Your search keyword '"53-01, 53D25, 53D12, 53C22, 37J45"' showing total 2 results

1. Perturbed closed geodesics are periodic orbits: Index and Transversality

Author

Weber, Joa

Subjects

Mathematics - Symplectic Geometry, Mathematics - Differential Geometry, 53-01, 53D25, 53D12, 53C22, 37J45

Abstract

We study the classical action functional $\SMC_V$ on the free loop space of a closed, finite dimensional Riemannian manifold $M$ and the symplectic action $\AMC_V$ on the free loop space of its cotangent bundle. The critical points of both functionals can be identified with the set of perturbed closed geodesics in $M$. The potential $V\in C^\infty(M\times S^1,\R)$ serves as perturbation and we show that both functionals are Morse for generic $V$. In this case we prove that the Morse index of a critical point $x$ of $\SMC_V$ equals minus its Conley-Zehnder index when viewed as a critical point of $\AMC_V$ and if $x^*TM \to S^1$ is trivial. Otherwise a correction term +1 appears., Comment: 33 pages, 3 figures

Published

2001

2. Perturbed closed geodesics are periodic orbits: Index and Transversality

Author

Joa Weber

Subjects

Mathematics - Differential Geometry, Pure mathematics, Transversality, Geodesic, General Mathematics, Perturbation (astronomy), Riemannian manifold, Critical point (mathematics), Differential Geometry (math.DG), Mathematics - Symplectic Geometry, FOS: Mathematics, Cotangent bundle, Symplectic Geometry (math.SG), Free loop, 53-01, 53D25, 53D12, 53C22, 37J45, Mathematics::Symplectic Geometry, Mathematics, Symplectic geometry

Abstract

We study the classical action functional $\SMC_V$ on the free loop space of a closed, finite dimensional Riemannian manifold $M$ and the symplectic action $\AMC_V$ on the free loop space of its cotangent bundle. The critical points of both functionals can be identified with the set of perturbed closed geodesics in $M$. The potential $V\in C^\infty(M\times S^1,\R)$ serves as perturbation and we show that both functionals are Morse for generic $V$. In this case we prove that the Morse index of a critical point $x$ of $\SMC_V$ equals minus its Conley-Zehnder index when viewed as a critical point of $\AMC_V$ and if $x^*TM \to S^1$ is trivial. Otherwise a correction term +1 appears., Comment: 33 pages, 3 figures

Published

2001