Toward Best Isoperimetric Constants for (H1,BMO)-Normal Conformal Metrics on Rn, n 3

Abstract

The aim of this article is: (a) To establish the existence of the best isoperimetric constants for the (H1,BMO)-normal conformal metrics e2u|dx|2 on Rn, n 3, i.e., the conformal metrics with the Q-curvature orientated conditions (-)n/2u∈ H1( Rn) & \ u(x)=const.+∫ Rn(|·||x-·|)(-)n/2 u(·) dHn(·)2n-1πn/2(n/2); (b) To prove that (nωn1n)nn-1 is the optimal upper bound of the best isoperimetric constants for the complete (H1,BMO)-normal conformal metrics with nonnegative scalar curvature; (c) To find the optimal upper bound of the best isoperimetric constants via the quotients of two power integrals of Green's functions for the n-Laplacian operators -div(|∇ u|n-2∇ u).