Glueing a peak to a non-zero limiting profile for a critical Moser-Trudinger equation

Abstract

Druet [6] proved that if (fγ)γ is a sequence of Moser-Trudinger type nonlinearities with critical growth, and if (uγ)γ solves cases & u =fγ(x,u)\,,~~ u>0 in \,,\\ &u =0 on ∂\,, cases and converges weakly in H10 to some u∞, then the Dirichlet energy is quantified, namely there exists an integer N 0 such that the energy of uγ converges to 4π N plus the Dirichlet energy of u∞. As a crucial step to get the general existence results of [7], it was more recently proved in [8] that, for a specific class of nonlinearities, the loss of compactness (i.e. N>0) implies that u∞ 0. In contrast, we prove here that there exist sequences (fγ)γ of Moser-Trudinger type nonlinearities which admit a noncompact sequence of solutions (uγ)γ having a nontrivial weak limit.