg1(t₀) and y_sg2(t₀). Since y_sgr(t₀)∈[0, y_sgmax], y_sgmax term in equation 40 can be justified. If y_sgrat any time is between y_sg1and y_sg2, maximum synchronization torque T_synchis applied. Then the angular acceleration α_gwill correspond to maximum acceleration and y_sgrwill start evolving parallel to y_sg1until time t_k.

At time t_kwhen the angular velocity is ω_sgk, y_sgrbecomes equal to y_sg(ω_sgk), the control logic asks for a zero acceleration, shown by putting T_synch=T_din lower plot of FIG. 37. Since angular acceleration is zero, velocity difference ω_sgwill stop changing but y_sgrwill be changing since the transmission is still rotating. After a certain time t_wait, when y_sgrbecomes equal to y_sg1(ω_sgk), maximum torque T_synchis applied again. Then y_sgrwill follow the trajectory of y_sg1and y_sgr(t_synch) will be =y_sg*(t_synch).

The control method of the disclosure thus in general terms involves controlling said synchronisation torque (T_synch) by a closed loop controller for keeping the real relative displacement (y_sgr) between the sleeve teeth and gear teeth within the boundaries of the first and second phase plane trajectories.

In particular, the closed loop controller is an on-off controller, e.g. a controller that merely controls said synchronisation torque (T_synch) to either apply full synchronisation torque (T_synch) and substantially zero synchronisation torque (T_synch). Said substantially zero synchronisation torque (T_synch) may be exactly zero or equal to the compensation torque (T_comp).

More in detail, the closed loop controller for the purpose of keeping real relative displacement (y_sgr) within the boundaries of the first and second phase plane trajectories comprises:

- applying synchronisation torque (T_synch) and monitoring the real relative displacement (y_sgr) and the rotational speed difference (ω_sg),
- if the real relative displacement (y_sgr) falls below the second trajectory (y_sg2) for any given rotational speed difference (ω_sg), stop applying the synchronisation torque (T_synch), or start applying only a compensation torque (T_comp) in a direction opposite to drag torque (T_d),
- monitoring the real relative displacement (y_sgr), and start applying the synchronisation torque (T_synch) again when the real relative displacement (y_sgr) is equal to the first trajectory (y_sg1) for any given rotational speed difference (ω_sg), and
- reiterating above steps in same order until rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase.

Since y_sgr(t₀) and y_sg1(t₀) both ∈[0,y_sgmax], it is not necessary that y_sgr(t₀)<y_sg1(t₀) as shown in FIG. 37. In that case both the trajectories y_sg1and y_sg2need to be offset by y_sgmax for upshifts as done for y_sg1in equation 38 as shown in FIG. 38.

Consequently, in general terms, when the real relative displacement (y_sgr) between the sleeve teeth (22) and gear teeth (24) at the rotational speed difference (ω_sg, ω_sgtip) when the closed loop controller is configured to start controlling said synchronisation torque (T_synch) is larger than the relative displacement (y_sg) of the first trajectory (y_sg1) at said rotational speed difference (ω_sg, ω_sgtip), shifting said first and second trajectories (y_sg1, y_sg2) with an integer times a maximal relative displacement (y_sg_max), such that the real relative displacement (y_sgr) becomes located between an offset first trajectory (offset y_sg1) and an offset second trajectory (offset y_sg2), and/or when the real relative displacement (y_sgr) between the sleeve teeth (22) and gear teeth (24) at the rotational speed difference (ω_sg, ω_sgtip) when the closed loop controller is configured to start controlling said synchronisation torque (T_synch) is smaller than the relative displacement (y_sg) of the second trajectory (y_sg2) at said rotational speed difference (ω_sg, ω_sgtip), shifting said first and second trajectories (y_sg1, y_sg2) with an integer times the maximal relative displacement (y_sg_max), such that real relative displacement (y_sgr) becomes located between an offset first trajectory (offset y_sg1) and an offset second trajectory (offset y_sg2).

Since during time duration t_wait, α_g=0, the speed synchronization is delayed by this duration. So, speed synchronization trajectory shown for upshift in FIG. 32 will be updated for closed loop control as shown in FIG. 39.

By applying the closed loop control logic, the synchronization time is increased by time t_waitas shown in FIG. 39. Time t_waitcan be calculated by

t_wait=[y_sg1(ω_sgk)−y_sg2(ω_sgk)]÷[R_g×ω_sgk] (41)

Maximum value of t_wait, will be if t_waitstarts at time t₀. Then maximum value of numerator in equation 41 will be =y_sgmax according to equation 40 and denominator contains terms R_gand ω_sg(t₀) which are far larger than y_sgmax.

In real system if y_sgrdeviates from y_sg1at a time later than t_x+t_wait, if the same logic is applied then y_sgrwill start following y_sg1. But another wait time will be generated. The subsequent wait times will be smaller than t_wait. Using the y_sg1(t), y_sg2(t) and ω_sg(t), an ω_sgxvs wait time plot can be created as shown in FIG. 40. From FIG. 40, if the zero-acceleration request is made at a particular value of ω_sgon y-axis, the resulting waiting time will be corresponding value of time on x-axis.

If the closed loop controller, controls y_sgrduring time interval t_i>t₀to t_synchthen maximum value of t_waitwill be if t_waitstarts at time t_i. Since in such a case equation 40 needs to hold for time t_iinstead of t₀, the maximum numerator for new t_waitwill still be =y_sgmax. But the denominator term will contain ω_sg(t_i). As time→t_synch, ω_sg→0 so if t_i→t_synch, t_wait→∞.

For verifying the closed loop controller simulations were conducted with open loop controller turned off, wherein the results of the closed loop simulation are shown in FIG. 41A-D. The simulation was performed with a first value of y_sgr(t₀)=0 mm resulting in a first trajectory 44, a second value of y_sgr(t₀)=2 mm resulting in a second trajectory 45, a third value of y_sgr(t₀)=4 mm resulting in a third trajectory 45 and a fourth value of y_sgr(t₀)=8.4 mm resulting in a fourth trajectory 46, as shown in FIG. 41A.

During the closed loop simulation, the open loop controller is turned off as can be seen in FIG. 41B where all trajectories 43, 44, 45, 46 from different y_sgr(t₀) values are moving parallel to y_sg1(t) as maximum acceleration is applied.

With respect to the second trajectory 44 generated by y_sgr(t₀)=2 mm in FIG. 41B, when ω_sgis −71.85 rad/sec, y_sgrbecomes smaller than y_sg2(−71.85 rad/sec)=119.8 mm as shown in FIG. 41C, then as mentioned in the closed loop control strategy a zero acceleration is requested, ω_sgstays at −71.85 rad/sec until y_sgris equal to y_sg1(−71.85 rad/sec)=125 mm. After that, maximum acceleration is requested again. The wait time can then be calculated using equation 41 to be 1.2 ms.

FIG. 41D shows the zoomed in view at time t_synchwhere it can be seen that all trajectories 43-45 located between y_sg2and y_sg1end up at the same y_sg*(t_synch) although starting with different y_sgr(t₀), and that trajectory 46 also end up at the same y_sg*(t_synch), but with a delay due to being controlled by Offset y_sg2and Offset y_sg1.

The control algorithm according to the first example embodiment described above included two sequential controllers: 1. An initial open loop controller for ensuring start of application of the synchronisation torque T_synchat the correct relative position y_sgr(t₀) of the synchronisation phase, and subsequently 2. A closed loop controller for controlling the synchronisation torque, such that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase.

However, as stated above, the present disclosure also includes alternative control algorithms. For example, the control algorithm may according to second example embodiment contain merely the initial open loop controller for ensuring desired relative displacement between sleeve teeth 22 and gear teeth 24 at start of synchronisation phase, such that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase. This control algorithm is particularly advantageous when accuracy and reliability of sensor relative displacement detection is relatively high, and the applied level of synchronisation torque is can be estimated with a high degree of accuracy, because thereby the task of the closed loop controller to correct the trajectory is superfluous, and the closed loop controller can consequently be omitted without any significant reduction in engagement quality.

In short, the open loop controller calculates a y_sg(t₀) such that the angular acceleration α_gcorresponding to equation 4 or 5 starts to be applied at time t₀, and wherein the same angular acceleration α_gcontinues to be applied with without interruption until ω_sg(t_synch)=0, when y_sgr(t_synch)=y_sg*(t_synch).

The value of y_sg(t₀) may for example be determined using the backwards running simulation described above, with α_g=Max(α_g), such that a first phase plane trajectory is provided.

The open loop controller can then be designed based on equation 37, and after Max(α_g) has started to be applied the open loop controller keeps applying Max(α_g) until time t_synch, when ω_sg(t_synch)=0.

Consequently, as described above, when the shift command is generated from high level software at time instance t_init<t₀the angle sensors start working and α_gmust be kept to zero, for a time duration t_0-t_inituntil y_sgrgenerated by sensors is equal to y_sg1(t₀) resulting from FIG. 28. Once they are equal, maximum α_gis applied. The angular acceleration α_gin equation 37 is controlled by synchronization torque T_synchbased on equation 4 for upshift or equation 5 for downshift.

In general terms, the control method according to this second example embodiment relates to motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence for avoiding gear teeth interference, wherein the stepped gear transmission comprises an axially displaceable shift sleeve arranged on and rotationally secured to a shaft, and a constant mesh gear wheel arranged on and rotatable relative to said shaft, the method comprising:

- receiving a gear shift command,
- determining a target relative displacement (y*_sg) between the sleeve teeth and gear teeth for a state when a gear wheel rotational speed (ω_g) reaches a shift sleeve rotational speed (ω_s) at the end of a synchronisation phase, which target relative displacement (y*_sg) is determined for avoiding impact between sleeve teeth (22) and gear teeth (24) during a following gear engagement phase,
- determining a starting relative displacement (y_sg1) between the sleeve teeth and gear teeth that causes the shift sleeve and gear wheel to reach said target relative displacement (y*_sg) simultaneously with said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase when applying a synchronisation torque from the start to the end of a synchronisation phase,
- starting to apply said synchronisation torque when the real relative displacement (y_sgr) reaches said starting relative displacement (y_sg1).

The control method according to this second example embodiment of the disclosure thus involves determining a starting relative displacement (y_sg1(t_0)) between the sleeve teeth and gear teeth that causes the shift sleeve and gear wheel to reach said target relative displacement (y*_sg(t_synch)) simultaneously with said rotational speed difference (ω_sg(t_synch)) becomes zero at the end of the synchronisation phase when applying a synchronisation torque (T_synch) from the start to the end of a synchronisation phase, and starting to apply said synchronisation torque (T_synch) when the real relative displacement (y_sgr(t_0)) reaches said starting relative displacement (y_sg1(t_0)). The also applies to the control algorithm according to the first example embodiment described above.

The first trajectory, including its starting time point y_sg1(t₀), may have to be offset by y_sgmax, as described above with reference to equation 38, thereby giving new start time point offset y_sg1(t₀).

According to the third example embodiment, the control algorithm may be designed for omitting the initial open loop controller, and instead being configured for starting the synchronisation phase immediately upon receiving a gear shift command, and subsequently, at a certain time instance t_i, wherein t_i>t₀, initiating closed loop control of the synchronisation torque until time t_synch, such that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase.

In other words, the control method thus involves starting to apply said synchronisation torque (T_synch) substantially directly upon receiving the gear shift command (t_init) and independent of current relative displacement (y_sg) between the sleeve teeth and gear teeth.

As described above, the closed loop controller requires first and second phase plane trajectories y_sg1,y_sg2with maximum α_gand reduced α_g, respectively, converging towards y_sg*(t_synch) as shown in FIG. 34.

This control strategy is particularly suitable when the exact timing of the gear shifts is not known, i.e. when ω_sg(t₀) is not known. This may for example occur when transmission provides a tiptronic functionality, such that the driver can freely select the gear shift timing by manually actuating an gearshift actuator. In other words, the driver may decide to hold on to a specific gear longer and thus to a higher engine speed (rpm) than planned according to a predetermined gear shift map, or the driver may decide shift gear earlier and thus at a lower engine speed (rpm) than planned according to the predetermined gear shift map.

Such freedom of gear shift may require modified phase plane trajectories, because it is not certain that the predetermined trajectories that extend from t_0 to t_synch, based on the predetermined gear shift map, are suitable for controlling the relative position between sleeve and gear during the synchronisation phase.

In particular, there is a risk that real relative position y_sgrat start of the closed loop control is located outside the first and second trajectories, despite that such trajectories may be offset by an integer times y_sgmax in any direction, because the predetermined converging phase plane trajectories too narrow at ω_sgtip, which represents the relative rotational speed at time of start of the closed loop control. Such as example is schematically illustrated in FIG. 42A, where y_sgris located outside both y_sg1,y_sg2and offset y_sg1, offset y_sg2at start of the closed loop control ω_sgtip.

Consequently, a new approach for selecting suitable phase plane trajectories is necessary. FIG. 42B shows an example embodiment for selecting suitable phase plane trajectories for a closed loop control of a tiptronic transmission.

A first step involves generating the first phase plane trajectory y_sg1in the same manner as before, i.e. based on the specific gear shift and the associated gear shift map. In other words, if for example the gear shift relates to gear shift of gear from first gear to second gear, the transmission control unit 1 knows the planned ω_sg(t₀) for that gear, taking into account current accelerator actuating level, based on predetermined gear shift map. The first phase plane trajectory may extend up to ω_sg(t₀) or stop at ω_sgtip, which represents the relative rotational speed at time of start of the closed loop control.

Thereafter, the second phase plane trajectory y_sg2, is generated as described above in the disclosure, i.e. by selecting a lower angular acceleration, but this the simulation may be restricted for stretching only from ω_sg(t_synch) to ω_sg(t_sgtip), which may be for example 50% of planned ω_sg(t₀).

In addition, for ensuring sufficient entry width at the entry of the converging phase plane trajectories to be sure that to actually catch the specific relative position y_sg(t_sgtip) at the rotational speed at ω_sg(t_sgtip), a plurality of simulations may be performed, each with a lower angular acceleration α_gof the gear 17, and subsequently selecting a second phase plane trajectory y_sg2that fulfils the following criteria: y_sg(time when ω_sg=ω_sgtip)≤y_sg1(time when ω_sg=ω_sgtip)+y_sgmax. This is all done beforehand during development stage for all possible planned gear shifts and are subsequently made available to the transmission controller, for example via a gear shift map stored in a computer memory accessible by a transmission controller.

The plurality of simulated phase plane trajectories y_sg2with gradually lower angular acceleration α_gare illustrated in FIG. 42B, and the selected second phase plane trajectory y_sg1,y_sg2that fulfils said criteria: y_sg(time when ω_sg=ω_sgtip)≤y_sg1(time when ω_sg=ω_sgtip)+y_sgmax. Is illustrated in FIG. 42C.

Later, when a gear shift is initiated for example by the driver, the synchronisation torque T_synch based on the maximal angular acceleration α_gis first applied directly, irrespective of current relative position y_sgxat the time point of receiving the gear shift command.

Subsequently, when the rotational speed difference ω_sghas decreased and equals the starting time for the closed loop controller at ω_sg(t_sgtip), which may be determined beforehand, the closed loop controller starts controlling the synchronisation torque T_synch, such that y_sgr(t_synch)=y_sg*(t_synch) at end of synchronisation phase, as illustrated in FIG. 42C.

The control method according to this example embodiment thus in general terms involves initiating the closed loop control first after at least 5%, specifically at least 25%, and more specifically at least 50%, of the total rotational speed difference (ω_sg) between the shift sleeve and the gear wheel, from the start to the end of the synchronisation phase, has passed.

Furthermore, as illustrated in FIG. 42D, if it is detected that at y_sgr(t_sgtip)<y_sg2, the phase plane trajectories have to be offset by y_sgmax, as described above with reference to equation 38, thereby giving new phase plane trajectories offset y_sg1, offset y_sg2. The same applies if it is detected that at y_sgr(t_sgtip)>y_sg1, as shown in FIG. 42E, thereby also triggering application of new offset phase plane trajectories, but in the opposite direction.

In other words, all simulations and preparations of the phase plane trajectories are made offline and stored in a memory accessible by the transmission control unit, for each possible gear shift scenario. Upon driving the vehicle and receiving a gear shift command at ω_sgx, maximum α_gsynchronisation torque T_synch is applied directly and the rotational velocity is decreased until ω_sgtip. When rotational speed difference is equal to ω_sgtip, then measure y_sgrtip.

The offset is performed according to the following logic:

if y_sg2tip(ω_sgtip)<y_sgr(ω_sgtip)<y_sg1(ω_sgtip)

then control y_sgrbetween available phase plane trajectories

if y_sg1(ω_sgtip)<y_sgr(ω_sgtip)

then offset y_sg2tipand y_sg1by n*y_sgmax and control between offset phase plane trajectories

if y_sg2(ω_sgtip)>y_sgr(ω_sgtip)

then offset y_sg2tipand y_sg1by n*y_sgmax and control between offset phase plane trajectories.

The present disclosure also relates to a control system for motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence for avoiding gear teeth interference, wherein the stepped gear transmission comprises an axially displaceable shift sleeve arranged on and rotationally secured to a shaft, and a constant mesh gear wheel arranged on and rotatable relative to said shaft. The control system being configured for performing the following steps:

- receiving a gear shift command,
- determining a target relative displacement (y*_sg) between the sleeve teeth and gear teeth for a state when a gear wheel rotational speed (ω_g) reaches a shift sleeve rotational speed (ω_s) at an end of the synchronisation phase, which target relative displacement (y*_sg) is determined for avoiding impact between sleeve teeth and gear teeth during a following gear engagement phase,
- determining a first phase plane trajectory (y_sg1) defining a relationship between a rotational speed difference (ω_sg) between the shift sleeve and the gear wheel and a relative displacement (y_sg) between the sleeve teeth and gear teeth, wherein the relative displacement (y_sg) according to the first phase plane trajectory (y_sg1) equals the target relative displacement (y*_sg) when said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase,
- determining a second phase plane trajectory (y_sg2) defining the relationship between the rotational speed difference (ω_sg) between the shift sleeve and the gear wheel and the relative displacement (y_sg) between the sleeve teeth and gear teeth, wherein the relative displacement (y_sg) according to the second phase plane trajectory (y_sg2) equals the target relative displacement (y*_sg) when said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase,
- applying a synchronisation torque (T_synch),
- controlling said synchronisation torque (T_synch) for keeping the real relative displacement (y_sgr) between the sleeve teeth and gear teeth within the boundaries of the first and second phase plane trajectories (y_sg1, y_sg2) for any rotational speed difference (ω_sg), such that the real relative displacement (y_sgr) between the sleeve teeth and gear teeth reaches said target relative displacement (y*_sg) simultaneously with said rotational speed difference (ω_sg) becomes zero at the end of the synchronisation phase.

Throughout the present detailed description, the drag torque T_dacting on the oncoming idler gear 17 is deemed to be constant, except possibly taking into account variation in drag torque Td caused be variation of transmission fluid temperature. However, in certain implementations, even better accuracy of the calculated first and second phase plane trajectories y_sg1, y_sg2 may be desirable for enabling even better reduction of noise and wear during gearshifts caused by impact between sleeve teeth and the idler gear dog teeth.

One approach for providing such improved accuracy of the calculated first and second phase plane trajectories y_sg1, y_sg2 may be to take also rotational speed into account for determining the drag torque T_d. Specifically, the drag torque may be calculated by

T_d=b×ω (42)

where b=constant friction coefficient, and ω=rotational speed of the oncoming gear 17.

Equations (4) and (5) for calculating resulting angular acceleration α_gon oncoming idler gear 17 may then be updated as

α_g=(−T_synch−(b×ω))÷J_g (43)

for upshifts, and

α_g=(T_synch−(b×ω))÷J_g (44)

for downshifts.

Similarly, equation (6) for calculating the synchronization time t_synchcan then be updated as

$\begin{matrix} t_{s y n c h} = \langle \ln [\frac{ω_{s} - \frac{T_{synch}}{b}}{ω_{g} (t_{0}) - \frac{T_{s y n c h}}{b}}] \times \frac{- J_{g}}{b} \rangle & (45) \end{matrix}$

A correspondingly updated version of the simulation running backwards in time from time t_synchto time t₀with a small decremental step of δt is shown in FIG. 43, replacing the previous calculation process of FIG. 27, wherein new constants l, m, n, o and p are introduced and calculated in the initialisation step. Moreover, also the iterating calculations of ω_g(t−δt) and θ_g(t−δt) are modified for taking the speed-varying drag torque T_dinto account.

The other parts of the backward in time calculation illustrated in FIG. 43 may remain unchanged, and when the calculation stops after (t_synch−t₀)÷δt iterations, as shown in FIG. 43, the results are collected and post processed to get ω_sg(t),∀t∈[t₀, t_synch] and y_sg1(t),∀t∈[t₀, t_synch], while taking account drag torque T_das a function of rotational speed, such that first and second phase plane trajectories y_sg1, y_sg2 may be calculated with a better accuracy. As before, the second phase plane trajectory of ω_sg(t),∀t∈[t₀, t_synch] and y_sg2(t),∀t∈[t₀, t_synch] can also be determined using the backward in time calculation according to FIG. 43, but based on a value of α_g<Max(α_g).

A further alternative solution for performing for motion control of a shift sleeve in a stepped gear transmission during a synchronization and gear engagement sequence for avoiding gear teeth interference involves adopting a modified approach for calculating the second phase plane trajectory y_sg2. This alternative approach may be implemented with or without taking into account drag torque T_das a function of rotational speed, i.e. according to equations 4-6 and the simulation of FIG. 27, or according to equations 43-45 and the backward in time calculation of FIG. 43.

Specifically, when applying the modified approach for calculating the second phase plane trajectory y_sg2, the generally time consuming pre-calculation of all relevant second phase plane trajectories y_sg2 using the backward in time calculation method described with reference to FIG. 27 or FIG. 43 may be omitted, and the second phase plane trajectories y_sg2 may instead simply be derived from the first phase plane trajectories y_sg1 using a suitable second offset, referred to as “offset2”. Thereby, amount of pre-calculation may nearly be halved.

FIG. 44 describes a modified embodiment of the backward in time calculation for determining the first and second phase plane trajectories y_sg1, y_sg2, based on equations 4-6 and the calculation flow chart of FIG. 27, i.e. based on the simplification that the drag torque T_dis constant and independent of rotational speed.

More in detail, the backward in time calculation of FIG. 44 includes defining a new constant

$s = \frac{y_{s g} \max}{ω_{s g} (0)}$

in the initialisation step. Thereafter, the backward in time calculation including (t_synch−t₀)÷δt iterations is completed and the results are collected. The post processed step is however slightly amended because it involves, after calculation of the first phase plane trajectories y_sg1, also calculating of a second offset according to: ffset2=s×ω_sg(t), i.e. constant “s” multiplied with ω_sg(t). Thereby, a suitable offset is provided that may be used for deriving the second phase plane trajectory y_sg2 from the first phase plane trajectories y_sg1. In particular, this is performed according to the following equation: y_sg2(t)−y_sg1(t)−offset. Thereby, one may obtain ω_sg(t),∀t∈[t₀, t_synch], and y_sg1(t),∀t∈[t₀, t_synch], and y_sg2(t),∀t∈[t₀, t_synch], using a single backward in time calculation as illustrated in FIG. 44.

The above example of “offset 2”, i.e. equal to s*ω_sg(t), which corresponds to a linear function in a y_sg; ω_sg(t)—graph, enables a relatively simple calculation of offset 2, thereby enabling use of low processing capacity. However, other, more complex mathematical models of the “offset 2” function may alternatively be used, such as an exponential function, or the like.

Although the disclosure has been described in relation to specific combinations of components, it should be readily appreciated that the components may be combined in other configurations as well which is clear for the skilled person when studying the present application. For example, although the method for motion control of a shift sleeve in a stepped gear transmission has been described in terms of rotational speed synchronisation of the idler gear 17 with the constant rotational speed of the shift sleeve 18, the method may of course equally be applied for rotational speed synchronisation of a shift sleeve with the constant rotational speed of an idler gear wheel. Thus, the above description of the example embodiments of the present disclosure and the accompanying drawings are to be regarded as a non-limiting example of the disclosure and the scope of protection is defined by the appended claims. Any reference sign in the claims should not be construed as limiting the scope.

The term “coupled” is defined as connected, although not necessarily directly, and not necessarily mechanically.

The term “relative displacement between the sleeve teeth and gear teeth”, or simply “relative displacement between sleeve and gear”, used herein refers to the circumferential relative displacement between sleeve and gear.

The term “real relative displacement” corresponds to a detected value of the circumferential relative displacement, i.e. a real value corresponding to the actual real circumferential relative displacement between the shift sleeve and gear wheel, as for example measured by means of sensor. Relative displacement corresponds to a value, such as a limit value in form of circumferential relative displacement of the first and second trajectories.

The term “target relative displacement” refers to the relative circumferential displacement between the dog teeth of the shift sleeve and the dog teeth of the gear wheel, that upon axial motion of the shift sleeve when the rotational speed difference becomes zero at the end of the synchronisation phase, results in sleeve dog teeth entering in the space between neighbouring gear wheel dog teeth to maximal engagement depth substantially or entirely without mutual contact, and preferably ending with a sleeve teeth side surface near or in side contact with an opposite gear teeth side surface.

The term “synchronisation torque” refers to a constant predetermined torque value that may be applied to the gear wheel for synchronising the rotational speed thereof, for example by means of a friction clutch, an electric motor or synchronizer rings.

The use of the word “a” or “an” in the specification may mean “one,” but it is also consistent with the meaning of “one or more” or “at least one.” The term “about” means, in general, the stated value plus or minus 10%, or more specifically plus or minus 5%. The use of the term “or” in the claims is used to mean “and/or” unless explicitly indicated to refer to alternatives only.

The terms “comprise”, “comprises” “comprising”, “have”, “has”, “having”, “include”, “includes”, “including” are open-ended linking verbs. As a result, a method or device that “comprises”, “has” or “includes” for example one or more steps or elements, possesses those one or more steps or elements, but is not limited to possessing only those one or more elements.

The following publications are included herein by reference.

REFERENCES

[1] M. Z. Piracha, A. Grauers and J. Hellsing, “Improving gear shift quality in a PHEV DCT with integrated PMSM,” in CTI Symposium Automotive Transmissions, HEV and EV Drives, Berlin, 2017.

[2] P. D. Walker and N. Zhang, “Engagement and control of synchronizer mechanisms in dual clutch transmissions,” Journal of Mechanical Systems and Signal Processing, vol. 26, p. 320-332, 2012.

[3] C.-Y. Tseng and C.-H. Yu, “Advanced shifting control of synchronizer mechanisms for clutchless automatic manual transmission in an electric vehicle,” Mechanism and Machine Theory, vol. 84, pp. 37-56, 2015.

[4] K. M. H. Math and M. Lund, “Drag Torque and Synchronization Modelling in a Dual Clutch Transmission,” CHALMERS UNIVERSITY OF TECHNOLOGY, Gothenburg, Sweden, 2018.

[5] C. Duan, “Analytical study of a dog clutch in automatic transmission application,” Internation Journal of Passengar Cars, Mechanical Systems, vol. 7, no. 3, pp. 1155-1162, 2014.

[6] Z. Lu, H. Chen, L. Wang and G. Tian, “The Engaging Process Model of Sleeve and Teeth Ring with a Precise, Continuous and Nonlinear Damping Impact Model in Mechanical Transmissions,” in SAE Technical Paper, 2017.

[7] A. Penta, R. Gaidhani, S. K. Sathiaseelan and P. Warule, “Improvement in Shift Quality in a Multi Speed Gearbox of an Electric Vehicle through Synchronizer Location Optimization,” in SAE Technical Paper, 2017.

[8] H. Hoshino, “Analysis on Synchronization Mechanism of Transmission,” in 1999 Transmission and Driveline Systems Symposium, 1999.

[9] H. Chen and G. Tian, “Modeling and analysis of engaging process of automated mechanical transmissions,” Multibody System Dynamics, vol. 37, pp. 345-369, 2016.

Number	Name	Date	Kind
8983744	Komura	Mar 2015	B2
9360109	Weingartz	Jun 2016	B2
10428903	Tsukada	Oct 2019	B2
20120312652	Kim	Dec 2012	A1
20170284538	Matsui	Oct 2017	A1

Number	Date	Country
101832387	Sep 2010	CN
102648365	Aug 2012	CN
102806837	Dec 2012	CN
203939970	Nov 2014	CN
107795676	Mar 2018	CN
2007132106	Nov 2007	WO

	Number	Date	Country
Parent	PCT/CN2019/113690	Oct 2019	US
Child	17227335		US

Method and system for gear engagement

Information

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Date Filed

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Agents

CPC

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CPC

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Abstract

Description

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Priority Claims (1)

RELATED APPLICATION DATA

US Referenced Citations (5)

Foreign Referenced Citations (6)

Non-Patent Literature Citations (10)

Related Publications (1)

Continuations (1)

Entry
International Search Report from corresponding International Application No. PCT/CN2019/113690, dated Feb. 1, 2020, 2 pages.
H. Chen and G. Tian, “Modeling and analysis of engaging process of automated mechanical transmissions,” Multibody System Dynamics, vol. 37, pp. 345-369, 2016.
M. Z. Piracha, A. Grauers and J. Hellsing, “Improving gear shift quality in a PHEV DCT with integrated PMSM,” in CTI Symposium Automotive Transmissions, HEV and EV Drives, Berlin, 2017.
P. D. Walker and N. Zhang, “Engagement and control of synchronizer mechanisms in dual clutch transmissions,” Journal of Mechanical Systems and Signal Processing, vol. 26, p. 320-332, 2012.
C.-Y. Tseng and C.-H. Yu, “Advanced shifting control of synchronizer mechanisms for clutchless automatic manual transmission in an electric vehicle,” Mechanism and Machine Theory, vol. 84, pp. 37-56, 2015.
K. M. H. Math and M. Lund, “Drag Torque and Synchronization Modelling in a Dual Clutch Transmission,” Chalmers University of Technology, Gothenburg, Sweden, 2018.
C. Duan, “Analytical study of a dog clutch in automatic transmission application,” Internation Journal of Passengar Cars, Mechanical Systems, vol. 7, No. 3, pp. 1155-1162, 2014.
Z. Lu, H. Chen, L. Wang and G. Tian, “The Engaging Process Model of Sleeve and Teeth Ring with a Precise, Continuous and Nonlinear Damping Impact Model in Mechanical Transmissions,” in SAE Technical Paper, 2017.
A. Penta, R. Gaidhani, S. K. Sathiaseelan and P. Warule, “Improvement in Shift Quality in a Multi Speed Gearbox of an Electric Vehicle through Synchronizer Location Optimization,” in SAE Technical Paper, 2017.
H. Hoshino, “Analysis on Synchronization Mechanism of Transmission,” in 1999 Transmission and Driveline Systems Symposium, 1999.