1. Field of the Invention
The invention relates to a moving body posture angle detecting apparatus, and more particularly, to technology that accurately detects a posture angle of a moving body such as a robot.
2. Description of the Related Art
Acceleration sensors and angular velocity sensors are used in posture control of moving bodies such as robots. When three orthogonal axes are designated as an x axis, a y axis, and a z axis, the accelerations in the directions of these three axes are detected by three acceleration sensors and the angular velocities in the directions of the three axes are detected by three angular velocity sensors. The angles around the axes, i.e., posture angles, are obtained by time-integrating the outputs from the angular velocity sensors such that the pitch angle, the roll angle, and the yaw angle can be calculated.
Japanese Patent Application Publication No. JP-A-2004-268730 describes technology which performs posture control using posture data and acceleration data output from gyro sensors.
When the offset and drift of the angular velocity sensors (yaw rate sensors) are large, however, the offset and drift values accumulate gradually and end up being extremely large values because the posture angle is obtained by the integration of the angular velocity. Those values increase with time and ultimately diverge. This problem can be avoided by using angular velocity sensors with little offset and drift, but these kinds of sensors are large, heavy, and expensive.
On the other hand, it is possible to correct the accumulation of errors from integration by detecting the gravitational direction with an acceleration sensor and correcting the posture angle obtained by the angular velocity sensor at an appropriate timing using this gravitational direction. Unfortunately, however, this method is unable to be used when the changes in movement of the moving body are fast and acceleration other than gravity is frequently generated.
This invention thus provides an apparatus that is capable of detecting the posture angle of a moving body by preventing the accumulation of integration errors by means of a simple structure without using expensive, highly accurate angular velocity sensors.
One aspect of the invention relates to a moving body posture angle detecting apparatus which includes an angular velocity sensor which detects an angular velocity of a moving body; an acceleration sensor which detects an acceleration of the moving body; angular velocity posture angle calculating means for calculating, as an angular velocity posture angle, a posture angle of the moving body from the angular velocity; acceleration posture angle calculating means for calculating, as an acceleration posture angle, a posture angle of the moving body from the acceleration; angular velocity posture angle low range component extracting means for extracting a low range component of the angular velocity posture angle; acceleration posture angle low range component extracting means for extracting a low range component of the acceleration posture angle; difference calculating means for calculating, as error, a difference between the low range component of the angular velocity posture angle and the low range component of the acceleration posture angle; error removing means for removing the error from the angular velocity posture angle; outputting means for outputting, as a posture angle of the moving body, an angular velocity posture angle from which the error has been removed by the error removing means; and feedback means for feeding back the angular velocity posture angle from which the error has been removed by the error removing means to the angular velocity posture angle calculating means.
In this aspect of the invention, the angular velocity posture angle low range component extracting means and the acceleration posture angle low range component extracting means may include means for sin converting and cos converting the angular velocity posture angle; means for extracting a low range component of a value obtained by the sin conversion and the cos conversion; and means for performing an a tan 2 calculation or an a tan calculation on the value of the extracted low component.
Another aspect of the invention relates to a moving body posture angle detecting apparatus which includes an angular velocity sensor which detects an angular velocity of a moving body; an acceleration sensor which detects an acceleration of the moving body; angular velocity posture angle calculating means for calculating, as an angular velocity posture angle, a posture angle of the moving body from the angular velocity; acceleration posture angle calculating means for calculating, as an acceleration posture angle, a posture angle of the moving body from the acceleration; difference calculating means for calculating a difference between the angular velocity posture angle and the acceleration posture angle; low range component extracting means for extracting, as error, a low range component of the difference; error removing means for removing the error from the angular velocity posture angle; outputting means for outputting, as a posture angle of the moving body, an angular velocity posture angle from which the error has been removed by the error removing means; and feedback means for feeding back the angular velocity posture angle from which the error has been removed by the error removing means to the angular velocity posture angle calculating means.
Another aspect of the invention relates to a moving body posture angle detecting apparatus which includes an angular velocity sensor which detects an angular velocity of a moving body; an acceleration sensor which detects an acceleration of the moving body; means for calculating a small angle matrix which defines a small rotation angle after a small period of time is has passed from the angular velocity; means for calculating a new angular velocity system posture matrix from the small angle matrix and a posture matrix that was fed back; means for calculating a tilt angle from the acceleration; means for calculating an acceleration system posture matrix from the tilt angle; angular velocity system low range component extracting means for extracting a low range component of the angular velocity system posture matrix; acceleration system low range component extracting means for extracting a low range component of the acceleration system posture matrix; difference calculating means for calculating, as error, a difference between the low range component of the angular velocity system posture matrix and the low range component of the acceleration system posture matrix; error removing means for removing the error from the angular velocity system posture matrix; outputting means for calculating a posture angle from the angular velocity system posture matrix from which the error has been removed by the error removing means and outputting the result a posture angle of the moving body; and feedback means for feeding back the angular velocity system posture matrix from which the error has been removed by the error removing means to the means for calculating the new angular velocity system posture matrix.
Still another aspect of the invention relates to a moving body posture angle detecting apparatus which includes an angular velocity sensor which detects an angular velocity of a moving body; an acceleration sensor which detects an acceleration of the moving body; means for calculating a small angle quaternion which defines a small rotation angle after a small period of time is has passed from the angular velocity; means for calculating a new angular velocity system quaternion from the small angle quaternion and a quaternion that was fed back; means for calculating a tilt angle from the acceleration; means for calculating an acceleration system posture matrix from the tilt angle; angular velocity system low range component extracting means for extracting a low range component of the angular velocity system quaternion; acceleration system low range component extracting means for extracting a low range component of the acceleration system quaternion; difference calculating means for calculating, as error, a difference between the low range component of the angular velocity system quaternion and the low range component of the acceleration system quaternion; error removing means for removing the error from the angular velocity system quaternion; outputting means for calculating a posture angle from the angular velocity system quaternion from which the error has been removed by the error removing means and outputting the result a posture angle of the moving body; and feedback means for feeding back the angular velocity system quaternion from which the error has been removed by the error removing means to the means for calculating the new angular velocity system quaternion.
In the invention, the angular velocity posture angle, which is the posture angle calculated based on the angular velocity that was detected by the angular velocity sensor, is supplied to the low range component extracting means. The angular velocity posture angle includes a drift amount from the accumulation of integration error. Thus when the true value of the posture angle is divided into a high range component and a low range component, the angular velocity posture angle includes (a high range posture angle true value+a low range posture angle true value+a low range drift amount). The low range component extracting means removes the high range component and extracts (the low range posture angle true value+the low range drift amount). Meanwhile, the acceleration posture angle, which is the posture angle calculated based on the acceleration that was detected by the acceleration sensor, is also supplied to the low range component extracting means. The acceleration posture angle includes a high range noise component and a low range posture angle true value, but does not include a drift amount from the accumulation of integration error. The low range component extracting means removes the high range component and extracts the low range posture angle true value. Therefore, supplying the outputs of these low range component extracting means to the difference calculating means and calculating (the low range posture angle true value+the low range drift amount)−(the low range posture angle true value) enables only the drift amount (i.e., the error) to be extracted. A highly accurate posture angle can then be detected by removing the extracted drift amount from the angular velocity posture angle. Also, removing the extracted drift amount from the angular velocity posture angle and feeding back the result prevents the accumulation of integration error, improves output responsiveness, and stabilizes the output. The high range noise amount includes oscillation acceleration noise and electrical noise components, and an acceleration component other than gravitational force following movement of a measured body. In particular, noise from the acceleration component other than gravity following movement of the measured body becomes a large noise component in small measured bodies having large amounts of motion, such as robots, which is a major obstacle in obtaining a posture angle.
Also in the invention, the angular velocity system posture matrix calculated based on the angular velocity that was detected by the angular velocity sensor is supplied to the low range component extracting means. The angular velocity system posture matrix includes a drift amount from the accumulation of integration error. Thus when the true value of the posture is divided into a high range component and a low range component, the angular velocity system posture matrix includes (a high range posture true value+a low range posture true value+a low range drift amount). The low range component extracting means removes the high range component and extracts (the low range posture true value+the low range drift amount). Meanwhile, the acceleration system posture matrix calculated based on the acceleration that was detected by the acceleration sensor is also supplied to the low range component extracting means. The acceleration system posture matrix includes a high range noise component, a high range posture true value component, and a low range posture true value, but does not include a drift amount from the accumulation of integration error. The low range component extracting means removes the high range component and extracts the low range posture true value. Therefore, supplying the outputs of these low range component extracting means to the difference calculating means and calculating (the low range posture true value+the low range drift amount)−(the low range posture true value) enables only the drift amount (i.e., the error) to be extracted. A highly accurate posture angle can then be detected by removing the extracted drift amount from the angular velocity system posture matrix to obtain an angular velocity system posture matrix without any error, and then calculating the posture angle from this angular velocity system posture matrix. Also, removing the extracted drift amount from the angular velocity system posture matrix and feeding back the result prevents the accumulation of integration error, improves output responsiveness, and stabilizes the output. Moreover, the drift amount can similarly be extracted by calculating a quaternion from the angular velocity system posture matrix and calculating a quaternion from the acceleration system posture matrix, extracting the low range components at the quaternion stage and calculating the difference between the two. The posture matrix and the quaternion are essentially equivalent, but using the quaternion reduces the number of calculations thereby shortening the processing time.
The invention makes it possible to accurately detect the posture angle of a moving body by preventing the accumulation of integration errors without using sensors which are large, heavy, and expensive.
The features, advantages thereof, and technical and industrial significance of this invention will be better understood by reading the following detailed description of preferred embodiments of the invention, when considered in connection with the accompanying drawings, in which:
Exemplary embodiments of the invention will be described with reference to the drawings using, as an example, a robot for the moving body and a sensor unit for the posture angle detecting apparatus.
A first exemplary embodiment of the invention will be described.
The angular velocity sensor 10 detects the angular velocity on a sensor coordinate system (i.e., a coordinate system of the sensor unit). The angular velocities around the axes are designated as ωx, ωy, and ωz. The angular velocity sensor 10 outputs the detected angular velocities to a small angle matrix calculator 12.
This small angle matrix calculator 12 calculates a coordinate conversion matrix for calculating a sensor coordinate system xyz as viewed in a reference coordinate system XYZ. The small angle matrix will be described later. The small angle matrix calculator 12 outputs the calculated small angle matrix to a matrix adding calculator 14.
The matrix adding calculator 14 performs an integral calculation by adding the current small angle matrix detected by the angular velocity sensor 10 that was input from the small angle matrix calculator 12 to the posture angle matrix that was fed back from the output side. The matrix adding calculator 14 then outputs the integrated matrix to a matrix posture angle calculator 16.
The matrix posture angle calculator 16 calculates the posture angle from the integrated matrix that was input, and outputs the result as an angular velocity posture angle SYA both to a low pass filter LPF 18 and a subtracter 32.
The low pass filter (i.e., angular velocity system low pass filter) 18 extracts a low range component from the angular velocity posture angle SYA and outputs it to a differencer 30. The angular velocity posture angle SYA includes a true posture angle (posture angle true value) and a drift amount from integration error. The low pass filter 18 removes the high range posture angle true value from the angular velocity posture angle SYA and extracts the low range posture angle true value and the drift amount.
Meanwhile, the acceleration sensor 20 detects the acceleration in the direction of each axis in the sensor coordinate system xyz. The detected accelerations are designated as Gx, Gy, and Gz. The acceleration sensor 20 then outputs the detected accelerations to a tilt angle calculator 22.
The tilt angle calculator 22 calculates the angles between the Z axis of the reference coordinate system XYZ and each axis of the sensor coordinate system xyz. The calculated tilt angles are designated as λx, λy, and λz. The tilt angle calculator 22 then outputs the calculated tilt angles to an acceleration matrix calculator 24.
The acceleration matrix calculator 24 calculates the posture matrix with respect to the sensor coordinate system when viewed in the reference coordinate system using the tilt angle that was input, and outputs the calculated posture matrix to a matrix posture angle calculator 26.
The matrix posture angle calculator 26 then calculates the posture angle from the matrix that was input and outputs the calculated posture angle as an acceleration posture angle SGA to a low pass filter 28, similar to the matrix posture angle calculator 16.
The low pass filter (i.e., acceleration system low pass filter) 28 is a filter in which the cutoff frequency and attenuation factor are set the same as they are in the low pass filter 18. The low pass filter 28 extracts a low range component from the acceleration posture angle SGA and outputs it to the differencer 30. The acceleration posture angle SGA includes a high range posture angle pseudo value in the high range component and a low range posture angle true value in the low range component. No drift from integration error occurs in the acceleration posture angle. Because the cutoff frequency and attenuation factor of the low pass filter 28 are set the same as they are in the low pass filter 18, the low range posture angle true value of the angular velocity system is the same as the low range posture angle true value of the acceleration system. The frequency characteristic of the angular velocity system is also the same as the frequency characteristic of the acceleration system. Thus, only the drift component is accurately output by subtraction calculation of both of the low range posture angle true values. When the responsiveness of the components corresponding to the posture angles produced by the angular velocity system and the acceleration system are known beforehand, however, the cutoff frequency and the attenuation factor of the low pass filter can be adjusted to match their characteristics. This method can be effective when the adaptive range is narrow but the movement characteristics are known beforehand.
As described above, (the low range posture angle true value plus the drift amount) from the low pass filter 18, as well as (the low range posture angle true value) from the low pass filter 28 are input to the differencer 30. The differencer 30 then calculates the difference between the two and extracts the drift amount (i.e., drift amount=(low range posture angle true value+drift amount)−(low range posture angle true value)). The differencer 30 then outputs the drift amount obtained through the difference calculation to the subtracter 32.
The subtracter 32 calculates the difference between the angular velocity posture angle SYA that was input from the matrix posture angle calculator 16 and the drift amount that was input from the differencer 30, and then removes the drift amount included in the angular velocity posture angle SYA from the matrix posture angle calculator 16. As described above, the angular velocity posture angle SYA from the matrix posture angle calculator 16 includes the posture angle true value (high range component+low range component) and the drift amount. The subtracter 32 then extracts the low range posture angle true value through subtraction (i.e., low range posture angle true value=(low range posture angle true value+drift amount)−(drift amount)). The subtracter 32 then outputs the posture angle true value that was obtained through subtraction to an output device 34. The subtracter 32 also outputs the posture angle true value to a posture angle matrix calculator 36.
The posture angle matrix calculator 36 calculates a posture angle matrix from the posture angle that was input and feeds it back to the matrix adding calculator 14. The posture angle matrix calculator 36 then performs an inverse operation of the matrix posture angle calculator 16 and creates a posture angle matrix from the posture angle. The matrix adding calculator 14 then performs an integral calculation by adding the posture angle matrix that was fed back to the small angle matrix that was calculated based on an angular velocity that was newly detected by the angular velocity sensor 10, and then calculates the posture angle from the angular velocity.
The output device 34 outputs the posture angle from which the drift amount has been removed by the subtracter 32 to an external component. In the case of a robot, a main processor (or host processor) inputs the posture angle and the like detected by the sensor unit and performs feedback control on the posture of the robot. The output device 34 outputs the posture angle at a predetermined timing to the main processor in response to a command from the main processor. The angular velocity detected by the angular velocity sensor 10 or the acceleration detected by the acceleration sensor may be supplied to the output device 34, and the output device 34 may output the angular velocity or the acceleration, in addition to the posture angle, to the main processor. Which of those is to be output is determined either by a command from the main processor or set parameters. The output device 34 outputs all of the angular velocity, the acceleration, and the posture angle at a given timing to the main processor, and selectively outputs one of those at another timing. Although not shown in the drawings, the posture matrix obtained by the posture angle matrix calculator 36 can also be output to the robot via the output device 34. This is an effective method when performing the matrix calculation within the robot.
As described above, an accurate posture angle from which the drift amount has been removed is thus detected and output. Because the drift amount is extracted based on the acceleration in the direction of each axis detected by the acceleration sensor 20, that drift amount then removed from the angular velocity posture angle and the result fed back, there is no need for the angular velocity sensor 10 to be an expensive, heavy and extremely accurate sensor.
Hereinafter, the calculations that are performed in the small angle matrix calculator 12, the matrix posture angle calculator 16, the tilt angle calculator 22, and the matrix posture angle calculator 26 will be described.
First, the posture matrix will be described. A posture matrix T(n) in discrete time n is used to represent the sensor coordinate system in the reference coordinate system XYZ. The posture matrix T(n) is formed of 4×4 elements, as shown in Expression 1 below.
In terms of meaning of the matrix T(n), the first column (a, b, c), the second column (d, e, f), and the third column (g, h, i) refer to the direction vectors of the x axis, y axis, and z axis, respectively, of the sensor coordinate system n when viewed in the reference coordinate system. The fourth column indicates the point of origin of the sensor coordinate system n in the reference coordinate system (i.e., typically when there is a translation, the translation amount is expressed in the fourth column). When the point of origin is stationary, the elements in the first to the third rows in the fourth column representing positional conversion are set at 0. As shown in
The method for obtaining the posture matrix T(n) from the posture angle roll, pitch, and yaw angle is described below. This method calculates the posture matrix by the posture angle matrix calculator 36 based on the posture angle from the subtracter 32. In order to express the posture matrix T(n), a rotational conversion from the matrix must take into account the order of the rotating axes. As shown in
The conversion matrix from the roll, pitch, and yaw angle is designated as RPY (φ, θ, ψ). RPY (φ, θ, ψ) is the product of the rotational conversion matrices multiplied from left to right and is shown in Expression 2 below.
[Expression 2]
RPY(φ,θ,ψ)=Rot(z,φ)Rot(y,θ)Rot(x,ψ) (2)
Expression 3 shows Expression 2 in more detail.
When Expression 3 is written out, it can be expressed as shown in Expression 4.
Eulerian angles may be used as the posture angles instead of the roll, pitch, and yaw angle. With the Eulerian angles, the conversion matrix when the rotation φ first occurs around the z axis, the rotation θ then occurs around the y axis after that rotation, and lastly the rotation ψ occurs around the x axis after that rotation is designated as Euler (Eφ, Eθ, Eψ) and is shown in Expression 5.
[Expression 5]
Euler(Eφ,Eθ,Eψ)=Rot(z,Eφ)Rot(y,Eθ)Rot(z,Eψ) (5)
Expression 5 is shown in detail in Expression 6 below.
When Expression 6 is written out, it can be expressed as shown in Expression 7.
The reference coordinate system is designated as O-XYZ, and the initial sensor coordinate system is designated as O0-x0y0z0. The reference coordinate system and the coordinate system O0-x0y0z0 at time t=0 are related by the coordinate conversion A(0). The coordinate system at time t=tn is designated as On-xnynzn. The points of origin O, O0, On of each coordinate system are the same and do not move in position. When there is a change from the coordinate system O(n-1)-x(n-1)y(n-1)z(n-1) to On-xnynzn, as shown in
[Expression 8]
A(n)=A(0)A(1) . . . A(n−1)A(n) (8)
Next, the method for introducing the matrix of the small rotation matrix A(n) from the sensor output will be described. This method calculates a small angle matrix based on the angular velocity from the angular velocity sensor 10 using the small angle matrix calculator 12. Three angular velocity sensors are arranged, one on each axis of the sensor coordinate system. These angular velocity sensors measure the angular velocities around the axes of sensors x, y, and z, as shown in
[Expression 9]
sin Δφ≈Δφ, sin Δθ≈Δθ, sin Δψ≈Δψ (9)
[Expression 10]
cos Δφ≈1, cos Δθ=1, cos Δψ≈1 (10)
This can therefore be expressed by Expression 11 using the small rotation angle Δψ around the sensor x axis, the small rotation angle Δθ around the sensor y axis, and the small rotation angle Δφ around the sensor z axis. The results of Expression 11 resemble a case in which the rotation order is not relied upon because each element in the matrix is expressed independently by a small rotation angle.
The small angle and the sensor output are related as shown in Expressions 12 and 13 by the small rotation angles Δψ, Δθ, Δφ, the angular velocity sensor outputs ωx, ωy, ωz, and the sampling cycle ts. The sampling cycle ts is sufficiently early with respect to the rotational movement so the rotation within the time of the sampling cycle ts is sufficiently small and can thus be regarded as a small rotation angle.
[Expression 12]
Δψ=ωxts (12)
[Expression 13]
Δθ=ωyts (13)
[Expression 14]
Δφ=ωzts (14)
Therefore, the A(n) matrix can be expressed by Expression 15.
Next, a method for obtaining the posture angle from the posture matrix will be described. This method calculates the posture angle based on the posture matrix from the matrix adding calculator 14 (i.e., the posture matrix after integration) using the matrix posture angle calculator 16. This method also calculates the posture angle based on the posture matrix from the acceleration matrix calculator 24 using the matrix posture angle calculator 26.
The posture matrix T(n) is shown in Expression 16.
The yaw angle φ is
[Expression 17]
φ=a tan 2(b,a) (17)
and the range of change in the posture angle φ is −π<ψ≦π.
The pitch angle θ is
[Expression 18]
θ=a tan 2(−c,cos φ·a+sin φ·b) (18)
and the range of change in the posture angle θ is −π/2<θ<π/2.
The roll angle ψ is
[Expression 19]
ψ=a tan 2(sin φ·g−cos φ·h,−sin φ·d+cos φ·e) (19)
and the range of change in the posture angle ψ is −π<ψ≦π.
If Eulerian angles are used, Expressions 21 to 23 are used.
Eφ is
[Expression 21]
Eφ=a tan 2(b,a) (21)
Eθ is
[Expression 22]
Eθ=a tan 2(cos φ·g+sin φ·h,i) (22)
and Eψ is
[Expression 23]
Eψ=a tan 2(−sin φ·a+cos φ·b,−sin φ·d+cos φ·e) (23)
Next, normalization of the matrix will be described.
With the posture matrix T(n), after calculation, each column in the posture matrix may not be in unit vectors so normalization is performed by Expression 25 to make the size of each column vector in Expression 24 one. This is a calculation that is performed by normalizer/orthogonalizers 54 and 56 in
Here, p1 and p2 are provided by Expressions 26 and 27.
Then, each element after normalization is reset again to
Furthermore, orthogonalization of the matrix will be described.
With the posture matrix T(n), after calculation, the columns in the posture matrix may not be orthogonal axes so an orthogonalization process is performed in which the column vectors in Expression 29 are made orthogonal (in this case, the z axis is used as the reference). a′, b′, and c′ are obtained in order to obtain a new x′ axis that is orthogonal to the z axis and the y axis.
[Expression 30]
a′=ei−fh (30)
[Expression 31]
b′=fg−di (31)
[Expression 32]
c′=dh−eg (32)
Next, d′, e′, and f′ are obtained in order to obtain a new y′ axis which is orthogonal to the z axis and the x′ axis.
[Expression 33]
d′=hc′−ib′ (33)
[Expression 34]
e′=ia′−gc′ (34)
[Expression 35]
f′=gb′−ha′ (35)
A posture matrix T(n) that has been orthogonalized is then obtained from the obtained a′ to f′.
Here, a tan 2 will be described. a tan 2 (y, x) is a calculator function which has two variables x and y. The application range of a tan 2 is wider than the a tan function that is normally used.
[Expression 37]
?=a tan 2(y,x) (37)
−π<ξ≦π is such that when x>0 and y>0,
[Expression 38]
?=tan−1(y/x) (38)
and when x>0 and y<0,
[Expression 39]
?=tan−1(y/x) (39)
In the same way,
when x<0 and y>0, then ξ=π+tan−1(y/x),
when x<0 and y<0, then ξ=−π+tan−1(y/x),
when x=0 and y>0, then ξ=π/2,
when x=0 and y<0, then ξ=−π/2,
and when x=0 and y=0, then ξ=0.
Next, the calculation for the tilt angle will be described. This method calculates the tilt angle using the tilt angle calculator 22 based on the acceleration obtained by the acceleration sensor 20. The tilt angle refers to angles λx, λy, λz between the sensor x, y, z axes and the reference Z axis. That is, λx is the angle between the x axis and the Z axis, λy is the angle between the y axis and the Z axis, and λz is the angle between the z axis and the Z axis. The range of λx, λy, and λz is 0≦(λx, λy, λz)≦π.
The tilt angles are obtained as shown below from the acceleration sensors arranged on the sensor coordinates. The accelerations Gx, Gy, and Gz are normalized using Expressions 40 to 42, and accelerations Gx′, Gy′, and Gz′ after normalization are obtained.
The tilt angles λx, λy, and λz are obtained from the accelerations Gx′, Gy′, and Gz′ using Expressions 43 to 45.
[Expression 43]
λx=a cos(−Gx′) (43)
[Expression 44]
λy=a cos(−Gy′) (44)
[Expression 45]
λz=a cos(−Gz′) (45)
Next, the procedure for obtaining the posture matrix T(n) from the tilt angles λx, λy, and λz will be described. This is a calculation obtains the posture matrix based on the tilt angles from the tilt angle calculator 22 using the acceleration matrix calculator 24.
[Expression 46]
c=cos(λx) (46)
[Expression 47]
a=+√{square root over ((1−c2))} (47)
[Expression 48]
b=0 (48)
[Expression 49]
f=cos(λy) (49)
[Expression 50]
d=−cf/a (50)
[Expression 51]
e=+√{square root over ((1−f2−d2))} when 0≦λz<π/2 (51)
[Expression 52]
e=−√{square root over ((1−f2−d2))} when π/2<λz≦π (52)
[Expression 53]
e=0 when λz=π/2 (53)
[Expression 54]
g=−ce (54)
[Expression 55]
h=cd−af (55)
[Expression 56]
i=ae (56)
The posture matrix T(n) is then obtained from the above results.
Next, the procedure for obtaining the tilt angles λx, λy, and λz from the posture matrix T(n) will be described.
Continuing on, a second exemplary embodiment will be described.
Continuing on, a third exemplary embodiment will be described.
Continuing on, a fourth exemplary embodiment will be described.
Also, after extracting the low range component from the posture matrix, the low pass filter (acceleration system) 48 outputs the posture matrix to the matrix posture angle calculator 26. Similar to the third exemplary embodiment, the posture angle around the Z axis, i.e., the yaw angle, from the external posture angle 44 may be supplied to the acceleration system. In the third exemplary embodiment, however, the yaw angle φ detected by an external sensor is supplied to the matrix posture angle calculator 26, but in the fourth exemplary embodiment, that yaw angle φ is supplied to the acceleration matrix calculator 24. This of course is done to extract the low range component of the posture matrix using the low pass filter 48 and because it is necessary to include the yaw angle φ detected by the external sensor as a component of the posture matrix.
Continuing on, a fifth exemplary embodiment will be described.
Continuing on, a sixth exemplary embodiment will be described.
Continuing on, a seventh exemplary embodiment will be described.
The angular velocity sensor 10 detects the angular velocity in the sensor coordinate system (i.e., the coordinate system of the sensor unit). The angular velocities around the axes are designated as ωx, ωy, and ωz. The angular velocity sensor 10 outputs the detected angular velocities to the small angle matrix calculator 12.
The small angle matrix calculator 12 calculates a coordinate conversion matrix for calculating the sensor coordinate system xyz when viewed in the reference coordinate system XYZ. The small angle matrix will be described later. The small angle matrix calculator 12 outputs the calculated small angle matrix to the matrix adding calculator 14.
The matrix adding calculator 14 performs an integral calculation by adding the current small angle matrix detected by the angular velocity sensor 10 that was input from the small angle matrix calculator 12 to a posture matrix that was fed back from the output side. The matrix adding calculator 14 then outputs the integrated matrix (i.e., the angular velocity system posture matrix) to the low pass filter (ALPF) 46. The matrix adding calculator 14 also outputs the integrated matrix to the subtracter 32.
The low pass filter (i.e., the angular velocity system low pass filter) 46 extracts the low range component from the components of the angular velocity system posture matrix and outputs it to the differencer 30. The angular velocity system posture matrix includes the true posture (i.e., the posture true value) and a drift amount from integration error. The low pass filter 46 removes the high range posture true value from the angular velocity system posture matrix and extracts the low range posture true value and the drift amount.
Meanwhile, the acceleration sensor 20 detects the acceleration in the direction of each axis in the sensor coordinate system xyz. The detected accelerations are designated as Gx, Gy, and Gz. The acceleration sensor 20 outputs the detected accelerations to the tilt angle calculator 22.
The tilt angle calculator 22 calculates the angle between each axis in the sensor coordinate system xyz and the Z axis in the reference coordinate system XYZ. The calculated tilt angles are designated as λx, λy, and λz. The tilt angle calculator 22 then outputs the calculated tilt angles to the acceleration matrix calculator 24.
The acceleration matrix calculator 24 calculates the posture matrix with respect to the sensor coordinate system when viewed in the reference coordinate system using the tilt angles that were input, and outputs the result as an acceleration system posture matrix to the low pass filter (ALPF) 48.
The low pass filter (i.e., the acceleration system low pass filter) 48 is a filter in which the cutoff frequency and the attenuation factor are set the same as they are in the low pass filter 46. The low pass filter 48 extracts the low range component from the acceleration system posture matrix and outputs it to the differencer 30. The acceleration system posture matrix includes noise produced in the high range, a high range posture true value, and a low range posture true value. No drift from integration error occurs in the acceleration system posture matrix. Because the cutoff frequency and attenuation factor of the low pass filter 48 are set the same as they are in the low pass filter 46, the low range posture angle true value of the angular velocity system is the same as the low range posture angle true value of the acceleration system. The frequency characteristic of the angular velocity system is also the same as the frequency characteristic of the acceleration system. Thus, only the drift component is accurately output by subtraction calculation of both of the low range posture angle true values. When the responsiveness of the components corresponding to the postures produced by the angular velocity system and the acceleration system are known beforehand, however, the cutoff frequency and the attenuation factor of the low pass filter can be adjusted to match their characteristics. This method can be effective when the adaptive range is narrow but the movement characteristics are known beforehand.
As described above, (the low range posture true value plus the drift component) from the low pass filter 46, as well as (the low range posture true value) from the low pass filter 48 are input to the differencer 30. The differencer 30 then calculates the difference between the two and extracts the drift amount (i.e., drift amount=(low range posture true value+drift amount)−(low range posture true value)). The differencer 30 then outputs the drift amount obtained through the difference calculation to the subtracter 32.
The subtracter 32 calculates the difference between the angular velocity system posture that was input from the matrix adding calculator 14 and the drift amount that was input from the differencer 30 (i.e., the matrix difference), and then removes the drift amount included in the angular velocity system posture matrix from the matrix adding calculator 14. As described above, the angular velocity system posture matrix from the matrix adding calculator 14 includes the posture true value and the drift amount. The subtracter 32 then extracts the posture true value through subtraction (i.e., posture true value=(posture true value+drift amount)−(drift amount)). The subtracter 32 then outputs the angular velocity system posture matrix of the posture true value that was obtained through subtraction to a matrix posture angle calculator 37. The matrix posture angle calculator 37 calculates the posture angle from the posture matrix and outputs it as a posture angle of the moving body to the output device 34. The subtracter 32 also feeds back the posture matrix minus the drift amount to the matrix adding calculator 14. The matrix adding calculator 14 then performs an integral calculation by adding the posture matrix that was fed back to the small angle matrix that was calculated based on the angular velocity that was newly detected by the angular velocity sensor 10, and calculates a new angular velocity system posture matrix from the angular velocity.
The output device 34 outputs the posture angle minus the drift amount from the matrix posture angle calculator 37 to an external component. In the case of a robot, a main processor (or host processor) inputs the posture angle and the like detected by the sensor unit and performs feedback control on the posture of the robot. The output device 34 outputs the posture angle at a predetermined timing to the main processor in response to a command from the main processor. The angular velocity detected by the angular velocity sensor 10 or the acceleration detected by the acceleration sensor may be supplied to the output device 34, and the output device 34 may output the angular velocity or the acceleration, in addition to the posture angle, to the main processor. Which of those is to be output is determined either by a command from the main processor or set parameters. The output device 34 outputs all of the angular velocity, the acceleration, and the posture angle at a given timing to the main processor, and selectively outputs one of those at another timing.
As described above, an accurate posture angle from which the drift amount has been removed is thus detected and output. Because the drift amount is extracted based on the acceleration in the direction of each axis detected by the acceleration sensor 20, that drift amount then removed from the angular velocity posture and the result fed back, there is no need for the angular velocity sensor 10 to be an expensive, heavy and extremely accurate sensor.
Continuing on, an eighth second exemplary embodiment will be described.
Also, in
Continuing on, a ninth exemplary embodiment will be described.
Continuing on, a tenth exemplary embodiment will be described.
Continuing on, an eleventh exemplary embodiment will be described.
The subtracter 32 calculates the difference between the angular velocity system quaternion input from the quaternion integrating calculator 15 and the drift amount from the differencer 30, and removes the drift amount from the angular velocity system quaternion. The subtracter 32 then outputs the angular velocity system quaternion from which the drift amount has been removed to the quaternion integrating calculator 15 as well as to a quaternion posture angle calculator 70.
The accumulation of integration error can be prevented because the quaternion that is fed back is a quaternion from which the drift amount has been removed. The quaternion posture angle calculator 70 calculates the posture angle from the quaternion that was input and outputs the result to the output device 34.
Hereinafter, a method for calculating the quaternion as well as a method for calculating the posture angle from the quaternion will be described.
First, the quaternion will be described. The quaternion is such that a plurality of prime numbers having degrees of freedom in two dimensions is expanded to have degrees of freedom in four dimensions. The quaternion is typically expressed as:
q=a+bi+cj+dk
Here, a, b, c, and d are real numbers and i, j, and k are bases (size=1). The products of the bases have the following relationships.
i×1=1×i=i
j×1=1×j=j
k×1=1×k=k
i×j=−j×i=k
j×k=−k×j=i
k×i=−i×k=j
Also, with respect to the two quaternions q1=a1+b1i+c1j+d1k and q2=a2+b2i+c2j+d2k, the sums and differences are:
q1+q2=a1+a2+(b1+b2)i+(c1+c2)j+(d1+d2)k
q1−q2=a1−a2+(b1−b2)+(c1−c2)j+(d1−d2)k
and the product is:
q1q2=(a1+b1i+c1j+d1k)×(a2+b2i+c2j+d2k)=(a1a2−b1b2−c1c2−d1d2)+(a1b2+b1a2+c1d2−d1c2)i+(a1c2−b1d2+c1a2+d1b2)j+(a1d2+b1c2−c1b2+d1a2)k
The quaternion is represented as follows using imaginary number units j, and k.
P=(a;xi,yj,zk)
Using a quaternion Q, the relationship, i.e., posture, of the sensor coordinate system xyz when viewed in the reference coordinate system XYZ is
Q=(cos η/2;α sin η/2,β sin η/2,γ sin η/2)
This shows a coordinate system (sensor coordinate system) in which the reference coordinate system rotated at an angle it around rotating axes (α, β, γ) expressed by the reference coordinate system, and expresses the posture of the sensor coordinate system.
Next, a representation by the quaternion of the angular velocity sensor output will be described. The relationship between the rotation angle and the sensor output is as follows from the small rotation angles Δψ, Δθ, and Δφ, the angular velocity sensor outputs ωx, ωy, and ωz, and the sampling cycle ts.
Δψ=ωx×ts
Δθ=ωy×ts
Δφ=ωz×ts
When the rotational conversion at this time is expressed by, the quaternion, we get
qx=(cos Δψ/2;sin Δψ/2i,0j,0k)
qy=(cos Δθ/2;0i,sin Δθ/2j,0k)
qz=(cos Δφ/2;0i,0j,sin Δφ/2k)
The rotational conversions around the x axis, the y axis, and the z axis are represented together. When the rotation angle α is sufficiently small, we get the following.
qxqyqz=(1+ΔψΔθΔφ/8;(Δψ/2−ΔθΔφ/4)i,(Δθ/2+ΔψΔφ/4)j,(Δφ/2−ΔψΔθ/4)k)
Next, the integration of the rotational conversion from the quaternion will be described. When the rotational conversion q1 is
q1=(cos η1/2;α sin η1/2,β sin η1/2,γ sin η1/2), then the rotational conversion q2 is
q2=(cos η2/2;α sin η2/2,β sin η2/2,γ sin η2/2)
First, the rotation conversion q1 is performed for the reference coordinate system, and then the rotational conversion q2 is performed for the coordinate system after that rotation. A conversion q3 from two rotational conversions is
q3=q1×q2=(cos η1/2;α sin η1/2,β sin η1/2,γ sin η1/2)×(cos η2/2;α sin η2/2,βsin η2/2,γ sin η2/2)
Next, normalization of the quaternion will be described. With the quaternion that expresses rotation, after calculation, normalization is performed to make the size (norm) of the conversion q equal to 1. When the quaternion that expresses rotation is expressed by q, the size of q is obtained and then normalization is performed by dividing q by the size, thereby obtaining q′.
q=(ε0;ε1,ε2,ε3)
|q|=(ε02+ε12+ε22+ε32)0.5
q′=q/|q|
The quaternion is a representational method that maintains the orthogonal condition so further orthogonalization is not necessary.
Next, the conversion from the quaternion to the posture angle will be described. When
a=ε02+ε12−ε22−ε32
b=2(ε1ε2+ε0ε3)
c=2(ε1ε3−ε0ε2)
d=2(ε1ε2−ε0ε3)
e=ε02−ε12+ε22−ε32
f=2(ε2ε3+ε0ε1)
g=2(ε1ε3+ε0ε2)
h=2(ε2ε3−ε0ε1)
i=ε02−ε12−ε22+ε32
in the conversion q=(ε0; ε1, ε2, ε3) expressed by the quaternion, the posture angle is obtained by the following expressions.
yaw angle φ=a tan 2(b,a)
pitch angle θ=a tan 2(−c,cos φ·a+sin φ·b)
roll angle ψ=a tan 2(sin φ·g−cos φ·h,−sin φ·d+cos φ·e)
Next, the conversion from the posture angle (roll angle, pitch angle, yaw angle) to the quaternion will be described. The rotational conversions from the posture angles (ψ,θ, φ) are expressed with the quaternion.
The rotation around the x axis is
R(ψ;i)=cos ψ/2+i sin ψ/2
The rotation around the y axis is
R(θ;j)=cos θ/2+j sin θ/2
The rotation around the z axis is
R(φ;k)=cos φ/2+k sin φ/2
When these are multiplied together, we get
S=R(φ;k)×R(θ;j)×R(ψ;i)=(cos φ/2+k sin φ/2)×cos θ/2+j sin θ/2)×(cos ψ/2+sin ψ/2)
If the conversion q expressed by the quaternion is expressed as q=(ε0; ε1, ε2, ε3) at this time, then the rotation angle becomes the real part in the calculation result of S and the rotation axis becomes the imaginary part of S.
ε0=cos φ/2·cos θ/2·cos ψ/2+sin φ/2×sin θ/2·sin ψ/2
ε1=−sin φ/2−sin θ/2·cos ψ/2+cos φ/2·cos θ/2·sin ψ/2
ε2=sin φ/2·cos θ/2·sin ψ/2+cos φ/2·sin θ/2·cos ψ/2
ε3=sin φ/2·cos θ/2·cos ψ/2−cos φ/2·sin θ/2·sin ψ/2
At this time, the rotation angle α is obtained from cos α/2=ε0. Also, the rotation angles are (ε1, ε2, ε3). Also, the rotation angles are (ε1, ε2, ε3).
Continuing on, a twelfth exemplary embodiment will be described.
Continuing on, a thirteenth exemplary embodiment will be described.
Continuing on, a fourteenth exemplary embodiment will be described.
Continuing on, a fifteenth exemplary embodiment will be described.
The angular velocity sensor 10 detects the angular velocity in the sensor coordinate system (i.e., the coordinate system of the sensor unit). The angular velocities around the axes are designated as ωx, ωy, and ωz. The angular velocity sensor 10 outputs the detected angular velocities to the small angle matrix calculator 12.
The small angle matrix calculator 12 calculates a coordinate conversion matrix for calculating the sensor coordinate system xyz when viewed in the reference coordinate system XYZ. The small angle matrix will be described later. The small angle matrix calculator 12 outputs the calculated small angle matrix to the matrix adding calculator 14.
The matrix adding calculator 14 performs an integral calculation by adding the current small angle matrix detected by the angular velocity sensor 10 that was input from the small angle matrix calculator 12 to a posture angle matrix that was fed back from the output side. The matrix adding calculator 14 then outputs the integrated matrix to the matrix position angle calculator 16.
The matrix posture angle calculator 16 calculates the posture angle from the integrated matrix that was input and outputs the result as an angular velocity posture angle SYA to both the low pass filter LPF 18 and the subtracter 32.
The low pass filter (i.e., angular velocity system low pass filter) 18 extracts a low range component from the angular velocity posture angle SYA and outputs it to the differencer 30. The angular velocity posture angle SYA includes a true posture angle (posture angle true value) and a drift amount from integration error. The low pass filter 18 removes the high range posture angle true value from the angular velocity posture angle SYA and extracts the low range posture angle true value and the drift amount.
Meanwhile, the acceleration sensor 20 detects the acceleration in the direction of each axis in the sensor coordinate system xyz. The detected accelerations are designated as Gx, Gy, and Gz. The acceleration sensor 20 then outputs the detected accelerations to the tilt angle calculator 22.
The tilt angle calculator 22 calculates the angles between the Z axis of the reference coordinate system XYZ and each axis of the sensor coordinate system xyz. The calculated tilt angles are designated as λx, λy, and λz. The tilt angle calculator 22 then outputs the calculated tilt angles to the acceleration matrix calculator 24.
The acceleration matrix calculator 24 calculates the sensor coordinate system when viewed in the reference coordinate system using the tilt angle that was input, and outputs the result to the matrix posture angle calculator 26.
Similar to the matrix posture angle calculator 16, the matrix posture angle calculator 26 then calculates the posture angle from the matrix that was input and outputs the calculated posture angle as the acceleration posture angle SGA to the low pass filter 28.
The low pass filter (i.e., acceleration system low pass filter) 28 is a filter in which the cutoff frequency and attenuation factor are set the same as they are in the low pass filter 18. The low pass filter 28 extracts a low range component from the acceleration posture angle SGA and outputs it to the differencer 30. The acceleration posture angle SGA includes a high range posture angle pseudo value in the high range component and a low range posture angle true value in the low range component. No drift from integration error occurs in the acceleration posture angle. Because the cutoff frequency and attenuation factor in the low pass filter 28 are set the same as they are in the low pass filter 18, the low range posture angle true value of the angular velocity system is the same as the low range posture angle true value of the acceleration system. The frequency characteristic of the angular velocity system is also the same as the frequency characteristic of the acceleration system. Thus, only the drift component is accurately output by subtraction calculation of both of the low range posture angle true values. When the responsiveness of the components corresponding to the posture angles produced by the angular velocity system and the acceleration system are known beforehand, however, the cutoff frequency and the attenuation factor of the low pass filter can be adjusted to match their characteristics. This method can be effective when the adaptive range is narrow but the movement characteristics are known beforehand.
As described above, (the low range posture angle true value plus the drift component) from the low pass filter 18, as well as (the low range posture angle true value) from the low pass filter 28 are input to the differencer 30. The differencer 30 then calculates the difference between the two and extracts the drift amount (i.e., drift amount=(low range posture angle true value+drift amount)−(low range posture angle true value)). The differencer 30 then outputs the drift amount obtained through the difference calculation to the subtracter 32.
The subtracter 32 calculates the difference between the angular velocity posture angle SYA that was input from the matrix posture angle calculator 16 and the drift amount that was input from the differencer 30, and then removes the drift amount included in the angular velocity posture angle SYA from the matrix posture angle calculator 16. As described above, the angular velocity posture angle SYA from the matrix posture angle calculator 16 includes the posture angle true value (high range component+low range component) and the drift amount. The subtracter 32 then extracts the low range posture angle true value through subtraction (i.e., low range posture angle true value=(low range posture angle true value+drift amount)−(drift amount)). The subtracter 32 then outputs the posture angle true value that was obtained through subtraction to the output device 34. The subtracter 32 also Outputs the posture angle true value to the posture angle matrix calculator 36.
The posture angle matrix calculator 36 calculates a posture angle matrix from the posture angle that was input and feeds it back to the matrix adding calculator 14. The posture angle matrix calculator 36 then performs an inverse operation of the matrix posture angle calculator 16 and creates a posture angle matrix from the posture angle. The matrix adding calculator 14 then performs an integral calculation by adding the posture angle matrix that was fed back to the small angle matrix that was calculated based on an angular velocity that was newly detected by the angular velocity sensor 10, and then calculates the posture angle from the angular velocity.
The output device 34 outputs the posture angle from which the drift amount has been removed by the subtracter 32 to an external component. In the case of a robot, a main processor (or host processor) inputs the posture angle and the like detected by the sensor unit and performs feedback control on the posture of the robot. The output device 34 outputs the posture angle at a predetermined timing to the main processor in response to a command from the main processor. The angular velocity detected by the angular velocity sensor 10 or the acceleration detected by the acceleration sensor may be supplied to the output device 34, and the output device 34 may output the angular velocity or the acceleration, in addition to the posture angle, to the main processor. Which of those is to be output is determined either by a command from the main processor or set parameters. The output device 34 outputs all of the angular velocity, the acceleration, and the posture angle at a given timing to the main processor, and selectively outputs one of those at another timing.
As described above, an accurate posture angle from which the drift amount has been removed is thus detected and output. Because the drift amount is extracted based on the acceleration in the direction of each axis detected by the acceleration sensor 20, that drift amount then removed from the angular velocity posture angle and the result fed back, there is no need for the angular velocity sensor 10 to be an expensive, heavy and extremely accurate sensor.
Meanwhile, when the matrix posture angle calculators 16 and 26 calculate the posture angle from the posture matrix, they perform that calculation using the function a tan 2. As a result, despite the fact that the original posture angle is continuously changing, the posture angle may not change continuously in the calculation. This is discontinuity in the posture angle expression. Therefore, the posture angles from the matrix posture angle calculators 16 and 26 are used as they are without the low range component being extracted by the low pass filters. Instead, the low range components are extracted after conversion to a continuous posture angle.
The sin-cos converters 18a, 18b, and 18c perform sin and cos conversions on the posture angles of each of the three axes and output the results. For example, if the angular velocity posture angles are S1ψ, S1θ, and S1φ, the sin-cos converter 18a calculates the sin (S1ψ) and cos (S1ψ) for the S1ψ and outputs the result. The sin and cos converted values are then output to the low pass filters 18d and 18e, respectively. The low pass filters 18d and 18e then extract the low range components from the sin and cos converted values and output the results to an a tan 2 calculator 18j. The a tan 2 calculator 18j calculates an a tan 2 using the sin and cos converted values and outputs the result as a posture angle S2ψ. Also, the sin-cos converter 18b calculates the sin (S1θ) and cos (S1θ) for the S1θ and outputs the result. The sin and cos converted values are then output to the low pass filters 18f and 18g, respectively. The low pass filters 18f and 18g then extract low range components from the sin and cos converted values and output the results to an a tan calculator 18k. The a tan calculator 18k then calculates an a tan using the sin and cos converted values and outputs the result as a posture angle S2θ. Moreover, the sin-cos converter 18c calculates the sin (S1φ) and the cos (S1φ) for the S1φ and outputs the result. The sin and cos converted values are output to the low pass filters 18h and 18i, respectively. The low pass filters 18h and 18i then extract the low range components from the sin and cos converted values and output the result to an a tan 2 calculator 18m. The a tan 2 calculator 18m calculates an a tan 2 using the sin and cos converted values and outputs the result as a posture angle S2φ.
Combining the sin-cos conversion and the a tan 2 calculation or a tan calculation in this way makes it possible to eliminate poor operation of the low pass filters due to discontinuity in the posture angle, and thus stably extract the low range components. The values after the sin and cos conversions change continuously and smoothly within a range of ±1 so no dispersion or abnormal values are produced in the filter process. By performing the a tan 2 calculation process using the sin and cos converted values after the filter process, the values are reconverted to posture angle components so the filter process of the posture angle components can be realized without the values exceeding the posture angle expression range.
Continuing on, a sixteenth exemplary embodiment will be described.
Continuing on, a seventeenth exemplary embodiment will be described.
Also, in this exemplary embodiment, a differencer 31 is provided instead of the differencer 30. This differencer 31 includes a sin-cos converter and an a tan 2 calculator or an a tan calculator, just like the low pass filters 18 and 28.
A sin-cos converter 31a performs sin and cos conversions on the ξn0ψ and outputs the respective values to an a tan 2 calculator 31g. The a tan 2 calculator 31g performs an a tan 2 calculation using the sin and cos converted values and outputs the result to a differencer 31n. Meanwhile, a sin-cos converter 31b performs sin and cos conversions on the ξm0ψ and outputs the respective values to an a tan 2 calculator 31h. The a tan 2 calculator 31h performs an a tan 2 calculation using the sin and cos converted values and outputs the result to the differencer 31n. The differencer 31n calculates the difference between the two and extracts the drift amount, which it then outputs to a sin-cos converter 31r. The sin-cos converter 31r and an a tan 2 calculator 31u perform the same calculation and output ξd1ψ as the drift amount. A sin-cos converter 31c performs sin and cos conversions on the ξn0θ and outputs the respective values to an a tan calculator 31i. The a tan calculator 31i performs an a tan calculation using the sin and cos converted values and outputs the result to a differencer 31p. Meanwhile, a sin-cos converter 31d performs sin and cos conversions on the ξm0θ and outputs the respective values to an a tan calculator 31j. The a tan calculator 31j performs an a tan calculation using the sin and cos converted values and outputs the result to the differencer 31p. The differencer 31p calculates the difference between the two and extracts a drift amount, which it outputs to a sin-cos converter 31s. The sin-cos converter 31s and an a tan calculator 31v perform the same operation and output ξd1θ as the drift amount. A sin-cos converter 31e performs sin and cos conversions on the ξn0φ and outputs the respective values to an a tan 2 calculator 31k. The a tan 2 calculator 31k performs an a tan 2 calculation using the sin and cos converted values and outputs the result to a differencer 31q. Meanwhile, a sin-cos converter 31f performs sin and cos conversions on the ξm0φ and outputs the respective values to an a tan 2 calculator 31m. The a tan 2 calculator 31m performs an a tan 2 calculation using the sin and cos converted values and outputs the result to the differencer 31q. The differencer 31q calculates the difference between the two and extracts the drift amount. The differencer 31q then outputs the drift amount to a sin-cos converter 31t. The sin-cos converter 31t and an a tan 2 calculator 31w perform the same operation and output ξd1φ as the drift amount.
In this way an abnormal calculation due to discontinuity in the angular velocity posture angle and the acceleration posture angle is prevented from occurring. Also, an abnormal calculation due to discontinuity in the posture angle when the posture angle difference is calculated is prevented from occurring. Moreover, discontinuity in the posture angle of the drift amount is also eliminated so poor operation of MD control can be prevented.
ξd1p=P×ξd1
ξd1i=I×ξd1
ξd1d=D×ξd1
and then added together to obtain ξs0 (i.e., ξs0=ξd1p+ξd1i+ξd1d) (S104 and S105).
Then, the difference between the angular velocity posture angle ξn1 and ξs0 may be calculated. However, the posture angles are defined with ψ and φ being values between ξm=−π and ξp=+π, and θ being a value between ξm=−π/2 and ξp=+π/2 so control becomes unstable with ψ and φ if the value of ξs0 exceeds a value between −π and +π. Therefore, if ξs0 exceeds this range, it is necessary to replace it with the closest value within that range. Thus, it is first determined whether ξs0 is less than ξm=−π (S106). If ξs0 is less than ξm=−π, then ξs0 is replaced with ξm=−π and made ξs1 (S108). Also, if ξs0 is greater than ξp=π (S107), then ξs0 is replaced with ξp=π and made ξs1 (S109). No problems arise when ξs0 is between ξm=−π and ξp=π so that value is made ξs1 and the difference between it and is calculated (S111). On the other hand, control becomes unstable with θ if the value of ξs0 exceeds a value between ξm=−π/2 and ξp=π/2. Therefore, if ξs0 exceeds this range, it is necessary to replace it with the closest value within that range. Thus, it is first determined whether ξs0 is less than ξm−−π/2 (S106). If ξs0 is less than ξm=−π/2, then ξs0 is replaced with ξm=−π/2+δ and made ξs1 (S108). Also, if ξs0 is greater than ξp=π/2 (S107), then ξs0 is replaced with ξp=π/2−δ and made ξs1 (S109). Here, δ is a real number and expresses the smallest effective number with the calculation. No problems arise when ξs0 is between ξm=−π/2 and ξp=π/2 so that value is made ξs1 and the difference between it and ξn1 is calculated (S111). However, when ξs0 becomes −π/2, it is made −π/2+δ and when ξs0 becomes π/2, it is made π/2−δ. The routine described above enables a stable posture angle to be output.
In this way, according to this exemplary embodiment, discontinuity in the parameters is eliminated by performing the sin, cos, and a tan 2 conversions (i.e., SCA conversion). A supplementary explanation of the discontinuity of the posture angles and the operation of the differences 31 is as follows.
Next, a discontinuity of the posture angles is explained. The posture angles are expressed by (ψ, θ, φ) using the ψ around the X axis, the θ around the Y axis, and the φ around the Z axis. The respective ranges are
−π<ψ≦π(rad) or −180<ψ≦180(deg)
−π/2<θ<π/2(rad) or −90<θ<90(deg)
−π<φ≦π(rad) or −180<φ≦180(deg)
Next, a SCA differencer is explained. The differencer 31 calculates the difference with respect to each component of the posture angles (ψ, θ, φ). For example, with respect to φ, let us say that in
ξnoφ itself may also exceed the defined range in one of the calculations in the process. Therefore, by expressing ξnoφ with sin and cos and calculating the a tan 2, ξnoφ is first made to fit within the ±180 deg range. ξmoφ is similarly normalized to within the defined range. Next, the differencer 31 performs the calculation of ξnoφ−ξmoφ. Depending on the state, the output of this differencer may exceed the defined range of the φ. Therefore, normalization is performed by fitting the output back into the defined range by the sin-cos-a tan 2 conversion. Of the posture angles ψ, θ, and φ, the defined region of ψ and φ is −π to π, which is the same as the output range of the a tan 2 processing so the a tan 2 calculation is performed. Meanwhile, the defined region of θ is −π/2 to π/2, which is half of the output range of the a tan 2 processing. Therefore, the a tan calculation is used with θ. The output range of a tan matches θ at −π/2 to π/2. a tan(y, x)=tan−1(x, y) is such that in the small x region, the denominator tan(y/x) is small so the error becomes large. Therefore, when x is small compared with y, cot−4(y, x) is used.
Although exemplary embodiments of the invention have heretofore been described, the invention is not limited to these exemplary embodiments. To the contrary, various modifications are possible.
For example, with the structure illustrated in
Also, with the structure in
Also, either an analog filter or a digital filter may be used as the low pass filter in
Moreover, in each of the structures, at least one of the posture angle, the angular velocity, and the acceleration is output from the output device 34 to the main processor of the robot. In addition, however, the posture matrix calculated by the matrix adding calculator 14, the posture matrix calculated by the acceleration matrix calculator 24, the drift amount calculated by the differencer 30, and the quaternions extracted by the quaternion LPFs 63 and 67 and the like may be output to the output device 34 and then output from the output device 34 to the main processor.
Also, the structures illustrated in
Exemplary embodiments of the invention have heretofore been described. The form of each of these exemplary embodiments displays the following unique effects. That is, according to the form using the posture angle, the output is a posture angle used in control and the like related to robots, vehicles, marine vessels, and aircraft. The posture angle itself is the object of control of a correction loop in the apparatus so a stable output appropriate for the actual phenomenon is able to be obtained. Also, when optimizing the control parameters in the apparatus by suitable measurements and control, the various parameters can be effectively optimized with good compatibility with the posture angle from the actual movement. Therefore, less time and work are required for optimization and characteristics suitable for application can be obtained.
Accordingly, this form is suitable for measurement and control that utilize the posture angle as the primary subject, and enables posture measurements and control of a vehicle or robot that was either not possible or insufficient in the past. Also, with the form that uses the posture matrix, the output is the posture angle used for measurement and control and the like relating to robots, vehicles, marine vessels, and aircraft. With internal calculations, the posture matrix is the object of a correction loop. Therefore, special processing to avoid particularities and the like is not performed in internal calculations, which makes it easier to understand. Further, the posture matrix itself can also be output to an external component. Accordingly, this form is suitable for measurement and control using a posture matrix. With a posture matrix, the number of elements is greater than the number of posture angles so there is a large amount of data. This unfortunately means that it takes time for communication and the data processing is troublesome and complicated. Despite this drawback, however, the large amount of data enables problems with particularities to be avoided, as well as enables compatibility with expanded, contracted, and modified coordinate systems, and thus offers a large degree of freedom. This form is easy to use when there is sufficient communication speed, sufficient calculation speed of measurements and control, and a large area for memory necessary to perform the calculations. Therefore, this form is particularly effective when there is a fast communication network and the form is applied to a high performance measurement/control processing system having a fast calculation speed, for example, in equipment to be used in space and high level measurement/control equipment such as nuclear energy plants and industrial equipment.
Moreover, with the form using a quaternion, the output is a posture angle used in measurements and control and the like related to robots, vehicles, marine vessels, and aircraft. With internal calculations, the quaternion is the object of a correction loop. Using the quaternion is beneficial in that it reduces the amount of data necessary for the calculations as well as reduces the number of calculation steps. Accordingly, this function can be realized using a processor having moderate calculation speed and little memory in an apparatus, thereby enabling costs to be reduced. However, because the quaternion is a representational method in which the behavior in real space is difficult to understand, it is used after being converted to a posture angle. Therefore, this is a form in which the characteristics for measurement and control are clear and is thus suitable for when there are a lot of similar movements. Accordingly, this form is suitable for measurements and control of small-sized industrial equipment, multipurpose robots, and mass-produced vehicles.
Number | Date | Country | Kind |
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2005-223507 | Aug 2005 | JP | national |
Filing Document | Filing Date | Country | Kind | 371c Date |
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PCT/IB2006/002084 | 8/1/2006 | WO | 00 | 1/31/2008 |