Existence and Nonexistence of Extremals for Trudinger-Moser inequalities with Lp type perturbation on any bounded planar domains

Abstract

In this study, we investigate the perturbed Trudinger-Moser inequalities as follows:\[ S(λ,p)=u∈ H01(),∇ u L2( ) ≤ 1∫( e4π u2-λ|u|p) dx, \] where 1≤ p<∞ and is a bounded domain in R2. Our results demonstrate that there exists a threshold λ(p)>0 such that S(λ,p) is attainable if λ<λ(p), but unattainable if λ>λ(p) when p∈[1,2]. For p>2, however, we show that S(λ,p) is always attainable for any λ∈ R. These results are achieved through a refined blow-up analysis, which allow us to establish a sharp Dirichlet energy expansion formula for sequences of solutions to the corresponding Euler-Lagrange equations. The asymmetric nature of our problem poses significant challenges to our analysis. To address these, we will establish an appropriate comparison principle between radial and non-radial solutions of the associated Euler-Lagrange equations. Our study establishes a complete characterization of how Lp-type perturbations influence the existence of extremals for critical Trudinger-Moser inequalities on any bounded planar domains, this extends the classical Brezis-Nirenberg problem framework to the two-dimensional settings.