Existence results for Toda systems with sign-changing prescribed functions: Part I
Abstract
Let (M,g) be a compact Riemann surface with area 1, we shall study the Toda system cases - u1 = 21(h1eu1-1) - 2(h2eu2-1),\\ - u2 = 22(h2eu2-1) - 1(h1eu1-1), cases on (M,g) with 1=4π, 2∈(0,4π), h1 and h2 are two smooth functions on M. In Jost-Lin-Wang's celebrated article (Comm. Pure Appl. Math., 59 (2006), no. 4, 526--558), they obtained a sufficient condition for the existence of this Toda system when h1 and h2 are both positive. In this paper, we shall improve this result to the case h1 and h2 can change signs. We shall pursue a variational method and use the standard blowup analysis. Among other things, the main contribution in our proof is to show the blowup can only happen at one point where h1 is positive.
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