John-Nirenberg Radius and Collapse in Conformal Geometry

Abstract

Given a positive function u∈ W1,n, we define its John-Nirenberg radius at point x to be the supreme of the radius such that ∫Bt|∇ u|n<ε0n when n>2, and ∫Bt|∇ u|2<ε02 when n=2. We will show that for a collapsing sequence in a fixed conformal class under some curvature conditions, the radius is bounded below by a positive constant. As applications, we will study the convergence of a conformal metric sequence on a 4-manifold with bounded \|K\|W1,2, and prove a generalized H\'elein's Convergence Theorem.