论文信息 - Hamiltonian point of view of non-Euclidean geometry and elliptic functions

Hamiltonian point of view of non-Euclidean geometry and elliptic functions

Abstract This paper offers a new way of looking at the classical geometries and the theory of elliptic functions through Hamiltonian systems on Lie groups. In particular, the paper shows that: (i) the classical models of non-Euclidean geometries are canonically induced by bi-invariant sub-Riemannian metrices on Lie groups which act by left-actions on the underlying space; (ii) there is a class of canonical variational problems on Lie groups G whose projections on homogeneous spaces G / K generalize Euler's elasticae and include all curves of constant curvature and all ∮-functions of Weierstrass; (iii) complex Lie groups unify non-Euclidean geometries and complex elasticae offer a distinctive look at the elliptic functions.

V. Jurdjevic | V. Jurdjevic

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