Quadratic obstructions to small-time local controllability for multi-input systems
Abstract
We present a necessary condition for the small-time local controllability of multi-input control-affine systems on Rd . This condition is formulated on the vectors of Rd resulting from the evaluation at zero of the Lie brackets of the vector fields: it involves both their direction and their amplitude. The proof is an adaptation to the multi-input case of a general method introduced by Beauchard and Marbach in the single-input case. It relies on a Magnus-type representation formula: the state is approximated by a linear combination of the evaluation at zero of the Lie brackets of the vector fields, whose coefficients are functionals of the time and the controls. Finally, obstructions to small-time local controllability result from interpolation inequalities.
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