1. Field of the Invention
The present invention concerns a method and a device for determining the pressure in the combustion chamber of an internal combustion engine, in particular a spontaneous ignition engine.
The present invention also concerns a method and a device for controlling fuel injection in an internal combustion engine, in particular a spontaneous ignition engine, using said method for determining the pressure in the combustion chamber.
2. Description of the Related Art
As is known, the cars currently on the market are equipped with a complex and sophisticated control system that is able to implement complex control strategies with the aim of optimizing, on the basis of information received from physical on-board sensors, certain important engine quantities such as consumption, exhaust emission levels, engine torque, and acoustic noise produced by the engine.
In general, the cost limits imposed by the automobile market on cars make it practically impossible to adopt closed-loop control strategies, which can be achieved only for research purposes in specially set-up laboratories, and allow only the adoption of open-loop control strategies operating on the basis of maps memorized in the electronic control unit and experimentally defined on the work-bench during the engine design phase, with all the consequences that may ensue from the absence of feedback, such as poor reliability and unsatisfactory performances.
The closed-loop control achieved in the laboratory operates on the basis of the pressure value in the combustion chamber, since all the above-mentioned engine quantities to be optimized can be derived from this, and the pressure value in the combustion chamber is measured by means of a dynamic pressure sensor arranged in the combustion chamber and able to follow the sudden pressure variations in the engine cycle.
However, the closed-loop control described above is applicable only in the laboratory on experimental prototypes and cannot at the moment be adopted on cars intended for the market due not only to the high cost of the dynamic pressure sensor but above all due to the numerous problems deriving from the use of the pressure sensor such as its bulk in the combustion chamber, the need for its periodic maintenance and replacement due to wear, since it is subject to the high pressures and temperatures present in the combustion chamber, replacement which, inter alia, would require an estimate of its average life cycle, and last but not least the need to provide a specific electronic device that manages it (an amplifier, a sophisticated filter, a current-voltage-pressure converter).
The aim of the present invention is to provide a method and a device for determining the pressure in the combustion chamber and a device for controlling fuel injection in an internal combustion engine, in particular a spontaneous ignition engine, which make it possible to overcome the above-mentioned problems connected with the use of a dynamic pressure sensor, in particular which do not need a dynamic pressure sensor arranged in the combustion chamber and which at the same time present performances comparable with those that can be obtained with a dynamic pressure sensor.
According to the present invention a method and a device for determining the pressure in the combustion chamber of an internal combustion engine, in particular a spontaneous ignition engine, are provided.
According to the present invention a method and a device for controlling fuel injection in an internal combustion engine, in particular a spontaneous ignition engine, are also provided.
For a better understanding of the present invention, a preferred embodiment is now described, purely as a non-limiting example, with reference to the enclosed drawings, in which:
The idea underlying the present invention is providing a determining device actually constituting a virtual pressure sensor external to the combustion chamber, able to assess in real time the pressure in the combustion chamber, in the manner described below in detail, and to supply to the electronic control unit a pressure signal completely equivalent to the one supplied by a dynamic pressure sensor used in laboratory, and actually constituting a virtual feedback signal that can be directly used by the electronic control unit to closed-loop control the above-mentioned car quantities.
In this way it is actually possible to realize a closed-loop control system completely equivalent to that used in laboratory but without the need of a pressure sensor arranged in the combustion chamber, thus allowing its adoption on cars intended for the market.
The virtual sensor 7 can be made as a distinct electronic device, independent from and connected to the electronic control unit 4, as shown in
The virtual sensor 7 is nothing else than a device implementing a mathematical model through which it is possible to simulate what happens in the combustion chamber and to derive therefrom, instant by instant, the instantaneous pressure value in the combustion chamber (Pressure Simulator Model).
The mathematical model on which the virtual sensor is based implements the first thermodynamic principle equation, applied to the cylinder-piston system:
where:
The above equation expresses in mathematical terms the physical principle according to which at the general crank angle θ, the flow of heat released by the combustion reactions (dQb/dθ) balances the variation of the internal energy (dE/dθ) of the system, the mechanical power exchanged with the external environment (dL/dθ) through the piston and the flow of heat lost by transmission through the walls of the cylinder-piston system both by convection and by irradiation (dQr/dθ).
As regards the individual quantities that appear in the previous equation, the heat (Qb) developed by the combustion of the air-fuel mixture can for example be modeled by means of a double Wiebe function (for a detailed discussion of this model, see for example Motori a combustione interna, G. Ferrari, Edizioni II Capitello, Turin, Chapter 11); the heat exchanged (Qr) with the outside environment can, for example, be modeled using the heat transmission model proposed by Woschni (for a detailed discussion of this model, see also Motori a combustione interna, G. Ferrari, Edizioni II Capitello, Turin, Chapter 14); the internal energy (E) can, for example, be calculated considering the fluid as a perfect gas at a certain temperature; and lastly the work (L) exchanged with the outside environment can, for example, be calculated considering the cylinder-piston system as a variable geometry system according to the crank gear law.
Making each of the terms of the previous equation explicit as a function of the pressure variation dP/dθ which takes place inside the cylinder, four distinct contributions to the overall pressure variation can be identified:
where:
dP(θ)MOTORED/dθ represents the contribution due to the compression and subsequent expansion of the working fluid inside the cylinder by the piston, which takes place according to the known crank gear law, following with good approximation a polytropic thermodynamic transformation. Having fixed the engine geometry (stroke, bore, compression ratio) and the polytropic exponent, it depends solely on the crank angle θ;
dP(θ)BURNING/dθ represents the contribution due to the chemical reaction of combustion of the air-fuel mixture. Using a combustion heat release model, such as the double Wiebe model, this term depends only on the crank angle θ, as well as on certain parameters which have been chosen in an optimum manner as described below;
dP(θ)LOSS/dθ represents the contribution due to the heat losses by conduction and irradiation through the walls of the cylinder and the surface of the piston. Having chosen a heat transmission model, such as the Woschni model, this term depends only on the crank angle θ, as well as on certain parameters which have been chosen in an optimum manner as described below; and
dPVALVE
In particular, the dependence of the individual quantities that appear in the first thermodynamic principle equation on the pressure in the combustion chamber is not described here in detail since it is widely known in the literature. In fact, the dependence of the developed heat (Qb) on pressure can be derived directly from the above-mentioned double Wiebe function, the dependence of the exchanged heat (Qr) on pressure can also be derived directly from the Woschni model, the dependence of the internal energy (E) on pressure derives from the physical law according to which energy depends on temperature through the mass and the specific heat at constant volume and temperature depends on pressure according to the perfect gas law, and lastly the dependence of work (L) on pressure derives from the physical law according to which the work is equal to the product of pressure multiplied by volume.
Moreover, it is considered useful to point out the fact that the previous equation does not contain any multiplying or adding constants, since it has the sole purpose of indicating to the reader which are the contributions that together determine the pressure variation in the combustion chamber and not that of defining a mathematically strict relationship between the pressure in the combustion chamber and the various physical quantities.
Estimating the computational weights of the four terms that appear in the previous equation, the term dPVALVE
It is therefore possible to eliminate that term and to account for it by means of a simplified equivalent model, in particular by suitably modifying the other terms that contribute to the overall pressure variation. In fact, the effect of the lifting of the valve causes a variation of the exponent n of the polytropic transformation with which the behavior of a thermal engine and of the geometric compression ratio (which does not appear explicitly but is contained in the calculation of the total volume V) is described. So, in the simplified equivalent model a variability with θ of these two quantities (n, V) may be added, and in particular, since the eliminated term depends strongly on the angular velocity, their dependence on the angular velocity of the engine may also be advantageously taken into account according to a look-up table obtained experimentally.
Finally the simplified equivalent model may be described by means of the following equation:
and where:
dP(rpm,θ)MOTORED/dθ represents the contribution to pressure variation due to the geometric variation of the cylinder-piston system as the crank angle θ varies;
dP(rpm, θ)BURNING/dθ represents the contribution to pressure variation due to combustion; and
dP(rpm, θ)LOSS/dθ represents the contribution to pressure variation due to heat losses through the radiating walls of the cylinder and of the piston,
having indicated with:
The above-mentioned experimental look-up table with which it is possible to express the dependence of n and V on the engine speed can be obtained as follows.
First of all the behavior of the engine in “motored” operation is analyzed, that is in the absence of combustion. In particular, the pressure value in the laboratory is measured, and, since the mathematical relation (a polytropic thermodynamic transformation) which links pressure, volume and the exponent of the polytropic transformation n is known and since the volume that can be calculated from the engine geometry and from the crank gear law is known, it is possible obtain the latter with the varying of the crank angle (θ) and of the angular velocity (rpm) of the engine shaft.
The estimate of the real compressions ratio is obtained similarly: knowing the maximum pressure, which can be measured experimentally, and the mathematical relation which links it to the real compression ratio by means of the value of n and the pressure at the start of intake, which is with fair approximation the same as atmospheric pressure, it is possible to obtain the value of the real compression ratio, the only unknown in the mathematical relation.
In the light of the above, the virtual sensor according to the present invention can be functionally schematized by means of the block diagram shown in
In particular, the block 10 is made up of:
a first calculation block 11 receiving the crank angle θ, the engine speed rpm, and the previous instantaneous value of the pressure P, calculated and supplied by the block 10, and supplying the value of the contribution dP(rpm, θ)MOTORED/dθ to the pressure variation due to the compression and subsequent expansion of the fuel inside the cylinder by the piston;
a second calculation block 12 receiving the crank angle θ, the engine speed rpm, the quantity of fuel mc injected into the engine in the current engine cycle and the instant of start of injection SOI, and supplying the value of the contribution dP(rpm, θ)BURNING/dθ to the pressure variation due to the chemical reaction of combustion of the air-fuel mixture;
a third calculation block 13 receiving the crank angle θ, the engine speed rpm, the quantity of fuel mc injected into the engine in the current engine cycle, the instant of start of injection SOI and the previous instantaneous value of the pressure P calculated and supplied by block 10, and supplying the value of the contribution dP(rpm, θ)LOSS/dθ to the pressure variation due to the heat losses by conduction and irradiation through the walls of the cylinder and the surface of the piston;
an adder block 14 receiving the three contributions dP(rpm, θ)MOTORED/dθ, dP(rpm, θ)BURNING/dθ and dP(rpm, θ)LOSS/dθ supplied by the three calculation blocks 11, 12 and 13, and supplying the pressure variation dP(rpm, θ)/dθ as the sum of the above-mentioned three contributions; and
an integration block 15 receiving the pressure variation dP(rpm, θ)/dθ supplied by the adder block 14 and supplying the instantaneous pressure value P in the combustion chamber of the engine, value which, as stated above, is supplied to the calculation blocks 11 and 13 for the calculation of the subsequent instantaneous pressure value P.
In particular, as shown in
a first calculation block 16 memorizing a first look-up table which defines a mathematical relation between the (real) compression ratio rc and the engine speed rpm, in particular containing, for each value of the engine speed rpm, a respective value of the compression ratio rc, the first calculation block 16 receiving the value of the engine speed rpm and supplying a respective value of the compression ratio rc;
a second calculation block 17 memorizing a second look-up table which defines a mathematical relation between the engine speed rpm, the rank angle θ and the exponent n of the polytropic transformation, in particular containing, for each combination of values of the engine speed rpm and of the crank angle θ, a respective value of the exponent n of the polytropic transformation, the second calculation block 17 receiving the values of the engine speed rpm and of the crank angle θ and supplying a respective value of the exponent n of the polytropic transformation;
a third calculation block 18 receiving the values of the compression ratio rc supplied by the calculation block 16 and of the crank angle θ and supplying the value of the instantaneous volume V(θ) occupied by the air-fuel mixture; and
a fourth calculation block 19 receiving the previous instantaneous value of the pressure P supplied by the block 10 and the values of the instantaneous volume V(θ) occupied by the air-fuel mixture supplied by the third calculation block 18 and of the exponent n of the polytropic transformation supplied by the second calculation block 17 and supplying the value of the contribution dP(rpm, θ)MOTORED/dθ to the pressure variation in the combustion chamber due to the compression and subsequent expansion of the fuel inside the cylinder by the piston, contribution which is calculated according to the equation indicated previously.
Instead, as shown in
a first calculation block 20 identical to the first calculation block 16 in
a second calculation block 21 identical to the second calculation block 17 in
a third calculation block 22 receiving the values of the compression ratio rc supplied by the calculation block 20 and of the crank angle θ and supplying the value of the instantaneous volume V(θ) occupied by the fuel;
a fourth calculation block 23 implementing the above-mentioned optimized double Wiebe function, receiving the quantity of fuel mc injected into the engine and the instant of the start of injection SOI and supplying the value of the term mc·(dxb/dθ) which appears in the equation of the contribution dP(rpm, θ)BURNING/dθ to the pressure variation in the combustion chamber due to the chemical reaction of combustion of the air-fuel mixture; and
a fifth calculation block 24 receiving the values of the instantaneous volume V(θ) occupied by the air-fuel mixture supplied by the calculation block 22, of the exponent n of the polytropic transformation supplied by the calculation block 21, and of the term mc·(dxb/dθ) supplied by the calculation block 23 and supplying the value of the contribution dP(rpm, θ)BURNING/dθ, which is calculated according to the equation indicated previously.
Lastly, as shown in
a first calculation block 25 identical to the first calculation block 16 in
a second calculation block 26 identical to the second calculation block 17 in
a third calculation block 27 memorizing a third look-up table which defines a mathematical relation between the engine speed rpm, the quantity of fuel mc injected into the engine, the instant of the start of injection SOI and the temperature Ti of the inside walls of the cylinder, in particular containing, for each combination of values of the engine speed rpm, of the quantity of fuel mc injected into the motor and of the instant of the start of injection SOI, a respective value of the temperature Ti of the inside walls of the cylinder, the third calculation block 27 receiving the values of the engine speed rpm, of the quantity of fuel mc injected into the engine and of the instant of the start of injection SOI and supplying a respective value of the temperature Ti of the inside walls of the cylinder;
a fourth calculation block 28 memorizing a fourth look-up table which defines a mathematical relation between the engine speed rpm, the quantity of fuel mc injected into the engine, the instant of the start of injection SOI and a loss calibration factor LCF ( ), in particular containing, for each combination of values of the engine speed rpm, of the quantity of fuel mc injected into the engine and of the instant of the start of injection SOI, a respective value of the loss calibration factor LCF, the fourth calculation block 28 receiving the values of the engine speed rpm, of the quantity of fuel mc injected into the engine and of the instant of the start of injection SOI and supplying the value of the loss calibration factor LCF;
a fifth calculation block 29 receiving the values of the compression ratio rc supplied by the calculation block 25 and of the crank angle θ and supplying the value of the instantaneous volume V(θ) occupied by the fuel;
a sixth calculation block 30 implementing the above-mentioned Woschni model, receiving the previous instantaneous pressure value P supplied by the block 10 and the values of the temperature Tg of the fluid inside the combustion chamber and of the bore A of the engine cylinders (engine parameter memorized in the electronic control unit) and supplying the value of the instantaneous coefficient hi of global transmission between fluid and radiating surface (for the equation with which to calculate the instantaneous coefficient hi see the above-mentioned Motori a combustione interna);
a seventh calculation block 31 receiving the quantity of fuel mc injected into the engine and the quantity of air ma sent into the cylinder and supplying the number N of moles of the fluid inside the combustion chamber, as described below; and
an eighth calculation block 32 receiving the values of the instantaneous volume V(θ) occupied by the fuel supplied by the calculation block 29, of the exponent n of the polytropic transformation supplied by the calculation block 26, of the loss calibration factor LCF supplied by the calculation block 28, of the engine speed rpm, and of the instantaneous coefficient hi of global transmission between fluid and radiating surface, as well as the number N of moles of the working fluid supplied by the calculation block 31, and the previous instantaneous pressure value P supplied by the block 10, and supplying the value of the contribution dP(rpm, θ)LOSS/dθ to the pressure variation in the combustion chamber due to the heat losses through the radiating walls of the piston and of the cylinder, which is calculated according to the equation indicated previously.
In particular, in calculation block 31 the number N of moles of the fluid inside the combustion chamber is calculated according to the equation:
in which:
ma=ρa·VT=ρa·(Vcy+Vcc)
having indicated with:
Moreover, in the calculation block 32 the value of the temperature Tg of the fluid inside the combustion chamber which appears in the equation of the contribution dP(rpm, θ)LOSS/dθ can be obtained with fair approximation from the perfect gas state law, therefore as a function of the values of the pressure P and of the volume V, knowing the number of moles N of the working fluid. In fact, the value of the volume can be obtained from the mass of fuel mc injected and from the mass of air ma sent into the cylinder, knowing the molecular masses of the two elements. Instead, the value of the coefficient hi, using the Woschni model to model losses, is a function of the values of pressure, temperature and bore, the last being a geometric parametric characteristic of the specific engine being examined and memorized in the electronic control unit.
Moreover, the mathematical model on which the virtual sensor according to the invention is based, model which, as stated above, implements the equation of the first thermodynamic principle applied to the cylinder-piston system, needs, like all mathematical models, an initial optimization or calibration so that the estimated pressure approximates as accurately as possible the pressure that can be measured experimentally. This optimization can be conveniently accomplished by parameterizing, using soft-computing techniques, numerous thermodynamic variables, such as the engine speed, the mass of injected fuel and the instant of start of injection, and other operative parameters listed below, and by calculating, for each possible combination of inputs, for example by means of a genetic algorithm, the combination of the values of the above-mentioned thermodynamic variables and of the above-mentioned operative parameters which leads to the best approximation of the estimated pressure. These combinations of values are then inserted in a look-up table which the model uses in the calculation of the theoretical cycle.
In particular, the applicant has experimentally checked that the operative parameters that should be considered in optimization are:
fraction of fuel burn in the premixed phase (β);
angular delay of the start of combustion (d) with respect to the angle of injection;
temperature of the walls of the cylinder (Ti);
loss calibration factor (LCF);
duration of the premixed phase (tp);
duration of the diffusive phase (td);
form factor of the premixed phase (first vibe) (mp); e
form factor of the diffusive phase (second vibe) (md), said form factors appearing in the double Wiebe model mentioned above.
In particular, the applicant has checked that the ranges of parameters that can be used in optimization are:
As may be seen, the pressure curve estimated using the present invention gives an almost optimum approximation of the pressure curve measured by means of a dynamic pressure sensor arranged in the combustion chamber and the only errors that can be seen are made corresponding to the pressure peak and in the expansion phase, but these are less than three bar, that is less than 5%, and this precision is sufficient for a good engine control.
The advantages of the present invention are clear from the above description.
In particular, the present invention allows a reliable determination of the pressure value in the combustion chamber during operation of the engine without requiring the installation inside the combustion chamber of an expensive pressure sensor that would be complicated to install and maintain. The estimated pressure can therefore be exploited to realize the same feedback which is realized by means of a real sensor. In this way it is possible to plan a closed-loop control system based on the virtually sensor according to the invention, with all the economic and practical advantages that it offers (no installation, maintenance or additional hardware), and without having to physically realize the feedback channel.
In this way, the present invention allows the combination of the benefits in terms of costs typical of open-loop control systems with the benefits in terms of performance typical of closed-loop control systems.
Lastly it is clear that modifications and variations may be made to all that is described and illustrated here without departing from the scope of protection of the present invention, as defined in the appended claims.
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