English

First Dirichlet eigenvalue and exit time moment spectra comparisons

Differential Geometry 2021-10-08 v1

Abstract

We prove explicit upper and lower bounds for the Poisson hierarchy, the averaged L1L^1-moment spectra {Ak(BRM)vol(SRM)}k=1\{\dfrac{\mathcal{A}_k\left(B_R^M\right)}{\text{vol}\left(S_R^M\right)}\}_{k=1}^\infty, and the torsional rigidity A1(BRM)\mathcal{A}_1(B^M_R) of a geodesic ball BRMB^M_R in a Riemannian manifold MnM^n which satisfies that the mean curvatures of the geodesic spheres SrMS^M_r included in it, (up to the boundary SRMS^M_R), are controlled by the radial mean curvature of the geodesic spheres Srω(oω)S^\omega_r(o_\omega) with same radius centered at the center oωo_\omega of a rotationally symmetric model space MωnM^n_\omega. As a consecuence, we prove a first Dirichlet eigenvalue λ1(BRM)\lambda_1(B^M_R) comparison theorem and show that equality with the bound λ1(BRω(oω))\lambda_1(B^\omega_R(o_\omega)), (where Brω(oω)B^\omega_r(o_\omega) is the geodesic rr-ball in MωnM^n_\omega), characterizes the L1L^1-moment spectrum {Ak(BRM)}k=1\{\mathcal{A}_k(B^M_R)\}_{k=1}^\infty as the sequence {Ak(BRω)}k=1\{\mathcal{A}_k(B^\omega_R)\}_{k=1}^\infty and vice-versa.

Keywords

Cite

@article{arxiv.2110.03330,
  title  = {First Dirichlet eigenvalue and exit time moment spectra comparisons},
  author = {Vicente Palmer and Erik Sarrion-Pedralva},
  journal= {arXiv preprint arXiv:2110.03330},
  year   = {2021}
}

Comments

37 pages

R2 v1 2026-06-24T06:41:58.407Z