N-Laplacian problems with critical Trudinger-Moser nonlinearities

Abstract

We prove existence and multiplicity results for a N-Laplacian problem with a critical exponential nonlinearity that is a natural analog of the Brezis-Nirenberg problem for the borderline case of the Sobolev inequality. This extends results in the literature for the semilinear case N = 2 to all N 2. When N > 2 the nonlinear operator - N has no linear eigenspaces and hence this extension requires new abstract critical point theorems that are not based on linear subspaces. We prove new abstract results based on the Z2-cohomological index and a related pseudo-index that are applicable here.