Euclidean Domains with Nearly Maximal Yamabe Quotient

Abstract

Let be a smooth, bounded domain in R3 with connected boundary. It follows from work of Escobar that the Yamabe quotient of is at most the Yamabe quotient of a ball, and equality holds if and only if is a ball. We show that if equality almost holds then the following things are true: (i) is diffeomorphic to a ball; (ii) There is a small number ε > 0 such that B(x,r) ⊂ ⊂ B(x,r(1+ε)); (iii) After suitable scaling, is Gromov-Hausdorff close to the unit ball when considered as a metric space with its induced length metric. We also give a qualitative comparison between Q and the coefficient of quasi-conformality studied in the theory of quasi-conformal maps.