Track algorithm: Difference between revisions

Latest revision as of 03:43, 19 July 2013

The flat pseudospectral method is part of the family of the Ross–Fahroo pseudospectral methods introduced by Ross and Fahroo.^[1] ^[2] The method combines the concept of differential flatness^[3] ^[4] with pseudospectral method to generate outputs in the so-called flat space.

Concept

Because the differentiation matrix, $D$ , in a pseudospectral method is square, higher-order derivatives of any polynomial, $y$ , can be obtained by powers of $D$ ,

\begin{aligned} \dot{y} & = D Y \\ \ddot{y} & = D^{2} Y \\ ⋮ \\ y^{(β)} & = D^{β} Y \end{aligned}

where $Y$ is the pseudospectral variable and $β$ is a finite positive integer. By differential flatness, there exists functions $a$ and $b$ such that the state and control variables can be written as,

\begin{aligned} x & = a (y, \dot{y}, \dots, y^{(β)}) \\ u & = b (y, \dot{y}, \dots, y^{(β + 1)}) \end{aligned}

The combination of these concepts generates the flat pseudospectral method; that is, x and u are written as,

x = a (Y, D Y, \dots, D^{β} Y)

u = b (Y, D Y, \dots, D^{β + 1} Y)

Thus, an optimal control problem can be quickly and easiy transformed to a problem with just the Y pseudospectral variable.^[1]

References

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↑ ^1.0 ^1.1 Ross, I. M. and Fahroo, F., “Pseudospectral Methods for the Optimal Motion Planning of Differentially Flat Systems,” IEEE Transactions on Automatic Control, Vol.49, No.8, pp. 1410–1413, August 2004.
↑ Ross, I. M. and Fahroo, F., “A Unified Framework for Real-Time Optimal Control,” Proceedings of the IEEE Conference on Decision and Control, Maui, HI, December, 2003.
↑ Fliess, M., Lévine, J., Martin, Ph., and Rouchon, P., “Flatness and defect of nonlinear systems: Introductory theory and examples,” International Journal of Control, vol. 61, no. 6, pp. 1327–1361, 1995.
↑ Rathinam, M. and Murray, R. M., “Configuration flatness of Lagrangian systems underactuated by one control” SIAM Journal on Control and Optimization, 36, 164,1998.

[rf-tac-1] 1.0 ^1.1 Ross, I. M. and Fahroo, F., “Pseudospectral Methods for the Optimal Motion Planning of Differentially Flat Systems,” IEEE Transactions on Automatic Control, Vol.49, No.8, pp. 1410–1413, August 2004.

[rf-cdc-2003-2] Ross, I. M. and Fahroo, F., “A Unified Framework for Real-Time Optimal Control,” Proceedings of the IEEE Conference on Decision and Control, Maui, HI, December, 2003.

[fliess-95-3] Fliess, M., Lévine, J., Martin, Ph., and Rouchon, P., “Flatness and defect of nonlinear systems: Introductory theory and examples,” International Journal of Control, vol. 61, no. 6, pp. 1327–1361, 1995.

[RMM-siam98-4] Rathinam, M. and Murray, R. M., “Configuration flatness of Lagrangian systems underactuated by one control” SIAM Journal on Control and Optimization, 36, 164,1998.

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+The '''flat pseudospectral method''' is part of the family of the [[Ross–Fahroo pseudospectral method]]s introduced by [[I. Michael Ross|Ross]] and [[Fariba Fahroo|Fahroo]].<ref name ="rf-tac"> Ross, I. M. and Fahroo, F., “Pseudospectral Methods for the Optimal Motion Planning of Differentially Flat Systems,” IEEE Transactions on Automatic Control, Vol.49, No.8, pp. 1410–1413, August 2004.</ref> <ref name="rf-cdc-2003"> Ross, I. M. and Fahroo, F., “A Unified Framework for Real-Time Optimal Control,” Proceedings of the IEEE Conference on Decision and Control, Maui, HI, December, 2003.</ref>  The method combines the concept of [[Flatness (systems theory)|differential flatness]]<ref name="fliess-95"> Fliess, M., Lévine, J.,  Martin, Ph., and Rouchon, P., “Flatness and defect of nonlinear systems: Introductory theory and examples,” International Journal of  Control, vol. 61, no. 6, pp. 1327–1361, 1995. </ref> <ref name="RMM-siam98"> Rathinam, M. and Murray, R. M., “Configuration flatness of Lagrangian systems underactuated by one control” SIAM Journal on Control and Optimization, 36, 164,1998. </ref>  with [[pseudospectral method]]  to generate outputs in the so-called flat space.
+==Concept==
+Because the differentiation matrix, <math>D </math>, in a pseudospectral method is square, higher-order derivatives of any polynomial, <math> y </math>, can be obtained by powers of <math>D </math>,
+: <math>
+\begin{align}
+\dot y &= D Y \\
+\ddot y & = D^2 Y \\
+&{} \  \vdots \\
+y^{(\beta)} &= D^\beta Y
+\end{align}</math>
+where <math> Y </math> is the pseudospectral variable and <math> \beta </math> is a finite positive integer.
+By differential flatness, there exists functions <math> a </math>  and <math> b </math> such that the state and control variables can be written as,
+: <math>
+\begin{align}
+x & = a(y, \dot y, \ldots, y^{(\beta)}) \\
+u & = b(y, \dot y, \ldots, y^{(\beta + 1)})
+\end{align}
+</math>
+The combination of these concepts generates the flat pseudospectral method; that is, x and u are written as,
+:<math> x = a(Y, D Y, \ldots, D^\beta Y) </math>
+:<math> u = b(Y, D Y, \ldots, D^{\beta + 1}Y) </math>
+Thus, an optimal control problem can be quickly and easiy transformed to a problem with just the Y pseudospectral variable.<ref name = "rf-tac" />
+==See also==
+*[[Ross' π lemma]]
+*[[Ross–Fahroo lemma]]
+*[[Bellman pseudospectral method]]
+*[http://www.cds.caltech.edu/~murray/wiki/index.php/EECI08:_Trajectory_Generation_and_Differential_Flatness Trajectory generation and differential flatness]
+==References==
+{{Reflist}}
+{{DEFAULTSORT:Pseudospectral Optimal Control}}
+[[Category:Optimal control]]
+[[Category:Numerical analysis]]
+[[Category:Control theory]]

Track algorithm: Difference between revisions

Latest revision as of 03:43, 19 July 2013

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