Alekseevsky D. Shortest and straightest geodesics of an invariant sub-Riemanniasn metric on a flag manifold (abstract): Difference between revisions
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* According to Euler-Lagrange variational definition, geodesics are extremals of length functional or functional of kinetic energy that is shortest curves, joint two closed points. | * According to Euler-Lagrange variational definition, geodesics are extremals of length functional or functional of kinetic energy that is shortest curves, joint two closed points. | ||
* According to Hamilton approach, geodesics are projection to <math>M</math> of integral curves of the Hamiltoian flow on <math>(T^*M, \omega_{can})<math> with the quadratic Hamiltonian <math>H(p) = \frac12 g^{-1}(p,p),\, p \in T^*M<math>. | * According to Hamilton approach, geodesics are projection to <math>M</math> of integral curves of the Hamiltoian flow on <math>(T^*M, \omega_{can})</math> with the quadratic Hamiltonian <math>H(p) = \frac12 g^{-1}(p,p),\, p \in T^*M</math>. | ||
* According to Levi-Civita, geodesics are straightest curves, i.e. curves <math>\gamma(s)</math> whose tangent field <math>\dot{\gamma}(s)<math> is parallel with respect to Levi-Civita connection. | * According to Levi-Civita, geodesics are straightest curves, i.e. curves <math>\gamma(s)</math> whose tangent field <math>\dot{\gamma}(s)<math> is parallel with respect to Levi-Civita connection. | ||
Revision as of 14:22, 23 August 2018
Speaker: Dmitri Alekseevsky
Title: Shortest and straightest geodesics of an invariant sub-Riemanniasn metric on a flag manifold
Abstract:
There are different equivalent definitions of geodesics of a Riemannian manifold :
- According to Euler-Lagrange variational definition, geodesics are extremals of length functional or functional of kinetic energy that is shortest curves, joint two closed points.
- According to Hamilton approach, geodesics are projection to of integral curves of the Hamiltoian flow on with the quadratic Hamiltonian .
- According to Levi-Civita, geodesics are straightest curves, i.e. curves whose tangent field where is a sub-Riemannian metric, defined on a bracket generated distribution . However , as it was remarked by A.M.Vershik and L.D.Faddeev, variational definition of sub-Riemannian geodesics as "shortest" horisontal curves (used in control theory and many applications) is different from definition of geodesics as straightes curves , used in non-holonomic mechanics. Moreover, they proved that generically shortest geodesics are different from straightes geodesics and indicate examples when these to notions are equivalent.
We recall a Schouten-Wagner description of straightest sub-Riemannian geodesics as geodesics of a partial connection and definition of Wagner curvature tensor of such connection.
Then we classify invariant sub-Riemannian structures on flag manifolds (i.e. adjoint orbits of a compact simple Lie group ) and study relations between shortest and strainghest sub-Riemannian geodesics of such sub-Riemannian homogeneous manifold.
Event: Local and Nonlocal Geometry of PDEs and Integrability, 8-12 October 2018, SISSA, Trieste, Italy.
The conference in honor of Joseph Krasil'shchik's 70th birthday.