A Local Method for Compact and Non-compact Yamabe Problems

TL;DR

This paper introduces a new local method to solve the Yamabe problem on certain compact and non-compact manifolds, especially in challenging cases with positive Yamabe constants, extending previous nonlinear eigenvalue approaches.

Contribution

The paper presents a novel local approach for the Yamabe problem applicable to higher-dimensional, non-locally conformally flat manifolds, including difficult positive Yamabe constant cases.

Findings

Successfully solves the Yamabe problem in new settings

Extends Brezis-Nirenberg's eigenvalue problem to manifold subsets

Applicable to both compact and non-compact manifolds

Abstract

Let $ (M, g) $ be a compact manifold or a complete non-compact manifold without boundary, $ \dim M \geqslant 4 $, and not locally conformally flat. In this article, we introduce a new local method to resolve the Yamabe problem on compact manifold for dimensions at least $ 4 $, and the Yamabe problem on non-compact complete manifolds without boundary, which are pointwise conformal to subsets of some compact manifolds. In particular, the new local method applies to the hard cases--the Yamabe constants are positive. Our local method also generalizes Brezis and Nirenberg's nonlinear eigenvalue problem to subsets of manifolds.