Orbit (control theory)

The notion of orbit of a control system used in mathematical control theory is a particular case of the notion of orbit in group theory.

Definition

Let ${\ }{\dot {q}}=f(q,u)$ be a $\ {\mathcal {C}}^{\infty }$ control system, where ${\ q}$ belongs to a finite-dimensional manifold $\ M$ and $\ u$ belongs to a control set $\ U$ . Consider the family ${\mathcal {F}}=\{f(\cdot ,u)\mid u\in U\}$ and assume that every vector field in ${\mathcal {F}}$ is complete. For every $f\in {\mathcal {F}}$ and every real $\ t$ , denote by $\ e^{tf}$ the flow of $\ f$ at time $\ t$ .

The orbit of the control system ${\ }{\dot {q}}=f(q,u)$ through a point $q_{0}\in M$ is the subset ${\mathcal {O}}_{q_{0}}$ of $\ M$ defined by

{\mathcal {O}}_{q_{0}}=\{e^{t_{k}f_{k}}\circ e^{t_{k-1}f_{k-1}}\circ \cdots \circ e^{t_{1}f_{1}}(q_{0})\mid k\in \mathbb {N} ,\ t_{1},\dots ,t_{k}\in \mathbb {R} ,\ f_{1},\dots ,f_{k}\in {\mathcal {F}}\}.

Remarks

The difference between orbits and attainable sets is that, whereas for attainable sets only forward-in-time motions are allowed, both forward and backward motions are permitted for orbits. In particular, if the family ${\mathcal {F}}$ is symmetric (i.e., $f\in {\mathcal {F}}$ if and only if $-f\in {\mathcal {F}}$ ), then orbits and attainable sets coincide.

The hypothesis that every vector field of ${\mathcal {F}}$ is complete simplifies the notations but can be dropped. In this case one has to replace flows of vector fields by local versions of them.

Orbit theorem (Nagano–Sussmann)

Each orbit ${\mathcal {O}}_{q_{0}}$ is an immersed submanifold of $\ M$ .

The tangent space to the orbit ${\mathcal {O}}_{q_{0}}$ at a point $\ q$ is the linear subspace of $\ T_{q}M$ spanned by the vectors $\ P_{*}f(q)$ where $\ P_{*}f$ denotes the pushforward of $\ f$ by $\ P$ , $\ f$ belongs to ${\mathcal {F}}$ and $\ P$ is a diffeomorphism of $\ M$ of the form $e^{t_{k}f_{k}}\circ \cdots \circ e^{t_{1}f_{1}}$ with $k\in \mathbb {N} ,\ t_{1},\dots ,t_{k}\in \mathbb {R}$ and $f_{1},\dots ,f_{k}\in {\mathcal {F}}$ .

If all the vector fields of the family ${\mathcal {F}}$ are analytic, then $\ T_{q}{\mathcal {O}}_{q_{0}}=\mathrm {Lie} _{q}\,{\mathcal {F}}$ where $\mathrm {Lie} _{q}\,{\mathcal {F}}$ is the evaluation at $\ q$ of the Lie algebra generated by ${\mathcal {F}}$ with respect to the Lie bracket of vector fields. Otherwise, the inclusion $\mathrm {Lie} _{q}\,{\mathcal {F}}\subset T_{q}{\mathcal {O}}_{q_{0}}$ holds true.

Corollary (Rashevsky–Chow theorem)

Main article: Chow–Rashevskii theorem

If $\mathrm {Lie} _{q}\,{\mathcal {F}}=T_{q}M$ for every $\ q\in M$ and if $\ M$ is connected, then each orbit is equal to the whole manifold $\ M$ .

References

Jurdjevic, Velimir (1997). Geometric control theory. Cambridge University Press. pp. xviii+492. ISBN 0-521-49502-4.
Sussmann, Héctor J.; Jurdjevic, Velimir (1972). "Controllability of nonlinear systems". J. Differential Equations. 12 (1): 95–116. Bibcode:1972JDE....12...95S. doi:10.1016/0022-0396(72)90007-1.
Sussmann, Héctor J. (1973). "Orbits of families of vector fields and integrability of distributions". Trans. Amer. Math. Soc. 180. American Mathematical Society: 171–188. doi:10.2307/1996660. JSTOR 1996660.

Misplaced Pages

Definition

Orbit theorem (Nagano–Sussmann)

Corollary (Rashevsky–Chow theorem)

See also

References

Further reading