Nonlinear flows and rigidity results on compact manifolds

TL;DR

This paper investigates rigidity phenomena for elliptic PDEs on compact manifolds, using nonlinear flows to identify conditions under which solutions are constant and to analyze the optimal constants in Sobolev-type inequalities.

Contribution

It introduces a nonlinear flow approach to establish new integral criteria for rigidity and optimality of constants in interpolation inequalities on general manifolds.

Findings

Rigidity results for elliptic PDEs on compact manifolds.

New integral criteria that improve existing pointwise conditions.

Analysis of the optimal constants in Sobolev-type inequalities.

Abstract

This paper is devoted to rigidity results for some elliptic PDEs and related interpolation inequalities of Sobolev type on smooth compact connected Riemannian manifolds without boundaries. Rigidity means that the PDE has no other solution than the constant one at least when a parameter is in a certain range. This parameter can be used as an estimate for the best constant in the corresponding interpolation inequality. Our approach relies in a nonlinear flow of porous medium / fast diffusion type which gives a clear-cut interpretation of technical choices of exponents done in earlier works. We also establish two integral criteria for rigidity that improve upon known, pointwise conditions, and hold for general manifolds without positivity conditions on the curvature. Using the flow, we are also able to discuss the optimality of the corresponding constant in the interpolation inequalities.