Abstract
Controllability properties of analytic affine control systems ∑ with an arbitrary number of controls and no a priori bounds are studied, without any restriction on the dimension of the Lie algebra T' generated by the input vector fields. Sufficient conditions for local controllability at a point are presented, involving the Lie brackets at that point, and global controllability results for codimension one systems are derived from the geometric properties of the set where a necessary condition is verified. A sufficient condition for local controllability along a reference trajectory of scalar input systems is also presented.
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