Existence results for a generalized mean field equation on a closed Riemann surface
Abstract
Let be a closed Riemann surface, h a positive smooth function on , and α real numbers. In this paper, we study a generalized mean field equation align* - u=(heu∫ heu-1Area())+α(u-u), align* where denotes the Laplace-Beltrami operator. We first derive a uniform bound for solutions when ∈ (8kπ, 8(k+1)π) for some non-negative integer number k∈ N and α(-)0. Then we obtain existence results for α<λ1() by using the Leray-Schauder degree theory and the minimax method, where λ1() is the first positive eigenvalue for -.
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