阅读说明：本技术 确定阀的切换状态的方法以及电磁阀组件 (Method for determining switching state of valve and solenoid valve assembly ) 是由 A·米歇尔 D·莫谢尔 E·温斯 于 2019-10-09 设计创作，主要内容包括：本发明涉及一种用于确定阀的切换状态的方法。在所述方法中,基于电流和电压测量来确定电感值,并且基于电感值来确定切换状态。本发明还涉及一种用于执行这种方法的电磁阀组件。(The invention relates to a method for determining a switching state of a valve. In the method, an inductance value is determined based on the current and voltage measurements, and a switching state is determined based on the inductance value. The invention also relates to a solenoid valve assembly for carrying out such a method.)

1. A method for determining a switching state of a valve (10) actuated by a coil (30), the method comprising the steps of:

-determining the current through the coil (30) and the voltage applied to the coil (30) respectively at several instants following each other at specified time intervals,

-calculating an inductance value of a coil (30) based on the current, the voltage and the time interval, and

-determining a switching state based on the inductance value.

2. The method of claim 1, wherein the first and second light sources are selected from the group consisting of,

-wherein the inductance value is calculated using a least squares method.

3. The method of claim 2, wherein the first and second light sources are selected from the group consisting of,

-wherein the least squares method is used recursively with a forgetting factor.

4. The method according to one of the preceding claims,

-wherein the inductance value is determined by a linear equation in which a first column vector is set equal to the matrix multiplied by a second column vector,

-wherein the time instants are numbered with an index k,

-wherein the first column vector contains in row k the difference between the current at time k +1 minus the current at time k,

-wherein the matrix has two columns,

-wherein a first column of the matrix contains in row k the sum of the voltage at time k +1 and the voltage at time k,

-wherein a second column of the matrix contains in row k the sum of the current at time k +1 and the current at time k, and

-wherein the second column vector contains the first parameter in its first row and the second parameter in its second row.

5. The method of claim 4, wherein the first and second light sources are selected from the group consisting of,

-wherein the inductance value is calculated as the quotient of the time interval divided by the number two and divided by the first parameter.

6. The method according to one of the preceding claims,

-wherein the resistance of the coil (30) is also calculated based on the current, the voltage and the time interval.

7. The method of claim 4 or claims dependent thereon,

-wherein the resistance of the coil (30) is calculated as the quotient of the second parameter divided by the first parameter.

8. The method according to one of the preceding claims,

-continuously or continuously repeating the method.

9. The method according to one of the preceding claims,

-wherein the inductance value is compared to a first end value and a second end value,

-wherein a first switching state is determined if the inductance value has at most a predetermined distance from the first end value, and

-wherein the second switching state is determined if the inductance value has at most a predetermined distance from the second end value.

10. The method of claim 9, wherein the first and second light sources are selected from the group consisting of,

-wherein the switching states are end states of the valve (10).

11. The method according to one of the preceding claims,

-wherein the switching state of the valve (10) is identified on the basis of the test signal.

12. The method according to one of the preceding claims,

-wherein the computation is performed in whole or in part by fixed point operations.

13. The method according to one of the preceding claims,

-wherein the coil (30) is controlled by pulse width modulation,

-wherein the current and the voltage are each averaged over a pulse width modulation period.

14. A solenoid valve assembly having

-a valve (10),

-a coil (30) for actuating the valve (10),

-control means (40) for applying a current and/or a voltage to the coil (30), and

-a state determination device (50) configured to perform the method according to one of the preceding claims.

Technical Field

The invention relates to a method for determining the switching state of a valve which is actuated by a coil. The invention also relates to a solenoid valve assembly designed to perform such a method.

Background

The valve may in particular be actuated by means of an electromagnet. For this purpose, a corresponding solenoid valve assembly can be provided, which generally has a valve and a coil for actuating the valve.

From the prior art it is known to switch valves by applying a current suitable for switching to the respective coil. The magnetic field generated in this manner typically switches the valve or maintains the valve in a particular state. However, in the embodiments according to the prior art it is generally assumed that the set or desired switching state is also actually assumed. No check is provided for this.

Disclosure of Invention

It is therefore an object of the present invention to provide a method for determining the switching state of a valve. It is another object of the present invention to provide a corresponding solenoid valve assembly.

According to the invention, this is achieved by a method and a solenoid valve assembly according to the respective main claims. Advantageous embodiments can be found, for example, in the respective dependent claims. The content of the claims is incorporated into the content of the description by explicit reference.

The invention relates to a method for determining the switching state of a valve which is actuated by a coil. The method comprises the following steps:

determining the current through the coil and the voltage applied to the coil, respectively, at several moments in time following each other at specified time intervals,

-calculating the inductance value of the coil based on these currents, voltages and time intervals, and

-determining a switching state based on the inductance value.

The invention is based on the insight that an inductance value can be determined by measuring the current and the voltage at the mentioned moments, wherein the switching state of the valve can be determined on the basis of the inductance value. This allows monitoring of the switching state, i.e. for example whether the valve is open or closed.

The current and/or voltage may be determined, for example, by measurement. Suitable measuring means can be used for this purpose. However, the current and the voltage may also each be determined by a specified value. This can be the case in particular by specifying and setting values by means suitable for the purpose. Thus, for example, a regulated current source may be used to set the determined current. The same applies to voltages. In this case, it is no longer absolutely necessary to measure the actual set value, it being mentioned here that it is still possible to measure this value.

An inductance in a physical sense may be used as the inductance value. However, values/variables indicative of inductance may also be used, such as values proportional to actual inductance but more easily calculated or processed. There is typically a relationship, such as a linear relationship, between the inductance/variable and the actual inductance.

The inductance value may be calculated using, inter alia, a least squares method. This has been found to be an efficient method.

The least squares method may preferably be used recursively with a forgetting factor. This may optimize the required computation time.

According to a preferred embodiment, the inductance value may be determined by a linear equation. In the linear equation, the first column vector is set equal to the matrix multiplied by the second column vector.

In particular, the time instants may be numbered with an Index (Index) k.

The first column vector may contain in row k the difference between the current at time k +1 minus the current at time k.

In particular, the matrix may have two columns. The first column of the matrix may contain in row k the sum of the voltage at time k +1 and the voltage at time k. The second column of the matrix may contain in row k the sum of the current at time k +1 and the current at time k.

The second column vector may contain the first parameter in its first row and the second parameter in its second row.

Solving such equations has been found to be an efficient and feasible method of determining the inductance value. The derivation process will be discussed in more detail below.

The inductance value or inductance may be calculated as the quotient of the time interval divided by the number 2 and divided by the first parameter. This allows for easy calculation of the inductance value or inductance based on the aforementioned equations.

It should be noted that the inductance value is easier to determine than the inductance in a strict physical sense, while the inductance value or other values based on the inductance and easier to calculate than the inductance may also be used for determining the switching state.

According to a refinement, the resistance of the coil can also be calculated on the basis of the current, the voltage and the time interval. This resistance can be used for further evaluation. It should be understood that instead of a resistance, a resistance variable having a relationship (e.g., a linear relationship) with the actual resistance may be specified. This is considered equivalent here.

The resistance of the coil is calculated in particular as the quotient of the second parameter divided by the first parameter. This allows the resistance to be easily calculated.

The method may in particular be repeated continuously or continuously. Whereby the state of the valve can be continuously monitored.

According to a preferred embodiment, the inductance value is compared to a first end value (Endwert) and a second end value. The first switching state may be determined when the inductance value is at most a predetermined distance from the first end value. The second switching state may be determined when the inductance value has at most a predetermined distance from the second terminal value. This has proven to be a feasible and reliable method of determining the switching state. It is based on the knowledge, inter alia, that the inductance assumes different values depending on the switching state, which values can be compared.

These switching states can be, in particular, end states of the valveHowever, intermediate states may also be determined.

The switching state of the valve can also be recognized from the test signal. The test signal can be applied to the coil so that the switching state can be recognized.

In particular, the calculations may be performed in whole or in part by fixed point operations. Such fixed point operations have proven to be particularly efficient for present purposes.

According to one embodiment, the coils may be controlled by pulse width modulation. The current and the voltage can then be averaged, in particular each over a pulse width modulation period. It has been shown that in this case the method can also be used in an advantageous manner for coils controlled by pulse width modulation.

According to one embodiment, the first storage matrix is formed as the product of the transpose of the matrix and the first column vector. The second storage matrix may be formed as the inverse of the product of the transpose of the matrix and the matrix. The first memory matrix and the second memory matrix may then be stored. In this case in particular, the first column vectors and matrices are preferably not stored as such. It has been shown that this leads to a simplified calculation.

The system of equations may be solved in particular in such a way that the second column vector is set equal to the product of the second memory matrix and the first memory matrix. This has proven to be an efficient calculation rule.

The invention also relates to a solenoid valve assembly. The solenoid valve assembly has a valve and a coil for actuating the valve. The solenoid valve assembly also has a control device for applying current and/or voltage to the coil. Whereby the valve or coil can be actuated.

The solenoid valve assembly also has a state determination device which is designed to carry out the method according to the invention. All of the embodiments and variations described herein may be used herein.

By means of the solenoid valve assembly according to the invention, the advantages mentioned further above can be made available to the solenoid valve assembly.

The invention also relates to a non-transitory computer-readable storage medium having stored thereon program code, during execution of which a method according to the invention is performed. All embodiments and variants described herein may be used in relation to the method according to the invention.

Drawings

Further features and advantages will be obtained by those skilled in the art from the following description of exemplary embodiments with reference to the attached drawings, in which:

figure 1 shows a solenoid valve assembly which is shown,

figure 2 shows an equivalent circuit diagram of the coil,

figure 3 shows the inductance as a function of valve position,

figure 4 shows the inductance as a function of current,

FIG. 5 shows a graph of resistance, and

fig. 6 shows a graph of inductance.

Detailed Description

FIG. 1 illustrates a solenoid valve assembly 5 according to an exemplary embodiment of the present invention. The solenoid valve assembly is configured for performing a method according to an exemplary embodiment of the present invention.

It should be understood that the solenoid valve assembly 5 is only schematically illustrated here.

The solenoid valve assembly 5 has a valve 10. The solenoid valve assembly also has an armature 20 which is connected to the valve 10 via an armature rod 25. The solenoid valve assembly also has a coil 30 that surrounds the armature 20. An electric current may be applied to the coil 30, whereby the armature 20 may move. This allows movement or actuation of the valve 10. In particular, the valve 10 can be switched between two end positions, in particular an open end position and a closed end position.

The solenoid valve assembly 5 also has a control device 40 which is designed to apply an electric current and/or a voltage to the coil 30. The control device is used for driving as described. In addition, the solenoid valve assembly 5 has a state determination device 50 which is configured to carry out the method according to the invention. The functionality will be discussed in more detail below.

As already mentioned, a switching state determination will be made for the valve 10. To this end, prior to describing further details, a mathematical model of the electrical subsystem of the coil 30 will now be discussed.

It should be understood that the mathematical details and formulas given below may also be used to limit the basic aspects of the claims.

The mathematical model of the coil 30 can reproduce the coil voltage u and the coil current i as well as the inductance L and the resistance R of the coil 30 in a good approximation with the following relation:

here, the time t is given as a parameter.

It should be noted that this equation is also applicable in the case of current control for pulse width modulation operation. However, in this case, u means an average voltage of the pulse width modulation period, and i means an average current of the pulse width modulation period.

Fig. 2 shows an equivalent circuit diagram, in which the inductance L, the resistance R, the voltage u and the current i are shown.

The dynamic saturation effect plays a secondary role in typical systems and voltage ranges. Thus, equation (1) above can be reduced to a good approximation as follows:

here, v denotes a tappet velocity of a tappet (not separately shown) of the valve 10. For example, the tappet may be the armature 20 already mentioned.

This mathematical model may be used to determine the state of the valve. This will be explained below.

Fig. 3 shows a graph of inductance versus tappet position for a typical solenoid valve (e.g., valve 10) at constant current. Fig. 4 shows a typical curve of the inductance with respect to the current of an unswitched (x ═ 0; reference sign S1) and switched (x ═ 1; reference sign S2) solenoid valve (for example, valve 10). The switching states are shown in percentage on the horizontal axis of fig. 3, while the inductance is shown in arbitrary units on the vertical axis. The current is plotted against the maximum current on the horizontal axis of fig. 4, and the inductance is plotted against the maximum inductance on the vertical axis of fig. 4. It is readily seen that knowledge of the inductance and current can be used to infer the switching state.

Since both the precise position dependence of the tappet velocity v and the inductance L (x, i) are unknown, the estimation is easy only when the valve tappet is not moving, i.e. when v is 0 and L (x, i) is L (i) applies. This is at least always satisfied when the valve tappet is located at one of the two end stops.

If L is₀L (0, i0) denotes the inductance in the unswitched state, and L₁L (100, i100) represents the inductance in the switching state, and in the case of a tappet at one of the end stops, the differential equation

Or differential equation

The method is applicable.

If the current varies over time, the inductance L can be estimated, and therefore also simply by comparing the estimated magnitude of the inductance L with L₀And L₁The comparison is made and the switching state can preferably also be inferred directly from the known current.

The method of inductance estimation is as follows.

If the sampling time T_sThe voltage curve and the current curve between the two measuring points are approximated by straight lines, and then the sampling point t is obtained_k＝kT_sAnd T_k+1＝(k+1)T_sThe relationship between the current curves is as follows:

a voltage curve is similarly obtained. Then by using [ t ]_k,t_k+1]To L₀The differential equation (3) and equation (5) for L are integrated together, which then gives:

or after simple rearrangement is

Thus, the determination of the parameter R, L is simplified to solve the linear least squares problem (7), and R, L may be represented by an alternative parameter p ═ p of the form [ p ]₁,p₂]^TTo determine:

the idea of state estimation of the valve is to recursively solve a least squares problem with a forgetting factor. This allows the inductance to be estimated in the case of a change in current, whereby the switching state can be determined by comparing the magnitudes. It should be noted that due to the position dependence of the inductance, the change in current occurs not only due to the change in coil voltage, but also when the tappet moves, for example as shown in equation (2) above. This also allows accidental valve switching to be detected, for example due to external forces or flow forces.

It should be noted that the recursive method of least squares can also be implemented in fixed point operations by suitable implementations. Furthermore, this method has a very low computational effort for the two estimated parameters, which also allows direct implementation in hardware by simple logic gates.

The calculations just described are performed by the state determining means 50. For this purpose, the corresponding voltages and currents are measured at the respective instants.

To verify the method, for a PWM operated solenoid, the duty cycle was set from 20% to 80% in 10% steps, while measuring the average coil current over the pulse width modulation period, and the average coil voltage. The algorithm described above is then applied to these voltage and current curves. The obtained resistance and inductance curves are shown in fig. 5 (horizontal axis: time in arbitrary units; vertical axis: resistance in arbitrary units) and fig. 6 (horizontal axis: time in arbitrary units; vertical axis: inductance in arbitrary units). It is easy to see that the algorithms for R and L converge after a short oscillation phase. It can also be seen from the curve of the inductance whether the valve is closed. At duty cycles of 20% and 30%, the current is insufficient to close the valve and the inductance value converges towards L0. In the case of a high duty ratio, the current is sufficient to close the valve, which increases the inductance, which is detected well by estimation.

The valve switching states considered so far are all control-related, i.e. it is assumed that the valves are switched at the request of the controller. It cannot be determined whether the valve changes its switching state due to flow forces or other external forces, or whether a normally closed valve is open at all, for example. Although methods already exist for determining the switching state, the resulting measurement signal is very small and susceptible to interference.

Now, the above estimation makes it possible for the first time to make an accurate and reliable judgment about the switching state of the digital valve. This means that functional safety requirements can be met better or for the first time. In addition, the fact that the state of the valve is known means that no hydraulic safety measures (such as check valves) are required. The resulting signal is quite large compared to the established method and is less sensitive to noise due to the filtering of the recursive least squares algorithm. In addition to inductance, the algorithm also determines the current resistance, similar to as an incidental product. The resistance can be used directly for usability problems.

Valve state estimation based on inductance change is particularly advantageous. It is important here to use the coil current and the coil voltage in combination with a mathematical model (3) or (4) and a suitable estimation method. For example, a recursive method of least squares may be used here, but other methods may also be used. Furthermore, for systems operating by pulse width modulation, it is advantageous to use the coil current averaged over the pulse width modulation period, as well as the coil voltage averaged. The duty cycle of the pulse width modulation period can also be used instead of the average coil voltage if the supply voltage is known.

The mentioned steps of the method according to the invention may be performed in the given order. However, these steps may also be performed in a different order. In one of its embodiments, the method according to the invention may be performed without performing other steps, for example, by a specific combination of steps. In principle, however, other steps, even those not mentioned, may also be performed.

The claims forming part of this application do not represent an implementation for which further protection is disclaimed.