The present invention relates to a method for the performance of the gear disengagement in a servo-controlled manual gear change.
Servo-controlled manual gear changes are increasingly widespread and, from a structural point of view, are entirely similar to a conventional manual gear change except for the fact that the control pedals and levers that can be actuated by the driver are replaced by corresponding electrical or hydraulic servo-controls. When using a servo-controlled manual gear change, the driver merely has to send a command to a control unit to change to a higher or a lower gear and the control unit independently performs the gear change by acting on the control of the butterfly valve and on the various servo-controls.
In normal driving conditions using a servo-controlled gear change, it is necessary to ensure a high level of comfort for passengers during the gear change stages; recent studies have shown that in order to ensure a high level of comfort for passengers it is necessary for the gear change to be performed rapidly without triggering oscillations likely to be noticed by the passengers.
It is known that the time duration of the gear change is determined largely by the synchronisation time of the new gear, i.e. by the time taken by the synchronisers to match the angular speed of the primary shaft of the gear change to the angular speed imposed by the new ratio.
In order to reduce the synchronisation time during the gear progression, i.e. during a change from a lower to a higher gear, it has been proposed to use a braking device coupled to the primary shaft of the gear change in order to brake the primary shaft and rapidly to match the angular speed of the primary shaft to the angular speed imposed by the new ratio. This solution is relatively costly and complicated, however, because it is necessary to provide and control a brake coupled to the primary shaft of the gear change.
The object of the present invention is to provide a method for the performance of the gear disengagement in a servo-controlled manual gear change, which is free from the drawbacks described above and which is in particular simple and economic to embody.
The present invention therefore relates to a method for the performance of the gear disengagement in a servo-controlled manual gear change as set out in claim 1.
The present invention will be described below with reference to the accompanying drawings which show a non-limiting embodiment thereof and in which:
In
The transmission members 1 further comprise a hydraulic servo-control 11 of known type which is adapted to control the clutch 4, and a hydraulic servo-control 12 of known type which is adapted to control the position of the secondary shaft 8 in order to determine the transmission ratio existing between the primary shaft 7 and the secondary shaft 8. The servo-controls 11 and 12 are controlled by a control unit 13 which is connected to a series of sensors (known and not shown) detecting commands from the driver and measuring the value of some reference magnitudes of the engine 2 and the transmission members 1.
A respective memory (known and not shown) in the control unit 13 stores the transmissibility function Tcl(x) of the clutch 4, which provides, for each position x of the clutch 4 (or rather for each position x of the pressure plate of the clutch 4), the torque Tcl transmitted by means of the clutch 4 from the drive shaft 10 to the primary shaft 7 of the gear change 5. In general, the transmissibility function Tcl(x) of the clutch 4 may be obtained from equation [0] in which F(x) is the force exerted by the pressure plate of the clutch 4, μ is the coefficient of friction between the discs of the clutch 4 and SIGN( ) is a binary sign function and assumes the value ±1 depending on whether the angular speed ωm(t) of the drive shaft 10 is higher or lower than the angular speed ω1(t) of the primary shaft 7.
Tcl(x)=F(x)*μ*SIGN(ωm(t)−ω1(t)) [0]
During a gear change from a current gear A to a subsequent higher gear B (i.e. having a longer transmission ratio), the control unit 13 controls the servo-controls 11 and 12 in order to open the clutch 4, to disengage the gear A, to engage the gear B and lastly to reclose the clutch 4. During the above-mentioned gear change operations, the control unit 13 keeps the drive torque Tm generated by the engine 2 constantly under control in order to maintain the angular speed ωm(t) of the drive shaft 10 substantially equal to the desired values.
The operations to perform the disengagement of the gear A having a transmission ratio τA in order to engage the new gear B having a transmission ratio τB are described below with particular reference to the time graphs of
At an instant immediately preceding the gear change in which the gear A is still engaged, the primary shaft 7 has an angular speed ω1A equal to the angular speed ωmA of the drive shaft 10, while the secondary shaft 8 has an angular speed ω2; the angular speeds ω1A and ω2 are correlated with one another by the equation
ω2=ω1A*τA [1]
At an instant immediately following the gear change in which the gear B has just been engaged, the primary shaft 7 has an angular speed ω1B equal to the angular speed ωmB of the drive shaft 10, while the secondary shaft 8 has an angular speed ω2B; the angular speeds ω1B and ω2B are correlated with one another by the equation
ω2B=ω1B*τB [2]
Assuming initially that the gear change operations take place in a time interval small enough not to make appreciable changes to the speed of the vehicle, the angular speed ω2(t) of the secondary shaft 8 (which is strictly linked to the speed of the wheels 3 and therefore to the speed of the vehicle) does not change during the gear change operations; this means that the angular speed ω2 of the secondary shaft 8 immediately prior to the gear change is equal to the angular speed ω2B of the secondary shaft 8 immediately after the gear change. It can be assumed from this that:
ω2=ω2B=ω1B*τB=ω1A*τA [3]
ω1B=ω1A*(τA/τB) [4]
ω1B<ω1A [5]
It will be appreciated from the above that during the gear change from gear A to gear B, the primary shaft 7 has to be uncoupled from the drive shaft 10 by actuating the clutch 4, the gear A has to be disengaged, the speed of the primary shaft 7 has to be reduced from the value ω1A to the value ω1B, the gear B has to be engaged, and the primary shaft 7 has to be coupled to the drive shaft 10 by deactivating the clutch 4.
Assuming that it is wished to commence the gear change at a conventional instant to (following a specific request from the vehicle driver), the clutch 4 is actuated by a substantially stepped control, i.e. the clutch 4 is caused to move from the deactivated or closed state to the actuated or open state in the smallest possible time interval Tc compatible with the physical limits imposed by the mechanics in play.
It is important to note that the assembly of the primary and secondary shafts 7, 8 of the gear change 5, the differential 6, the axle shafts 9 and the wheels 3 form a kinematic system which has its own inertial mass and its own torsional elasticity (due to the sum of all the potential deformations of the components of the kinematic system 14) which is loaded with a torque value equal to the drive torque Cm generated by the engine 2 when motion is transmitted from the engine 2 to the wheels 3.
The abrupt opening, i.e. according to a substantially stepped law, of the clutch 4 almost instantaneously cancels out the torque applied to the primary shaft 7 and, as a result of the energy stored in the elasticity of the kinematic system 14, triggers, in the angular speeds ω1(t) and ω2(t) of the primary and secondary shafts 7, 8, oscillations whose initial extent may also be relatively high (up to 30-40% of the initial values ω1A and ω2 of the angular speeds ω1(t) and ω2(t)) that tend to be attenuated according to a law of exponential type. In
The abrupt opening of the clutch 4 takes place when the clutch 4 is opened in a time lower than the duration of the first quarter-wave of the actual oscillation frequency of the mechanical system of which the primary shaft 7 is part; this condition is normally provided by a substantially stepped opening of the clutch 4. It will be appreciated that the higher the speed of opening of the clutch 4, the greater the amplitude of the oscillation that will be triggered in the angular speeds ω1(t) and ω2(t) of the primary and secondary shafts 7, 8; therefore, by regulating the speed of opening of the clutch 4 it is possible to regulate the amplitude of this oscillation.
The disengagement of the gear A is performed when the oscillation has brought the angular speed ω1(t) of the primary shaft 7 relatively close to the angular speed ω1B that the primary shaft 7 must assume to perform the engagement of the successive gear B. In this way, at the end of the disengagement of the gear A the angular speed ω1(t) of the primary shaft 7 is already close to the angular speed ω1B that the primary shaft 7 must assume to perform the engagement of the successive gear B with a substantial reduction of the synchronisation time of the new gear B, i.e. of the time taken by the synchronisers (known and not shown) to match the angular speed ω1(t) of the primary shaft to the angular speed ω1B imposed by the new gear B.
In order in particular to maximise the positive effect of reduction of the angular speed ω1(t) of the primary shaft 7, the disengagement of the gear A takes place around the maximum amplitude of an oscillation half-wave and in particular around the maximum amplitude of the first oscillation half-wave. By disengaging the gear A around the maximum amplitude of the first oscillation half-wave, moreover, the oscillation of the angular speed ω1(t) of the primary shaft 7 is blocked as it occurs.
It should be noted that when proceeding according to the disengagement method described above, in addition to obtaining the optimum conditions for minimising the subsequent synchronisation time, the time needed to achieve the complete disengagement of the gear A is also reduced to a minimum, since both the clutch 4 and the servo-control 11 are actuated in the shortest possible time.
“In order to disengage the gear A around the maximum amplitude of the first oscillation half-wave, it is enough to actuate the servo-control 12 before actuating the servo-control 11 of the clutch 4, or to actuate the servo-control 12 simultaneously with the actuation of the servo-control 11 of the clutch 4, or in any case before the clutch 4 has started to slip. In this way, the secondary shaft 8 is loaded with a force generated by the servo-control 12 which tends to disengage the gear A when the primary shaft 7 is still rigid with the drive shaft 10 via the clutch 4; in these conditions, the primary shaft 7 does not manage to move as a result of the forces of interaction between the primary shaft 7 and the secondary shaft 8 generated by the torque transmitted by the gear A which remains engaged. When the oscillation of the angular speed ω1(t) of the primary shaft 7 is around the maximum amplitude of an oscillation half-wave, the torque transmitted by the gear A is progressively reduced until it is cancelled out and makes it possible for the gear A to be disengaged as a result of the force exerted by the servo-control 12 previously actuated (in
In other words, the servo-control 12 is actuated (i.e. pressurised) before actuating the servo-control 11 of the clutch 4, but the thrust force that the servo-control 12 generates on the secondary shaft 8 is not enough to disengage the gear A until the torque transmitted by the gear A has been substantially reduced with respect to the initial value equal to the drive torque Cm generated by the engine 2; moreover, the torque transmitted by the gear A is sufficiently reduced to enable the disengagement of the gear A only around the maximum amplitude of an oscillation half-wave, i.e. for the first time around the maximum amplitude of the first oscillation half-wave.
It has been observed, in particular, that when actuating (i.e. pressurising) the servo-control 12 before actuating the servo-control 11 of the clutch 4, the disengagement of the gear A takes place only when the angular speed ω1(t) of the primary shaft 7 has exceeded 80% of the maximum amplitude of the relative oscillation half-wave.
According to a different embodiment, the servo-control 12 is actuated (i.e. pressurised) when the difference between the angular speed ω1(t) of the primary shaft 7 and the speed ωm(t) of the drive shaft 10 is higher as an absolute value than 50 rpm.
According to a possible embodiment, the duration of the time interval Tc may be adjusted to vary the maximum amplitude of the oscillations triggered in the angular speed ω1(t) of the primary shaft 7 as a function of the difference between the angular speed ω1A of the primary shaft 7 immediately before the gear change and the angular speed ω1B of the primary shaft 7 immediately after the gear change.
During the stage of reclosure of the clutch 4 after engaging the gear B, the angular speed ωm(t) of the drive shaft 10 is caused to equal the angular speed ω1(t) of the primary shaft 7, this angular speed ω1(t) being imposed by the speed of the vehicle since the primary shaft 7 is angularly rigid with the drive wheels 3 via the axle shafts 9, the differential 6, the secondary shaft 8 and the gearing of the gear B.
During the stage of reclosure of the clutch 4, the clutch 4 is sliding and transmits a torque Tcl between the drive shaft 10 and the primary shaft 7; in this situation, the law of motion is given by equation [6] in which Jm represents the moment of inertia of the engine 2 and ω′m(t) the time derivative of the angular speed ωm(t) of the drive shaft 10, i.e. the angular acceleration of the drive shaft 10.
Jm*ω′m(t)=Tm(t)−Tcl(t) [6]
Two further equations derive directly from equation [6]:
ω′m(t)=(Tm(t)−Tcl(t))/Jm [7]
Tcl(t)=Tm(t)−Jm*ω′m(t) [8]
In order to perform a relatively rapid reclosure of the clutch 4 while at the same time ensuring the comfort of the passengers, it is advantageous to regulate the engine 2 to avoid the generation of working torque (in these circumstances, in practice, the engine generates a slightly negative drive torque Tm as a result of the friction torques) and only partly to reclose the clutch 4, so as to cause the clutch 4 to transmit a constant and predetermined torque Tcl* to the primary shaft 7 of the gear change for a time interval sufficient to exhaust the surplus kinetic energy of the drive shaft 10 and to cause the drive shaft 10 to rotate substantially at an angular speed ωm(t) equal to the angular speed ω1(t) of the primary shaft 7. In these conditions, the engine 2 generates a mechanical energy lower than that needed for traction and transmitted by the clutch 4 and the energy deficit is recovered by discharging the kinetic energy possessed by the drive shaft 10 which slows down.
When the drive shaft 10 reaches an angular speed ωm(t) close to the angular speed ω1(t) of the primary shaft 7, the engine 2 is regulated in order progressively to reset the generation of a positive drive torque Tm; when the angular speed ωm(t) of the drive shaft 10 is very close, i.e. substantially equal, to the angular speed ω1(t) of the primary shaft 7, the clutch 4 is completely reclosed and the gear change is thus completed.
In other words, the method of reclosing the clutch 4 entails rapidly bringing the clutch 4 into a predetermined position x* in order to transmit a constant torque Tcl* (substantially equal to the drive torque T* supplied by the engine 2 immediately before the gear change) and to maintain the clutch 4 in the predetermined position x* until the synchronisation between the drive shaft 10 and the primary shaft 7 has taken place. The engine 2 is in particular set to supply a zero torque Tm (or, more generally, lower than the torque Tcl* transmitted by the clutch 4) until the angular speed ωm(t) of the drive shaft 10 is close to the angular speed ω1(t) of the primary shaft 7; at this point, the engine 2 is set progressively to increase the torque Tm supplied and the clutch is completely reclosed only when the angular speed ωm(t) of the drive shaft 10 is substantially equal (i.e. very close) to the angular speed ω1(t) of the primary shaft 7.
In general, before the gear change the vehicle has an acceleration a* produced by a drive torque T* supplied by the engine 2 as a result of the driving actions of the driver; moreover, in order to ensure maximum comfort, the gear change operations need to cause the least disturbance to the vehicle's progress. It is therefore advantageous for the torque Tcl* transmitted by the clutch 4 during the deceleration stage of the drive shaft 10 to be substantially equal to the torque T* in order to keep the law of motion of the vehicle unchanged and to prevent any disturbance to the passengers.
During the gear change operations, the control unit 13 calculates the value of the drive torque T* supplied by the engine 2 before the gear change and, via the transmissibility function Tcl(x) of the clutch 4, determines the position x* into which the clutch 4 (or rather the pressure plate of the clutch 4) is to be brought in order to transmit a torque Tcl* substantially equal (less the friction torques) to the torque T*.
It should be noted that from the point of view of the drive wheels (i.e. from the point of view of the vehicle), the gear change operations are completed at the time at which the clutch 4 has been brought to the position x* in order to transmit the torque Tcl* as from that time the drive wheels again receive the torque T* which they received prior to the gear change. This torque T* is obviously supplied by the engine 2, and in an initial stage is produced using the kinetic energy of the drive shaft 10 (which consequently slows down in order to synchronise with the primary shaft 7), while at a subsequent stage it is again produced by the engine 2 through the combustion of fuel.
It will be appreciated from the above that traction is returned to the vehicle before the gear change is finally completed with the complete reclosure of the clutch 4, as the drive wheels 3 receive full traction as soon as the stage of synchronisation of the drive shaft 10 with the primary shaft 7 commences, as during this stage the primary shaft 7 already receives from the clutch 4 a torque Tcl* substantially equal to the torque T* received before the gear change. In this way, the actual duration of the gear change from the point of view of the vehicle is smaller, as the zero driving torque stage is reduced.
Between the instant t2, in which the clutch 4 is rapidly brought from a completely open position to the predetermined intermediate position x* in order to transmit the constant torque Tcl*, and the instant t3, in which the angular speed ωm(t) of the drive shaft 10 is close to the angular speed ω1(t) of the primary shaft 7 (i.e. between the two angular speeds ωm(t) and ω1(t) there is a difference of between 50 and 200 rpm), the engine 2 is regulated by the control unit 13 to supply a zero torque Tm(t) (or, more generally, lower than the torque Tcl* transmitted by the clutch 4). From the instant t3, in which the angular speed ωm(t) of the drive shaft 10 is close to the angular speed ω1(t) of the primary shaft 7, the engine 2 is adjusted by the control unit 13 in order progressively to increase the torque Tm(t) supplied so as to cause the angular speed ωm(t) of the drive shaft 10 to vary according to a law of motion of the parabolic type, which is substantially tangential to the angular speed ω1(t) of the primary shaft 7 (angular speed ω1(t) substantially constant in the time interval in question).
It will be appreciated from the above that the angular speed ωm(t) of the drive shaft 10 prior to the instant t2 has a constant and slightly negative time derivative ω′m(t) as can be seen from equation [7] since the torque Tcl(t) transmitted by the clutch 4 is zero and the drive torque Tm(t) generated by the engine 2 is slightly negative as a result of the friction torques (the engine 2 is not supplied and does not generate working torque). Consequently, the angular speed ωm(t) of the drive shaft 10 before the instant t2 has a linear law of motion with a slight negative gradient.
The angular speed ωm(t) of the drive shaft 10 between the instant t2 and the instant t3 has a constant and highly negative time derivative ω′m(t) as can be seen from equation [7] since the torque Tcl(t) transmitted by the clutch 4 is constant and equal to the drive torque T* supplied by the engine 2 immediately prior to the gear change and the drive torque Tm(t) generated by the engine 2 is slightly negative as a result of the friction torques (the engine 2 is not supplied and does not generate working torque). Consequently, the angular speed ωm(t) of the drive shaft 10 between the instant t2 and the instant t3 has a linear law of motion with a marked negative gradient.
The angular speed ωm(t) of the drive shaft 10 between the instant t3 and the and the instant t4 has a negative derivative ω′m(t) whose modulus decreases in a linear manner over time as a result of the progressive increase of the drive torque Tm(t) generated by the engine 2 under the control of the control unit 13. As shown by equation [8], the torque Tcl(t) transmitted by the clutch 4 is constant and equal to the drive torque T* supplied by the engine 2 immediately prior to the gear change and the drive torque Tm(t) generated by the engine 2 increases in a linear manner as a result of the adjustments made by the control unit 13. Consequently, the angular speed ωm(t) of the drive shaft 10 between the instant t3 and the instant t4 has a parabolic law of motion; in practice, if the derivative ω′m(t) of the angular speed ωm(t) has a linear increase over time, the angular speed ωm(t) has a law of motion of parabolic type.
According to a different embodiment, the law of the motion of the angular speed ωm(t) could not be a law of parabolic type. However, the use of a law of parabolic type is particularly advantageous as the law of parabolic type makes it possible to cause the angular speed ωm(t) to synchronise with the angular speed ω1(t) in an extremely gentle and gradual way (as the parabola of the angular speed ωm(t) is designed such that it is substantially tangential to the straight line of the angular speed ω1(t)); moreover, the creation of a parabolic law of motion is relatively simple as it requires the derivative ω′m(t) of the angular speed ωm(t) to have a linear increase over time, i.e. (on the basis of equation [2]), it requires the drive torque Tm(t) generated by the engine 2 to show a linear increase over time.
As shown in
The drive block 15 controls the engine 2 in torque, i.e. it communicates to a control unit (known and not shown) of the engine 2 the value of the objective torque Tmob(t) that the engine 2 has to supply such that the angular speed ωm(t) follows the course of the reference signal ωmrif(t). The value of the objective torque Tmob(t) is calculated by the drive block 15 by means of the sum of two independent components Tmob1(t) and Tmob2(t); the value of Tmob1(t) is calculated by an open loop control logic on the basis of the torque Tcl(t) transmitted by the clutch 4, while the value Tmob2(t) is calculated by means of a closed loop control logic on the basis of the difference between the angular speed ωm(t) and the reference signal ωmrif(t). More particularly, the value of the objective torque Tmob(t) is calculated by applying the following equations [9], [10] and [11], in which K is a coefficient of gain depending on the operating condition.
Tmob(t)=Tmob1(t)+Tmob2(t) [9]
Tmob1(t)=K*(ωmrif(t)−ωm(t)) [10]
Tmob2(t)=Tcl(t)+Jm*ω′m(t) [11]
By varying the value of the coefficient of gain K and/or the course of the reference signal ωmrif(t), it is possible to vary both the duration of the time interval between the instant t3 and the instant t4 (i.e. the stage of renewed torque at the end of the gear change), and the gradient with which the angular speed ωm(t) of the drive shaft 10 approaches the angular speed ω1(t) of the primary shaft 7. It should be noted that the actual duration of the stage of renewed torque substantially has no effect on the dynamic behaviour of the vehicle, as the traction on the drive wheels 3 has already been returned from the instant t3 as described above.
In general, wear and temperature variations affect both the coefficient μ of friction between the discs of the clutch 4 and the force F(x) exerted by the pressure plate of the clutch 4.
Tcl(t)=Tm(t)−Jm*ω′m(t) [8]
It will be appreciated from equation [8] that it is possible to calculate the torque Tcl transmitted by the clutch 4 when the drive torque Tm generated by the engine 2 is known, which torque Tm can be obtained in a known manner from the operating parameters of the engine 2, when the moment of inertia Jm of the engine 2 is known, which moment Jm is constant and can be readily obtained, and when the angular acceleration ω′m(t) of the drive shaft 10 is known, which acceleration ω′m(t) can be calculated simply from the observation of the angular speed ωm(t) of the drive shaft 10.
As the position of the clutch 4 is known as it is determined by the servo-control 11, by applying equation [8] it is possible to calculate the value of the torque Tcl actually transmitted by the clutch 4 in this position.
During the stage of reclosure of the clutch 4 after engagement of the gear B, the purpose of the control unit 13 is to cause the angular speed ωm(t) of the drive shaft 10 to be equal to the angular speed ω1(t) of the primary shaft 7, i.e. to provide the drive shaft 10 with an angular acceleration ω′m(t) which is not zero (positive or negative depending on whether the drive shaft 10 is slower or faster than the primary shaft 7). As shown by equation [1], in order to provide the drive shaft 10 with an angular acceleration ω′m(t) which is not zero, the control unit 13 has two degrees of freedom, i.e. two independent variables to be controlled: the torque Tcl transmitted by the clutch 4 and the drive torque Tm generated by the engine 2.
In order to ensure optimum conditions for accurately determining the value of the torque Tcl actually transmitted by the clutch 4 at a given position of this clutch 4, and therefore to make it possible to update the transmissibility function Tcl(x) of the clutch 4, the control unit 13 sets the engine 2 to generate a constant drive torque Tm (for instance a drive torque Tm of mere maintenance, i.e. zero from the point of view of the clutch 4) and at the same time controls the servo-control 11 to dispose the clutch 4 in a fixed position so that the torque Tcl transmitted by the clutch 4 has a predetermined fixed value greater than that supplied by the engine. This makes it possible to obtain an increase or a decrease (depending on whether the drive shaft 10 is slower or faster than the primary shaft 7) of the angular speed ωm(t) of the drive shaft 10. This increase or decrease will in any case be constant as it is determined by a constant angular acceleration ω′m(t) as shown by equation [7] in which all the terms to the right of the equal sign are constant.
The fact that the angular acceleration ω′m(t) is maintained constant in a certain time interval makes it possible to calculate this angular acceleration ω′m(t) simply and with a high degree of accuracy from the observation of the angular speed ωm(t) of the drive shaft 10. In this way, the actual value of the torque Tcl transmitted by the clutch 4 may also be accurately calculated by applying equation [8].
According to a different embodiment, in order to calculate the actual value of the torque Tcl transmitted by the clutch 4, all supply to the engine 2 is discontinued in order to prevent any working torque from being generated, and the drive torque Tm is therefore negative and will depend solely on the internal friction torques of the engine 2, whose value can be readily calculated with a relatively high degree of accuracy.
It will be appreciated from the above that the calculation of the actual value of the torque Tcl transmitted by the clutch 4 in a given position of this clutch 4 is simple and generally highly accurate, as the use of equation [8] involves only physical magnitudes of the engine 2.
Once the actual value of the torque Tcl transmitted by the clutch 4 has been obtained, it is compared with the value obtained from the transmissibility function Tcl(x) stored in the control unit 13 in order to calculate an index of “degradation” due to the variations over time of the mechanical properties of the clutch 4. The degradation index obtained is then filtered, taking account of the degradation indices obtained from previous calculation stages, and used to update the transmissibility function Tcl(x) of the clutch 4.
Number | Date | Country | Kind |
---|---|---|---|
BO2000A0627 | Oct 2000 | IT | national |
Number | Name | Date | Kind |
---|---|---|---|
6234933 | Tornatore | May 2001 | B1 |
6468182 | Brandt et al. | Oct 2002 | B1 |
Number | Date | Country |
---|---|---|
0276609 | Aug 1988 | EP |
2431642 | Feb 1980 | FR |
2 431 642 | Feb 1980 | FR |
Number | Date | Country | |
---|---|---|---|
20020062187 A1 | May 2002 | US |