Non-existence of extremals for the Adimurthi-Druet inequality

Abstract

The Adimurthi-Druet [1] inequality is an improvement of the standard Moser-Trudinger inequality by adding a L2-type perturbation, quantified by α∈ [0,λ\1), where λ\1 is the first Dirichlet eigenvalue of on a smooth bounded domain. It is known [3,9,13,18] that this inequality admits extremal functions, when the perturbation parameter α is small. By contrast, we prove here that the Adimurthi-Druet inequality does not admit any extremal, when the perturbation parameter α approaches λ\1. Our result is based on sharp expansions of the Dirichlet energy for blowing sequences of solutions of the corresponding Euler-Lagrange equation, which take into account the fact that the problem becomes singular as α λ\1.