Chaotic subRiemannian geodesic flow in J2(R2,R)
Abstract
The space of 2-jets of a real function of two real variables, denoted by J2(R2,R), admits the structure of a metabelian Carnot group, so J2(R2,R) has a normal abelian sub-group A. As any sub-Riemannian manifold, J2(R2,R) has an associated Hamiltonian geodesic flow. The Hamiltonian action of A on T*J2(R2,R) yields the reduced Hamiltonian Hμ on T*H T*(J2(R2,R)/A), where Hμ is a two-dimensional Euclidean space. The paper is devoted to proving that reduced Hamiltonian Hμ is non-integrable by meromorphic functions for some values of μ. This result suggests the sub-Riemannian geodesic flow on J2(R2,R) is not meromorphically integrable.
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