An improved Moser-Trudinger inequality involving the first non-zero Neumann eigenvalue with mean value zero in R2

Abstract

Let be a smooth bounded domain in R2 and λ N () the first non-zero Neumann eigenvalue of the operator - on . In this paper, for any γ ∈ [0, λ N () ), we establish the following improved Moser-Trudinger inequality \[ u ∫ e2π u2 dx < +∞ \] for arbitrary functions u in H1() satisfying ∫ u dx =0 and \|∇ u\|22 -α \|u\|22 ≤slant 1. Furthermore, this supremum is attained by some function u*∈ H1(). This strengthens the results of Chang and Yang (J. Differential Geom. 27 (1988) 259-296) and of Lu and Yang (Nonlinear Anal. 70 (2009) 2992-3001).