English

Convergence and the Length Spectrum

Metric Geometry 2009-09-29 v1 Spectral Theory

Abstract

The author defines and analyzes the 1/k1/k length spectra, L1/k(M)L_{1/k}(M), whose union, over all k\NNk\in \NN is the classical length spectrum. These new length spectra are shown to converge in the sense that limiL1/k(Mi){0}L1/k(M)\lim_{i\to\infty} L_{1/k}(M_i) \subset \{0\}\cup L_{1/k}(M) as MiMM_i\to M in the Gromov-Hausdorff sense. Energy methods are introduced to estimate the shortest element of L1/kL_{1/k}, as well as a concept called the minimizing index which may be used to estimate the length of the shortest closed geodesic of a simply connected manifold in any dimension. A number of gap theorems are proven, including one for manifolds, MnM^n, with Ricci(n1)Ricci\ge (n-1) and volume close to Vol(Sn)Vol(S^n). Many results in this paper hold on compact length spaces in addition to Riemannian manifolds.

Keywords

Cite

@article{arxiv.math/0602314,
  title  = {Convergence and the Length Spectrum},
  author = {Christina Sormani},
  journal= {arXiv preprint arXiv:math/0602314},
  year   = {2009}
}

Comments

31 pages, 5 eps figures, open problems for graduate students