Existence and non-existence of maximizers for the Moser-Trudinger type inequalities under inhomogeneous constraints

Abstract

In this paper, we study the existence and non-existence of maximizers for the Moser-Trudinger type inequalities in RN of the form \[ DN,α(a,b):= u∈ W1,N( RN),\,\|∇ u\|LN( RN)a+\|u\|LN( RN)b=1 ∫ RNN(α|u|N')dx. \] Here N≥ 2, N'=NN-1, a,b>0, α ∈ (0,αN] and N(t):=et-Σj=0N-2tjj! where αN:= N ωN-11/(N-1) and ωN-1 denotes the surface area of the unit ball in RN. We show the existence of the threshold α = α(a,b,N) ∈ [0,αN] such that DN,α(a,b) is not attained if α ∈ (0,α) and is attained if α ∈ (α , αN). We also provide the conditions on (a,b) in order that the inequality α < αN holds.