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Subriemannian geometry on rank 2 Carnot groups Yu. L. Sachkov |
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Abstract: We study nilpotent left-invariant sub-Riemannian structures with the growth vectors (2,3,4), (2,3,5), and (2,3,5,8). For the growth vector (2,3,4), i.e., for the left-invariant SR structure on the Engel group, we prove the cut time is equal to the first Maxwell time corresponding to discrete symmetries (reflections) of the exponential mapping. For the growth vector (2,3,5), i.e., for the left-invariant SR structure on the Cartan group, the same fact is a conjecture supported by mathematical and numerical evidence. For the growth vector (2,3,5,8), we study integrability of the normal Hamiltonian vector field |