A rigidity result of spectral gap on Finsler manifolds and its application
Abstract
We investigate the rigidity problem for the sharp spectral gap on Finsler manifolds of weighted Ricci curvature bound Ric∞ ≥ K > 0. Our main results show that if the equality holds, the manifold necessarily admits a diffeomorphic splitting (or isometric splitting in the particular class of Berwald spaces). This splitting phenomenon is comparable to the Cheeger-Gromoll type splitting theorem by Ohta. We also obtain the rigidity results of logarithmic Sobolev and Bakry-Ledoux isoperimetric inequalities via needle decomposition as corollaries.
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