Generalized existence of extremizers for the sharp $p$-Sobolev inequality on Riemannian manifolds with nonnegative curvature

TL;DR

This paper investigates the existence and behavior of extremizers for the sharp p-Sobolev inequality on noncompact Riemannian manifolds with nonnegative curvature, revealing their proximity to Euclidean bubbles or vanishing.

Contribution

It extends the analysis of extremizers for the p-Sobolev inequality to manifolds with nonnegative curvature using nonsmooth concentration compactness and Mosco-convergence techniques.

Findings

Almost extremal functions are close to Euclidean bubbles under Ricci curvature bounds.

Vanishing is the only behavior for extremizers under sectional curvature bounds.

Methods apply to all p in (1, ∞) using generalized Cheeger energy convergence.

Abstract

We study the generalized existence of extremizers for the sharp $p$-Sobolev inequality on noncompact Riemannian manifolds in connection with nonnegative curvature and Euclidean volume growth assumptions. Assuming a nonnegative Ricci curvature lower bound, we show that almost extremal functions are close in gradient norm to radial Euclidean bubbles. In the case of nonnegative sectional curvature lower bounds, we additionally deduce that vanishing is the only possible behavior, in the sense that almost extremal functions are almost zero globally. Our arguments rely on nonsmooth concentration compactness methods and Mosco-convergence results for the Cheeger energy on noncompact varying spaces, generalized to every exponent $p\in (1,\infty)$.