Compactness properties and ground states for the affine Laplacian

Abstract

The paper studies compactness properties of the affine Sobolev inequality of Gaoyong Zhang et al in the case p=2, and existence and regularity of related minimizers, in particular, solutions to the nonlocal Dirichlet problems \[ -Σi,j=1N(A-1[u])ij∂2u∂ xi∂ xj=f in ⊂ RN, \] and \[ -Σi,j=1N(A-1[u])ij∂2u∂ xi∂ xj=uq-1\,, u>0, in ⊂ RN, \] where Aij[u]=∫∂ u∂ xi∂ u∂ xjdx and q∈(2,2NN-2).