No Periodic normal Geodesics in Jk(R,Rn)
Abstract
The space of k-jets of n real function of one real variable x admits the structure of a Carnot group, which then has an associated Hamiltonian geodesic flow. As in any Hamiltonian flow, a natural question is the existence of periodic solutions. Does the space of k-jets have periodic geodesics? This study will demonstrate the integrability of subRiemannian geodesic flow, characterize and classify the subRiemannian geodesics in the space of k-jets, and show that they are never periodic.
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