Existence results for mean field equations with turbulence

Abstract

In this paper we consider the following form of the so-called Mean field equation arising from the statistical mechanics description of two dimensional turbulence equationeq:study - g u = 1 (eu∫ eu dVg-1)-2 (e-u∫ e-u dVg - 1) equation on a given closed orientable Riemannian surface (, g) with volume 1, where 1, 2 are real parameters. Exploiting the variational structure of the problem and running a min-max scheme introduced by Djadli and Malchiodi, we prove that if k is a positive integer, 1 and 2 two real numbers such that 1∈ (8kπ, 8(k+1)π) and 2<4π then eq:study is solvable.