A Trudinger-Moser inequality with mean value zero on a compact Riemann surface with boundary

Abstract

In this paper, on a compact Riemann surface (, g) with smooth boundary ∂, we concern a Trudinger-Moser inequality with mean value zero. To be exact, let λ1() denotes the first eigenvalue of the Laplace-Beltrami operator with respect to the zero mean value condition and S = \ u ∈ W1,2 (, g) : \|∇g u\|22 ≤ 1. and .∫ u \,dvg = 0 \, where W1,2(, g) is the usual Sobolev space, \|·\|2 denotes the standard L2-norm and ∇g represent the gradient. By the method of blow-up analysis, we obtain eqnarray* u ∈ S ∫ e 2π u2 (1+α\|u\|22) d vg <+∞, \ ∀ \ 0 ≤α<λ1(); eqnarray* when α ≥λ1(), the supremum is infinite. Moreover, we prove the supremum is attained by a function uα ∈ C∞() S for sufficiently small α> 0. Based on the similar work in the Euclidean space, which was accomplished by Lu-Yang Lu-Yang, we strengthen the result of Yang Yang2006IJM.