This application claims priority to German Patent Application No. 102020206571.3 filed on May 26, 2020, the content of which is incorporated by reference herein in its entirety.
The subject matter described herein relates to a device and to a method for ascertaining a mechanical stress component, and in particular of a shear stress and/or a normal stress, making use of a Hall sensor circuit. The mechanical stress component ascertained using the Hall sensor circuit can be used, for example, to compensate for a negative effect of this mechanical stress component on the parametric accuracy and/or parametric stability of another device, e.g. one that is separate from the Hall sensor circuit. This means that the Hall sensor circuit can be used to ascertain mechanical stress components that can then in turn be used to have an effect on other devices.
The Hall sensor circuit can be an integrated circuit on a semiconductor substrate as part of a circuit arrangement. In addition to the Hall sensor circuit, additional, further components and/or additional, further integrated circuit arrangements can be present on the semiconductor substrate. Integrated circuit arrangements or integrated circuits (ICs) are usually mounted in packages in order to protect the delicate integrated circuit arrangements from environmental influences. It is, however, observable as an unfortunate side-effect that even the placement and mounting of the integrated circuit arrangement in a package can exert a significant mechanical stress on the semiconductor material and thereby on the semiconductor substrate of the integrated circuit arrangement. This relates in particular to low-cost package forms configured as mass-produced items such as, for example, for those package forms in which the integrated circuit arrangement is encapsulated by a potting compound. The potting compound then cures as the potting compound cools to the ambient temperature starting from a temperature of about 150° C.-185° C.
Since the semiconductor material of the integrated circuit arrangement and the synthetic potting material of the package that surrounds the integrated circuit arrangement have non-identical coefficients of thermal expansion, the synthetic material shrinks more markedly as it cools to the ambient temperature, for example room temperature, and exerts a largely non-reproducible mechanical stress on the semiconductor material of the integrated circuit arrangement. The synthetic material generally has a larger coefficient of thermal expansion than the semiconductor material of the integrated circuit arrangement; usually silicon, or also germanium, gallium arsenide (GaAs), InSb, InP and so on, can be used as semiconductor materials.
The mechanical stress in the semiconductor material of the semiconductor substrate, which has an effect on the integrated circuit arrangement, can therefore in general only be reproduced poorly, since the mechanical stress depends on the combination of the materials used for the semiconductor substrate and for the potting compound, and moreover on the processing parameters such as, for example, the curing temperature and the curing duration of the compound mass of the package of the integrated circuit arrangement.
As a result of various piezo effects in the semiconductor material such as, for example, the piezo-resistive effect, the piezo-MOS effect, the piezo-junction effect, the piezo-Hall effect and the piezo-tunnel effect, important electrical or electronic parameters of the integrated circuit arrangement are also affected by a mechanical stress acting on the integrated circuit arrangement. In the context of the further description, the changes to electrical or electronic parameters of the integrated circuit arrangement in the semiconductor material under the influence of a mechanical stress in the semiconductor material are referred to in general by the term “piezo effects”.
A mechanical stress in the semiconductor material has the effect that the properties of the charge carriers related to the charge carrier transport, such as, for example, the mobility, collision time, scattering factor, Hall constant and so forth change. Expressed in general terms, the piezo-resistive effect indicates how the specific ohmic resistance of the respective semiconductor material behaves under the influence of a mechanical stress. Amongst other effects, changes to the characteristic curves of diodes and bipolar transistors result from the piezo-junction effect. The piezo-Hall effect describes the dependency of the Hall constant of the semiconductor material on the mechanical stress state in the semiconductor material. The piezo-tunnel effect occurs at reverse-biased, highly doped, flat lateral p-n junctions. This current is dominated by band-to-band tunnel effects, and is also stress-dependent. The piezo-resistive effect, and the “piezo-MOS effect”, an expression sometimes found in the literature, can be classified as similar, since in the piezo-MOS effect, essentially just as in the piezo-resistive effect, the mobility of the charge carriers in the MOS channel of an MOS field effect transistor changes under the influence of the mechanical stress in the semiconductor material of the integrated circuit chip.
It therefore becomes clear that as a result of mechanical stresses in the semiconductor material of an integrated circuit arrangement, the electrical or electronic characteristics of the integrated circuit arrangement can be changed or impaired in an unpredictable manner. In many cases, a reduction in the performance (or parameters) of the integrated circuit arrangement, for example in the form of a degradation of the dynamic range, the resolution, the bandwidth, the current consumption or the accuracy and so forth can be observed.
In detail, the piezo-resistive effect referred to above indicates how the specific ohmic resistance of the respective semiconductor material behaves under the influence of a mechanical stress tensor and of the piezo-resistive coefficients. In integrated circuit arrangements (ICs), the respective current I, for example a control current, a reference current and so forth, is generated by circuit elements of the integrated circuit arrangement on the semiconductor chip. Essentially here, a defined voltage U is generated at an integrated resistor with the resistance value R, and the current I is coupled out. The current I can thus, in general, be generated at any resistive element, for example also at a MOS field effect transistor that is in the linear operating region. The voltage U can, for example, be generated using known bandgap principles in a way that is relatively constant with regard to mechanical stresses in the semiconductor material (apart from a comparatively small piezo-junction effect on the bandgap voltage that is generated). The resistance value R is, however, subject to the piezo-resistive effect. Because mechanical stresses in the semiconductor material caused by the package of the integrated circuit arrangement particularly act in a poorly controllable manner on the semiconductor circuit chip, the resistance value R for generating the current I, and therefore also the current I that is generated, changes in an unpredictable manner.
The piezo-Hall effect, on the other hand, now describes the dependence of the Hall constant on the mechanical stress state in the semiconductor material. Both the piezo-resistive effect and the piezo-Hall effect can be extremely disruptive in the operation of an integrated circuit arrangement, in particular a sensor arrangement such as, for example, an integrated Hall sensor, including the drive and evaluation electronics.
As a result of the piezo-Hall effect, which also occurs in the semiconductor material of the semiconductor chip of the integrated circuit arrangement as a result of mechanical stresses, then in the case of a Hall sensor arrangement, the current-dependent sensitivity Si,Hall of the Hall sensor changes. On top of this, as a result of the piezo-resistive effect, the Hall supply current through the Hall sensor changes when mechanical stresses are present in the semiconductor material of the Hall sensor arrangement, since the Hall supply current (control current) is, for example, only defined by a resistor RHall, also integrated, over which a voltage U is made to drop, possibly using a control loop. A change in the Hall supply current resulting from a resistance change δRHall due to the piezo-resistive effect therefore leads to a change in the sensitivity Si,Hall of the Hall sensor.
The magnetic sensitivity of the Hall sensor Si,Hall can (as indicated above) be defined as the ratio between the output voltage UHall of the Hall sensor to the magnetic field component B acting on it. A mechanical stress in the semiconductor material of the Hall sensor arrangement thereby affects the current-dependent magnetic sensitivity Si,Hall of a Hall sensor. In general, an attempt is made to keep the magnetic sensitivity Si,Hall of a Hall sensor as constant as possible, where influences resulting in particular from mechanical stresses are disturbing due to the piezo-resistive effects and piezo-Hall effects described above.
In terms of integrated Hall sensor circuit arrangements that generate a switching signal that depends on the magnetic field component B acting on them, it is to be noted that the magnetic switching threshold BS can always be traced back to the following formula:
BS˜RHall/Si,Hall.
In general it can therefore be the that the ratio of the current-dependent magnetic sensitivity Si,Hall to a resistance value RHall is determinative for the magnetic parameters such as, for example, the sensitivity or the switching thresholds of a Hall sensor arrangement.
Mechanical stresses in the semiconductor material of an integrated circuit arrangement can thus ultimately have a detrimental effect on the magnetic sensitivity or the switching thresholds of an overall system built on a Hall sensor arrangement. In practice, magnetic switching sensors can have switching thresholds prior to the packaging process (e.g. at the wafer stage) that differ by about 10% from those switching thresholds after being mounted in a package. The piezo effects referred to above are the cause of this. Thus, in particular after being mounted in a package, a curve of the “magnetic switching thresholds against temperature” in the form of a hysteresis loop, opening between 1% and 4%, can be found, and this is in particular to be observed if the IC package has absorbed a large amount of moisture before or during the packaging process, and the dwell time of the semiconductor circuit chip at temperatures above 100° C. is more than about 10 minutes (which is typically the diffusion time constant of small packages for integrated circuits). The piezo effects referred to above are again the cause of this.
It should be noted in relation to the piezo effects presented above, that the coefficients that define the mechanical stresses that occur in the semiconductor material are “tensors”, e.g. that the current-dependent magnetic sensitivity Si,Hall of a Hall element, and the resistance value R of a resistive element, are changed not only by the amplitude of the mechanical stress in the semiconductor material, but also by the direction of the stress in the semiconductor material. The directional dependency of the mechanical stress in the semiconductor material applies to the {100}-silicon material used most often for p-doped and n-doped resistors Rp, Rn. It should further be noted that for reasons of symmetry {100}-wafers and {001}-wafers correspond to one another in cubic crystals.
The way in which attempts have previously been made to reduce the disturbing piezo influences described above will now briefly be described below. In the case, for example, of {100}-silicon material, the dependency of integrated resistors on mechanical stresses can be reduced in that p-doped resistors are used instead of n-doped resistors wherever possible, since p-doped integrated resistors generally have smaller piezo-coefficients.
Two resistors of nominally equal size can, furthermore, be laid out close to and perpendicular to one another, and connected electrically in series or in parallel (known as an L-layout). As a result, the total resistance becomes as independent as possible of the direction of the mechanical stress in the semiconductor material, and is thereby as reproducible as possible. At the same time, the piezo-sensitivity of such an arrangement also becomes as small as possible for arbitrary directions of the mechanical stress.
In addition to this, an effort is being made to design the IC package in such a way that the mechanical stress on the semiconductor circuit chip is more effectively reproducible. It is either possible for this purpose to use more expensive ceramic packages, or for the mechanical parameters of the package components, e.g. the semiconductor circuit chip, the lead frame, the potting compound, adhesive material or soldering material to be matched to one another in such a way that the influences of the various package components compensate for one another as far as possible, or are at least as constant as possible in terms of the assembly batch and stress loading of the integrated circuit arrangement when in operation. It should, however, be clear that matching the mechanical parameters of the package components is extremely laborious, and furthermore that very small changes to the process flow again lead to a change of the influences of the various package components.
It is clear from the above explanations that hard-to-manage influence on the physical functional parameters of semiconductor components of integrated circuit arrangements on a semiconductor circuit chip resulting from mechanical stresses in the semiconductor material can be caused by various piezo effects. Compensating for the influence of the piezo effects on the physical and electronic functional parameters of the semiconductor components is here problematic in that the stress components that occur in the semiconductor material are generally not known in advance, nor do they remain constant during the service life, so that, in order to be able to appropriately control the piezo-influences referred to above on the semiconductor material and thereby on the electronic and physical functional parameters of the semiconductor components, the mechanical parameters when housing the integrated circuit arrangement in a package, e.g. for example the material of the semiconductor chip, the lead frame, the potting compound, the adhesive or the solder material can only be matched to one another with great difficulty if at all.
Devices and methods described herein may provide improved concepts for the compensation of piezo-influences on integrated circuit arrangements.
A semiconductor circuit arrangement is proposed according to one aspect. The semiconductor circuit arrangement comprises a semiconductor substrate. A Hall sensor circuit is integrated into the semiconductor substrate. The Hall sensor circuit comprises a first terminal and a second terminal positioned opposite the first terminal. The Hall sensor circuit further comprises a third terminal and a fourth terminal positioned opposite the third terminal. The Hall sensor circuit is configured to guide a Hall supply current between the first terminal and the opposite, second terminal at a first angle to a normal to a primary flat plane of the semiconductor substrate, laterally through a Hall effect region during a first clock phase. A first electrical voltage signal is thereby generated in the Hall effect region. Both the Hall supply current and the first electrical voltage signal have a first dependency on a mechanical stress of the semiconductor substrate. The Hall sensor circuit is also configured to guide a Hall supply current between the third terminal and the opposite, fourth terminal at a second angle that is orthogonal to the first angle, laterally through the Hall effect region during a second clock phase. A second electrical voltage signal is thereby generated in the Hall effect region. Both the Hall supply current and the second electrical voltage signal have a second dependency on a mechanical stress of the semiconductor substrate. According to the subject matter described herein, the semiconductor circuit arrangement is furthermore configured to ascertain a specific mechanical stress component (for example a shear stress and/or a normal stress). The ascertainment of the mechanical stress components takes place based on a combination of the first electrical voltage signal and of the second electrical voltage signal.
According to a further aspect, a method for ascertaining a mechanical stress component using a semiconductor circuit arrangement with a semiconductor substrate and a Hall sensor circuit integrated therein is proposed, wherein the Hall sensor circuit comprises a first terminal and a second terminal positioned opposite the first terminal, as well as a third terminal and a fourth terminal positioned opposite the third terminal. The method comprises a step in which, during a first clock phase, a Hall supply current is applied, this being done between the first terminal and the opposite, second terminal in order to guide the Hall supply current at a first angle to a normal to a primary flat plane of the semiconductor substrate, laterally through a Hall effect region of the Hall sensor circuit, wherein the Hall supply current generates a first electrical voltage signal in the Hall effect region, wherein the first electrical voltage signal has a first dependency on a mechanical stress of the semiconductor substrate. The method further comprises a further step in which, during a second clock phase, a Hall supply current is applied between the third terminal and the opposite, fourth terminal in order to guide the Hall supply current at a second angle that is orthogonal to the first angle, laterally through the Hall effect region of the Hall sensor circuit, wherein the Hall supply current generates a second electrical voltage signal in the Hall effect region, and wherein the second electrical voltage signal has a second dependency on a mechanical stress of the semiconductor substrate. The method further comprises a step in which a specific mechanical stress component is ascertained, this being done based on a combination of the first electrical voltage signal and of the second electrical voltage signal.
Some example implementations are illustrated, by way of example, in the drawing and are explained below. Here:
Example implementations are described with reference to the figures in more detail below, wherein elements with the same or similar functions are given the same reference signs.
Method steps that are illustrated in one block diagram and explained in that context can also be carried out in a sequence other than that illustrated or described. In addition, method steps that relate to a specific feature of a device can be exchanged with this very feature of the device, and the opposite is equally true.
Integrated Hall sensor circuits are treated below. This can in particular involve lateral Hall plates. The term “lateral” is to be understood here in the sense of “parallel to the chip surface”. The lateral Hall plates can also be referred to as horizontal Hall plates or planar Hall plates.
A semiconductor substrate with an integrated Hall sensor circuit is described in example implementations. This integrated Hall sensor circuit can comprise a first terminal and a second terminal positioned opposite the first terminal, as well as additionally a third terminal and a fourth terminal positioned opposite the third terminal. In some example implementations, the integrated Hall sensor circuit can comprise precisely or exclusively these four terminals just mentioned. In further example implementations, in precisely four spinning phases, all the stresses for calculation of the stress components sxx+syy, sxx−syy and sxy and a Hall voltage are ascertained, and each individual component obtained by forming the sum and/or difference of at least two spinning phases.
In order to simplify the understanding of the following detailed description of a semiconductor circuit arrangement for compensating various piezo effects, the definitions used below relating to the semiconductor material used and the specified directions on the same crystal alignment of the semiconductor material are now first illustrated based on
To manufacture integrated circuits, the semiconductor wafers such as, for example, silicon wafers or silicon disks, are sawn off a monocrystalline bar in such a way that the wafer surface is associated with one crystallographic plane. What are known as the “Miller indices” are used in order to specify the respective plane in a cubic crystal.
In
An angle Φ with respect to the [110] direction is also defined, wherein the angle Φ is counted counterclockwise in a plan view on the top face of the wafer, starting from the [110] direction. The individual chips are usually positioned on the wafer in such a way that the directions Φ=0° and Φ=90° correspond to the vertical and horizontal directions respectively of the IC, wherein these directions can be interchanged, depending on whether the IC is positioned upright or lying down. In what follows, furthermore, the direction Φ=90° is referred to as the x-axis [
On the assumption that the x-axis is identical to the crystal direction [
Since a {100} silicon material is used in the majority of applications for integrated semiconductor circuit arrangements, the following explanations refer, for the sake of simplifying the explanations, and due to their particular practical significance, above all to the numerical values for {100} silicon material that are relevant for this material. It should, however, be obvious to the person skilled in the art that other semiconductor materials, or other silicon materials, can accordingly also be used.
This mechanical stress is a tensor magnitude, and refers to the force per unit area that acts within a rigid body under the influence of a mechanical load. This force can be represented by cutting the rigid body. This force must theoretically be applied to the cut planes for the body to receive the same load.
The normal stress can be a compressive stress or a tensile stress, depending on the arithmetic sign. Normal stresses act perpendicularly to the coordinate surface, meaning that the normal direction and the direction of action are the same. The shear stress acts tangentially to the surface, and represents a shear loading.
There are altogether nine components, there being three cut surfaces, each of which has a normal stress component and two shear stress components. The forces at the opposite regions (e.g. the negative planes with normal vectors in the negative x, y and z directions) are of the same magnitude, but have negative arithmetic signs. If the forces, or the moment equilibria, are applied to the block illustrated in
Usually not all six stress components have to be considered at the same time, since in the case of microelectronic packages what are known as laminates are usually used, whose lateral extension in the x, y directions is significantly larger than its thickness in the z direction (see also
A semiconductor circuit arrangement 20 for the compensation of a mechanical stress of a Hall sensor circuit integrated into a semiconductor substrate will now be described in the following with reference to
δR[
results by way of example for n-diffusion resistors from mechanical stress.
This means that in the case of a current direction in the [
The Hall sensor circuit 21 is configured to guide the Hall supply current between a third terminal 25 and a fourth terminal 26 of the Hall effect region 24 at a 0° angle to the normal to the primary flat plane of the semiconductor substrate laterally through the Hall effect region 24 (thus for example in the [110] direction) during a second clock interval PH2. During the second clock interval PH2 a second Hall voltage Vph2 is, for example, measured at the first terminal 22 of the Hall effect region 24, and digitized by the ADC 27. For the [110] direction shown here by way of example as the second current direction, a stress-direction-dependent change in resistance of
δR[110]=−17.6 δxx−31.2 δyy+53.4 δzz
results by way of example for n-diffusion resistors from mechanical stress.
The current directions of the two clock phases PH1 and PH2 can, of course, also be interchanged. With the semiconductor circuit arrangement 20 the directional dependency of piezo-resistive effects can be eliminated in that current flows through the Hall effect region 24 during the first clock interval PH1 at an angle of 90° (or an angle of 0°) to the normal to the primary flat plane and flows in a direction orthogonal to that during the second clock interval PH2, and wherein a time average of the two clock intervals can be made. As a result of the two averaged clock intervals, the Hall effect region 24 behaves like two laterally orthogonal resistors in what is known as the L layout (see
As just explained, with the semiconductor circuit arrangement 20 illustrated here, the directional dependency of piezo-resistive effects can be eliminated in that current flows through the Hall effect region 24 during the first clock interval PH1 at an angle of 90° (or an angle of 0°) to the normal to the primary flat plane and flows in a direction orthogonal to that during the second clock interval PH2, wherein a time average of the two clock intervals can be made.
It is recognized in accordance with the concept described here, that the stress components ascertained using the Hall sensor circuit can not only be used to compensate for negative effects on the Hall sensor circuit caused by stress, but also to compensate for negative effects on other components and/or circuits, e.g. that are separate from the Hall sensor circuit, caused by stress, in particular in the case in which these separate components and/or circuits are integrated onto the same semiconductor substrate as the Hall sensor circuit.
An enlarged illustration of the Hall sensor circuit 101 in the two clock phases PH1 and PH2 is shown to the top left of the image in
We refer now to the two illustrated Hall sensor circuits 101 that are drawn in
It can additionally be seen that in a first clock phase PH1, the Hall supply current 102 is guided between the first terminal 111 and the second terminal 112 positioned (here diagonally) opposite the Hall effect region at a 45° angle to a normal to the primary flat plane, drawn above to the right, of the semiconductor substrate, laterally through the Hall effect region. As can also be seen from the diagram shown in
The resistor arranged on the left to the outside in the Hall effect region, e.g. the resistor that extends in the [110] direction, exhibits a resistance change of:
δR[110]=−17.6 σxx−31.2 σyy+53.4 σzz
The resistor arranged at the bottom in the Hall effect region, e.g. the resistor that extends in the [
δR[
The resistor arranged diagonally in the Hall effect region, e.g. the resistor that extends in the [010] direction, exhibits a resistance change of:
δR[010]=−24.4 σxx24.4 σyy+155.6 σxy+53.4 σzz
It can thus be seen that the diagonal resistor, e.g. the resistor extending in the [010] direction has the respective mean value of the normal stress components σxx, σyy and σzz of the left-hand resistor and of the bottom resistor, plus an additional shear stress component σxy in the diagonal direction, e.g. in the [010] direction.
The same applies to the second clock phase PH2, wherein here the arithmetic sign of the additional shear stress component σxy is reversed in the diagonal direction. From this it follows that the diagonal resistance here is rotated in comparison with the first clock phase PH1 through 90°, so that the Hall supply current runs in the opposite direction, e.g. in the [100] direction.
For the first clock phase PH1, during which the Hall supply current flows in the [010] direction (which is specified here by definition as +45°) the following effective sum thus results for the total resistance change:
RnHall+45°˜1−24.4%/GPa×(σxx+σyy)+k×155%/GPa×(σxy)+53%/GPa×(σzz)
or, for the second clock phase PH2, with a negative arithmetic sign:
RnHall−45°˜1−24.4%/GPa×(σxx+σyy)−k×155%/GPa×(σxy)+53%/GPa×(σzz)
The factor k is a weighting factor resulting from the proportional contributions of resistance components that are vertical and horizontal to the diagonal in the Hall plate model.
This Hall sensor circuit 101 is also illustrated again in
In
The flow of the Hall supply current 102 generates an electrical voltage in the Hall effect region of the integrated Hall sensor circuit 101. This electrical voltage can be accessed in the form of an electrical voltage signal at, for example, two of the total of four terminals 111, 112, 113, 114. An electrical voltage signal in the form of a Hall output voltage VHallout can, for example, be accessed at the two terminals at which the Hall supply current 102 is not fed in. On the other hand, an electrical voltage signal in the form of a Hall bias voltage VHallbias can be accessed at the terminals at which the Hall supply current 102 is fed in.
A first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) can accordingly be accessed in the first clock phase PH1, and a second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) can accordingly be accessed in the second clock phase PH2. The first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate, and the second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a different, second dependency on a mechanical stress of the semiconductor substrate.
Expressed more generally, the Hall sensor circuit 101 according to the subject matter described herein, is configured in order, during a first clock phase PHspin1 to guide a Hall supply current 102 between the first terminal 111 and the opposite, second terminal 112 at a first angle Φ1 ( to a normal to a primary flat plane of the semiconductor substrate, laterally through a Hall effect region, and to generate a first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) in the Hall effect region, wherein the first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate. In the case of
The Hall sensor circuit 101 is furthermore configured to guide a Hall supply current 102 between the third terminal 113 and the opposite, fourth terminal 114 at a second angle Φ2 that is orthogonal to the first angle Φ1, laterally through the Hall effect region during a second clock phase PHspin2, and to generate a second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) in the Hall effect region, wherein the second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a second dependency on a mechanical stress of the semiconductor substrate. In the case of
According to the concept described herein the semiconductor circuit arrangement 100 is furthermore configured to ascertain a specific mechanical stress component, for example a normal stress component and/or a shear stress component, and to do so based on a combination of the first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) and of the second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2).
This will be explained below in more detail with reference to the
The first electrical voltage signal VHallout(PHspin1) accessed during the first clock phase PH1 depends on the magnetic field component Bz as well as on what is known as the aggregate mechanical stress, e.g. on the sum of the normal stress components in the x and y directions (σxx+σyy), and on what is known as the difference mechanical stress, e.g. on the difference between the normal stress components in the x and y directions (σxx−σyy). The first electrical voltage signal VHallout(PHspin1) is, however, independent of a shear stress component. The dependency on the normal stress component in the z direction σzz is also negligible. The difference stress (σxx−σyy) here has a negative arithmetic sign during the first clock phase PH1, which means:
VHallout(PHspin1)=f(Bz, (σxx+σyy), −(σxx−σyy)).
The first voltage signal VHallout(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallout(PHspin2) accessed during the second clock phase PH2 also depends on the magnetic field component Bz as well as on the aggregate mechanical stress, e.g. on the sum of the normal stress components in the x and y directions (σxx+σyy), and on the difference mechanical stress, e.g. on the difference between the normal stress components in the x and y directions (σxx−σyy). The second electrical voltage signal VHallout(PHspin2) is also independent of a shear stress component, while the dependency on the normal stress component in the z direction σzz is also negligible. The mechanical difference stress (σxx−σyy) here however has a positive arithmetic sign during the second clock phase PH2, meaning that:
VHallout(PHspin2)=f(Bz, (σxx+σyy), +(σxx−σyy)).
The second voltage signal VHallout(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate.
According to the example implementation shown here in
VHallout(PHspin1)−VHallout(PHspin2)=+2×f(σxx−σyy).
It can be seen that both the normal stress component σxy and the dependency on the magnetic field component Bz cancel each other out here. What remains is the dependency on the difference mechanical stress σxx−σyy explained previously. A mechanical normal stress component, namely the difference mechanical stress σxx−σyy, can thus be ascertained in this form of implementation using forming the difference.
This also applies to the alternative shown in
The first electrical voltage signal VHallbias(PHspin1) accessed during the first clock phase PH1 depends on the magnetic field component Bz as well as on the aggregate mechanical stress, e.g. on the sum of the normal stress components in the x and y directions (σxx+σyy), and on the difference mechanical stress, e.g. on the difference between the normal stress components in the x and y directions (σxx−σyy). There is, however, no dependency on a shear stress component. The dependency on a normal stress component in the z direction σzz is also negligible. The difference stress (σxx−σyy) here has a positive arithmetic sign during the first clock phase PH1, which means:
VHallbias(PHspin1)=f(Bz, (σxx+σyy), +(σxx−σyy)).
The first voltage signal VHallbias(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallbias(PHspin2) accessed during the second clock phase PH2 also depends on the magnetic field component Bz as well as on the aggregate mechanical stress σxx+σyy and on the difference mechanical stress σxx−σyy. The mechanical difference stress σxx−σyy here however has a negative arithmetic sign during the second clock phase PH2, meaning that:
VHallbias(PHspin2)=f(Bz, (σxx+σyy), −(σxx−σyy)).
The second voltage signal VHallbias(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate. The normal stress component in the z direction σzz is, also here in this arrangement, again negligible both in the first clock phase PH1 as well as in the second clock phase PH2.
According to the example implementation shown here in
VHallbias(PHspin1)−VHallbias(PHspin2)=+2×f(σxx−σyy).
Here again, both the normal stress component σxy and the dependency on the magnetic field component Bz cancel each other out. What remains is the dependency on the difference mechanical stress σxx−σyy explained previously. A mechanical normal stress component, namely the difference mechanical stress σxx−σyy, can thus be ascertained in this variant implementation, alternative to
It has been recognized that the mechanical stress components ascertained using the Hall sensor circuit 101 can be used to compensate for a negative influence of the respective mechanical stress component on the parametric accuracy and/or parametric stability of a component that is arranged on the semiconductor substrate but is separate from the Hall sensor circuit 101 or of a further circuit arrangement integrated into the semiconductor substrate. This means that although the mechanical stress of the semiconductor substrate is measured using the Hall sensor circuit 101, the stress components ascertained can be used for the compensation of other components.
In the example implementations described with reference to
As is shown in
Two further forms of implementation of integrated Hall sensor circuits 101 are shown in
In
The flow of the Hall supply current 102 here again also generates an electrical voltage in the Hall effect region of the integrated Hall sensor circuit 101. This electrical voltage can be accessed in the form of an electrical voltage signal at, for example, two of the total of four terminals 111, 112, 113, 114. An electrical voltage signal in the form of a Hall output voltage VHallout can, for example, be accessed at the two terminals at which the Hall supply current 102 is not fed in. On the other hand, an electrical voltage signal in the form of a Hall bias voltage VHallbias can be accessed at the terminals at which the Hall supply current 102 is fed in.
A first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) can accordingly be accessed in the first clock phase PH1, and a second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) can accordingly be accessed in the second clock phase PH2. The first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate, and the second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a different, second dependency on a mechanical stress of the semiconductor substrate.
Expressed more generally, the Hall sensor circuit 101 according to the subject matter described herein, is configured to guide a Hall supply current 102 between the first terminal 111 and the opposite, second terminal 112 at a first angle Φ1 to a normal to a primary flat plane of the semiconductor substrate, laterally through a Hall effect region during a first clock phase PHspin1, and to generate a first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) in the Hall effect region, wherein the first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate. In the case of
The Hall sensor circuit 101 is furthermore configured to guide a Hall supply current 102 between the third terminal 113 and the opposite, fourth terminal 114 at a second angle Φ2 that is orthogonal to the first angle Φ1, laterally through the Hall effect region during a second clock phase PHspin2, and to generate a second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) in the Hall effect region, wherein the second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a second dependency on a mechanical stress of the semiconductor substrate. In the case of
According to the example implementation illustrated in
In
The first electrical voltage signal VHallbias(PHspin1) accessed during the first clock phase PH1 depends neither on the magnetic field component Bz nor on the difference stress (σxx−σyy). It does, however, depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components in the x and y directions (σxx+σyy) and on a normal mechanical stress component in the z direction, e.g. on the normal stress σzz as well as on a mechanical shear stress σxy. The mechanical shear stress component σxy here has a positive arithmetic sign during the first clock phase PH1, which means:
VHallbias(PHspin1)=f((σxx+σyy), +σxy, σzz).
The first voltage signal VHallbias(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallbias(PHspin2) accessed during the second clock phase PH2 again depends neither on the magnetic field component Bz nor on the difference stress (σxx−σyy). It does, however, once again depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components in the x and y directions (σxx+σyy) and on a normal mechanical stress component in the z direction, e.g. on the normal stress σzz as well as on a mechanical shear stress σxy. The mechanical shear stress component σxy here however has a negative arithmetic sign during the second clock phase PH2, which means:
VHallbias(PHspin2)=f((σxx+σyy), −σxy, σzz).
The second voltage signal VHallbias(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate.
According to the example implementation shown here in
VHallbias(PHspin1)−VHallbias(PHspin2)=+2×f(σxy).
It can be seen that both the normal stress component in the z direction σzz as well as the dependency on the magnetic field component Bz and the aggregate mechanical stress (σxx+σyy) cancel each other out. What remains is the dependency on the mechanical shear stress component σxy explained previously. A mechanical shear stress component σxy can thus be ascertained in this form of implementation using forming the difference.
This also applies to the alternative shown in
The first electrical voltage signal VHallout(PHspin1) accessed during the first clock phase PH1 depends neither on the magnetic field component Bz nor on the difference stress σxx−σyy. It does, however, depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components σxx+σyy and on a normal mechanical stress component in the z direction, e.g. on the normal stress σzz as well as on a mechanical shear stress σxy. The mechanical shear stress component σxy here has a positive arithmetic sign during the first clock phase PH1, which means:
VHallout(PHspin1)=f((σxx+σyy), +σxy, σzz).
The first voltage signal VHallout(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallout(PHspin2) accessed during the second clock phase PH2 again depends neither on the magnetic field component Bz nor on the difference stress σxx−σyy. It does, however, again also depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components σxx+σyy and on a normal mechanical stress component in the z direction, e.g. on the normal stress σzz as well as on a mechanical shear stress σxy. The mechanical shear stress component σxy here however has a negative arithmetic sign during the second clock phase PH2, which means:
VHallout(PHspin2)=f((σxx+σyy), −σxy, σzz).
The second voltage signal VHallout(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate.
According to the example implementation shown here in
VHallout(PHspin1)−VHallout(PHspin2)=+2×f(σxy).
Here again, both the normal stress component in the z direction σzz as well as the dependency on the magnetic field component Bz and the aggregate mechanical stress (σxx+σyy) cancel each other out. What remains is the dependency on the mechanical shear stress component σxy explained previously. In this variant implementation, which is alternative to that of
It has been recognized that the mechanical stress components ascertained using the Hall sensor circuit 101 can be used to compensate for a negative influence of the respective mechanical stress component on the parametric accuracy and/or parametric stability of a component that is arranged on the semiconductor substrate but is separate from the Hall sensor circuit 101 or of a further circuit arrangement integrated into the semiconductor substrate. This means that although the mechanical stress of the semiconductor substrate is measured using the Hall sensor circuit 101, the stress component ascertained (here: shear stress σxy) can be used for the compensation of other components.
In the example implementations described with reference to
As is shown in
Two further forms of implementation of integrated Hall sensor circuits 101 are shown in
In
The flow of the Hall supply current 102 here again also generates an electrical voltage in the Hall effect region of the integrated Hall sensor circuit 101. This electrical voltage can be accessed in the form of an electrical voltage signal at, for example, two of the total of four terminals 111, 112, 113, 114. An electrical voltage signal in the form of a Hall output voltage VHallout can, for example, be accessed at the two terminals at which the Hall supply current 102 is not fed in. On the other hand, an electrical voltage signal in the form of a Hall bias voltage VHallbias can be accessed at the terminals at which the Hall supply current 102 is fed in.
A first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) can accordingly be accessed in the first clock phase PH1, and a second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) can accordingly be accessed in the second clock phase PH2. The first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate, and the second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a different, second dependency on a mechanical stress of the semiconductor substrate.
Expressed more generally, the Hall sensor circuit 101 according to the subject matter described herein, is configured to guide a Hall supply current 102 between the first terminal 111 and the opposite, second terminal 112 at a first angle Φ1 to a normal to a primary flat plane of the semiconductor substrate, laterally through a Hall effect region during a first clock phase PHspin1, and to generate a first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) in the Hall effect region, wherein the first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate. In the case of
The Hall sensor circuit 101 is furthermore configured to guide a Hall supply current 102 between the third terminal 113 and the opposite, fourth terminal 114 at a second angle Φ2 that is orthogonal to the first angle Φ1, laterally through the Hall effect region during a second clock phase PHspin2, and to generate a second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) in the Hall effect region, wherein the second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a second dependency on a mechanical stress of the semiconductor substrate. In the case of
According to the example implementation illustrated in
In
The first electrical voltage signal VHallbias(PHspin1) accessed during the first clock phase PH1 depends neither on the magnetic field component Bz nor on the difference stress (σxx−σyy). It does, however, depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components in the x and y directions (σxx+σyy) and on a normal mechanical stress component in the z direction, e.g. on the normal stress σzz as well as on a mechanical shear stress σxy. The mechanical shear stress component σxy here has a positive arithmetic sign during the first clock phase PH1, which means:
VHallbias(PHspin1)=f((σxx+σyy), +σxy, σzz).
The first voltage signal VHallbias(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallbias(PHspin2) accessed during the second clock phase PH2 again depends neither on the magnetic field component Bz nor on the difference stress (σxx−σyy). It does, however, once again depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components in the x and y directions (σxx+σyy) and on a normal mechanical stress component in the z direction, e.g. on the normal stress σzz as well as on a mechanical shear stress σxy. The mechanical shear stress component σxy here however has a negative arithmetic sign during the second clock phase PH2, which means:
VHallbias(PHspin2)=f((σxx+σyy), −σxy, σzz).
The second voltage signal VHallbias(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate.
According to the example implementation shown here in
(VHallbias(PHspin1)+VHallbias(PHspin2))/2=f(σxx+σyy).
It can be seen that both the normal stress component in the z direction σzz as well as the dependency on the magnetic field component Bz and on the difference mechanical stress (σxx−σyy) cancel each other out. The dependency on the previously explained aggregate mechanical stress, e.g. the sum of the normal stress components in the x and y directions (σxx+σyy) remains. A mechanical normal stress component (σxx+σyy) can thus be ascertained in this form of implementation using forming the sum or average.
This also applies to the alternative shown in
The first electrical voltage signal VHallbias(PHspin1) accessed during the first clock phase PH1 depends neither on the magnetic field component Bz nor on the mechanical shear stress component σxy. It does, however, depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components in the x and y directions (σxx+σyy), on the difference mechanical stress, e.g. on a difference between the normal stress components in the x and y directions (σxx−σyy), as well as on a mechanical normal stress component in the z direction, e.g. on the normal stress σzz. The difference mechanical stress (σxx−σyy) here has a positive arithmetic sign during the first clock phase PH1, which means:
VHallbias(PHspin1)=f((σxx+σyy), +(σxx−σyy), σzz).
The first voltage signal VHallbias(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallbias(PHspin2) accessed during the second clock phase PH2 likewise depends neither on the magnetic field component Bz nor on the mechanical shear stress component σxy. It does, however, depend on the aggregate mechanical stress, e.g. on a sum of the normal stress components in the x and y directions (σxx+σyy), on the difference mechanical stress, e.g. on a difference between the normal stress components in the x and y directions (σxx−σyy), as well as on a mechanical normal stress component in the z direction, e.g. on the normal stress σzz. The difference mechanical stress (σxx−σyy) here however has a negative arithmetic sign during the second clock phase PH2, which means:
VHallbias(PHspin2)=f((σxx+σyy), −(σxx−σyy), σzz).
The second voltage signal VHallbias(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate.
According to the example implementation shown here in
(VHallbias(PHspin1)+VHallbias(PHspin2))/2=f(σxx+σyy).
Here again, both the normal stress component in the z direction σzz as well as the dependency on the magnetic field component Bz and on the difference mechanical stress (σxx−σyy) cancel each other out. The dependency on the previously explained aggregate mechanical stress, e.g. the sum of the normal stress components in the x and y directions (σxx+σyy) remains. A mechanical normal stress component (σxx+σyy) can thus be ascertained in this form of implementation using forming the sum or average.
It has been recognized that the mechanical stress component ascertained using the Hall sensor circuit 101 can be used to compensate for a negative influence of the respective mechanical stress component on the parametric accuracy and/or parametric stability of a component that is arranged on the semiconductor substrate but is separate from the Hall sensor circuit 101 or of a further circuit arrangement integrated into the semiconductor substrate. This means that although the mechanical stress of the semiconductor substrate is measured using the Hall sensor circuit 101, the stress component ascertained (here: aggregate stress (σxx+σyy))can be used for the compensation of other components.
In the example implementations described with reference to
As is shown in
Two further forms of implementation of integrated Hall sensor circuits 101 are shown in
In
The flow of the Hall supply current 102 here again also generates an electrical voltage in the Hall effect region of the integrated Hall sensor circuit 101. This electrical voltage can be accessed in the form of an electrical voltage signal at, for example, two of the total of four terminals 111, 112, 113, 114. An electrical voltage signal in the form of a Hall output voltage VHallout can, for example, be accessed at the two terminals at which the Hall supply current 102 is not fed in. On the other hand, an electrical voltage signal in the form of a Hall bias voltage VHallbias can be accessed at the terminals at which the Hall supply current 102 is fed in.
A first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) can accordingly be accessed in the first clock phase PH1, and a second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) can accordingly be accessed in the second clock phase PH2. The first voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate, and the second voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a different, second dependency on a mechanical stress of the semiconductor substrate.
Expressed more generally, the Hall sensor circuit 101 according to the subject matter described herein, is configured to guide a Hall supply current 102 between the first terminal 111 and the opposite, second terminal 112 at a first angle Φ1 to a normal to a primary flat plane of the semiconductor substrate, laterally through a Hall effect region during a first clock phase PHspin1, and to generate a first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) in the Hall effect region, wherein the first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate. In the case of
The Hall sensor circuit 101 is furthermore configured to guide a Hall supply current 102 between the third terminal 113 and the opposite, fourth terminal 114 at a second angle Φ2 that is orthogonal to the first angle Φ1, laterally through the Hall effect region during a second clock phase PHspin2, and to generate a second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) in the Hall effect region, wherein the second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a second dependency on a mechanical stress of the semiconductor substrate. In the case of
According to the example implementation illustrated in
In
The first electrical voltage signal VHallout(PHspin1) accessed during the first clock phase PH1 depends on the magnetic field component Bz as well as on what is known as the aggregate mechanical stress, e.g. on the sum of the normal stress components in the x and y directions (σxx+σyy), and on what is known as the difference mechanical stress, e.g. on the difference between the normal stress components in the x and y directions (σxx−σyy). The first electrical voltage signal VHallout(PHspin1) is, however, independent of a shear stress component. The dependency on the normal stress component in the z direction σzz is also negligible. The difference stress (σxx−σyy) here has a negative arithmetic sign during the first clock phase PH1, which means:
VHallout(PHspin1)=f(Bz, (σxx+σyy), −(σxx−σyy)).
The first voltage signal VHallout(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallout(PHspin2) accessed during the second clock phase PH2 likewise depends on the magnetic field component Bz as well as on the aggregate mechanical stress, e.g. on the sum of the normal stress components in the x and y directions (σxx+σyy), and on the difference mechanical stress, e.g. on the difference between the normal stress components in the x and y directions (σxx−σyy). The second electrical voltage signal VHallout(PHspin2) is also independent of a shear stress component, while the dependency on the normal stress component in the z direction σzz is also negligible. The mechanical difference stress (σxx−σyy) here however has a positive arithmetic sign during the second clock phase PH2, meaning that:
VHallout(PHspin2)=f(Bz,(σxx+σyy), +(σxx−σyy)).
The second voltage signal VHallout(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate.
According to the example implementation shown here in
(VHallout(PHspin1)+VHallout(PHspin2))/2=f(Bz, (σxx+σyy).
It can be seen that the difference stress (σxx−σyy) is canceled out. What remains is the dependency on the aggregate mechanical stress (σxx+σyy)) explained previously and on the magnetic field component Bz. A mechanical normal stress component, namely the aggregate mechanical stress (σxx+σyy)), can thus be ascertained in this form of implementation using forming the sum or average.
Using the variant shown in
The first electrical voltage signal VHallout(PHspin1) accessed in the first clock phase PH1 depends on the magnetic field component Bz, on the aggregate stress, e.g. on a sum of the normal stress components (σxx+σyy), and on a shear stress component σxy. It is, however, independent of the difference mechanical stress, e.g. on a difference of the normal stress components (σxx−σyy) and of a normal mechanical stress component in the z direction, e.g. of the normal stress σzz. The mechanical shear stress component σxy here has a negative arithmetic sign during the first clock phase PH1, which means:
VHallout(PHspin1)=f(Bz,(σxx+σyy), −σxy).
The first voltage signal VHallout(PHspin1) thus accordingly has a first dependency on a mechanical stress of the semiconductor substrate.
The second electrical voltage signal VHallout(PHspin2) accessed in the second clock phase PH2 likewise depends on the magnetic field component Bz, on the aggregate stress, e.g. on a sum of the normal stress components (σxx+σyy), and on a shear stress component σxy. It is, however, independent of the difference mechanical stress, e.g. on a difference of the normal stress components (σxx−σyy) and of a normal mechanical stress component in the z direction, e.g. of the normal stress σzz. The mechanical shear stress component σxy here however has a positive arithmetic sign during the first clock phase PH1, which means:
VHallout(PHspin1)=f(Bz, (σxx+σyy), +σxy).
The second voltage signal VHallout(PHspin2) thus accordingly has a second dependency on a mechanical stress of the semiconductor substrate.
According to the example implementation shown here in
VHallout(PHspin1)−VHallout(PHspin2)=f(Bz, σxy).
The difference stress (σxx−σyy) here again cancels out. What remains is the dependency on the mechanical shear stress component σxy explained previously and on the magnetic field component Bz. A mechanical shear stress component σxy can thus be ascertained in this form of implementation using forming the sum or average.
As is shown in
In block 901 a Hall supply current 102 is applied during a first clock phase PHspin1, this being done between the first terminal 111 and the opposite, second terminal 112 in order to guide the Hall supply current 102 at a first angle Φ1 (e.g. Φ1=+45° or Φ1=0°) to a normal to a primary flat plane of the semiconductor substrate, laterally through a Hall effect region of the Hall sensor circuit 101, wherein the Hall supply current 102 generates a first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) in the Hall effect region, wherein the first electrical voltage signal VHallout(PHspin1) or VHallbias(PHspin1) has a first dependency on a mechanical stress of the semiconductor substrate.
In block 902 a Hall supply current 102 is applied during a second clock phase PHspin2, this being done between the third terminal 113 and the opposite, fourth terminal 114 in order to guide the Hall supply current 102 at a second angle Φ2 (e.g. Φ2=−45° or Φ2=90°) that is orthogonal to the first angle Φ1 (e.g. Φ1=+45° or Φ1=0°, laterally through the Hall effect region of the Hall sensor circuit 101, wherein the Hall supply current 102 generates a second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) in the Hall effect region, wherein the second electrical voltage signal VHallout(PHspin2) or VHallbias(PHspin2) has a second dependency on a mechanical stress of the semiconductor substrate.
In block 903 a specific mechanical stress component is ascertained, this being done based on a combination of the first electrical voltage signal (VHallout(PHspin1) or VHallbias(PHspin1)) and of the second electrical voltage signal (VHallout(PHspin2) or VHallbias(PHspin2)).
According to the subject matter described herein, the lateral Hall plate 101 or the integrated Hall sensor circuit 101 can thus be employed both for the measurement of a magnetic field as well as for the measurement of stress. The results of the stress measurement can be used for the compensation of parametric inaccuracies of other components or circuits.
Angle sensors based on the Hall effect can, for example, have an orthogonality error resulting from shear stress, which can be compensated for by compensating the shear stress. Additional on-chip oscillators can have frequency deviations or frequency inaccuracies that can be traced back to difference mechanical stresses of in-plane stress components, e.g. to a difference between mechanical normal stress components in the x and y directions. A magnetic 3D sensor can have measurement inaccuracies that can be traced back to aggregate mechanical stresses of in-plane stress components, e.g. to a sum of mechanical normal stress components in the x and y directions.
The concept described herein can be summarized as follows:
The concept described herein can be used in particular for the purposes of a system calibration.
The example implementations described above only represent an exemplification of the principles of the subject matter described herein. It is obvious that modifications and variations of the arrangements and details described herein will be clear to other specialists. It is therefore intended that the concept described herein will only be restricted by the scope of protection of the following patent claims, and not by the specific details that have been presented here with reference to the description and the explanation of the example implementations.
Although some aspects have been described in connection with a device, it is clear that these aspects also represent a description of the corresponding method, so that a block or a component of a device is also to be understood as a corresponding method step or as a feature of a method step. Aspects that have been described in connection with a method step or as such a step analogously also represent a description of a corresponding block or detail or feature of a corresponding device.
Some or all of the method steps can be carried out by a hardware apparatus (or making use of a hardware apparatus), such as for example a microprocessor, a programmable computer, or an electronic circuit. In some example implementations, some or a plurality of the most important method steps can be carried out by such an apparatus.
Depending on specific implementations, example implementations can be implemented in hardware or in software or at least partially in hardware or at least partially in software. The implementation can be carried out making use of a digital storage medium, for example a floppy disk, a DVD, a Blu-ray disk, a CD, a ROM, a PROM, an EPROM, an EEPROM or a FLASH memory, a hard disk or another magnetic or optical store on which electronically readable control signals are stored that can or do interact together with a programmable computer system in such a way that the respective method is carried out. The digital storage medium can therefore be computer-readable.
Some example implementations thus comprise a data carrier that comprises electronically readable control signals that are capable of interacting with a programmable computer system in such a way that one of the methods described herein is carried out.
Example implementations can in general be implemented as a computer program product with program code, wherein the program code is effective in carrying out one of the methods when the computer program product is executed on a computer.
The program code can for example also be stored on a machine-readable carrier.
Other example implementations comprise the computer program for carrying out one of the methods described here, wherein the computer program is stored on a machine-readable carrier. In other words, an example implementation of the method described herein is thus a computer program that comprises program code for carrying out one of the methods described herein when the computer program is executed on a computer.
A further example implementation of the method described herein is thus a data carrier (or a digital storage medium or a computer-readable medium) on which the computer program for carrying out one of the methods described here is recorded. The data carrier or the digital storage medium or the computer-readable medium are typically tangible and/or not volatile.
A further example implementation of the method described herein is thus a data stream or a sequence of signals that represents or represent the computer program for carrying out one of the methods described herein. The data stream or the sequence of signals can for example be configured to be transferred over a data communication connection, for example over the Internet.
A further example implementation comprises a processing device, for example a computer or a programmable logic component, that is configured or adapted to carry out one of the methods described herein.
A further example implementation comprises a computer on which the computer program for carrying out one of the methods described herein is installed.
A further example implementation comprises a device or system that is configured to transmit a computer program for carrying out at least one of the methods described herein to a receiver. The transmission can for example take place electronically or optically. The receiver can for example be a computer, a mobile device, a storage device or a similar apparatus. The device or the system can for example comprise a data server for transmitting the computer program to the receiver.
In some example implementations, a programmable logic component (for example a field programmable gate array, an FPGA), can be used to carry out some or all of the functionalities of the methods described herein. In some example implementations, a field programmable gate array can interact with a microprocessor in order to carry out one of the methods described herein. In general, in some example implementations, the methods are carried out by an arbitrary hardware device. This can be a universally usable hardware such as a computer processor (CPU), or hardware specifically for the method, such as for example an ASIC.
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102020206571.3 | May 2020 | DE | national |
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Number | Date | Country | |
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20210372865 A1 | Dec 2021 | US |