Critical mean field equations for equilibrium turbulence with sign-changing prescribed functions

Abstract

Let (M,g) be a compact Riemann surface with unit area. We investigate the mean field equation for equilibrium turbulence: align cases - u = 1(h1eu∫Mh1eudvg-1) - 2(h2e-u∫Mh2e-udvg-1), \\ ∫Mudvg=0, cases align where 1=8π and 2∈(0,8π] are parameters, and h1, h2 are smooth functions on M that are positive somewhere. By employing a refined Brezis-Merle type analysis, we establish sufficient conditions of Ding-Jost-Li-Wang type for the existence of solutions to this equation in critical cases, particularly when h1 and h2 may change signs. Our results extend Zhou's existence theorems (Nonlinear Anal. 69 (2008), no.~8, 2541--2552) for the case h1=h2 1.