Existence results for Toda systems with sign-changing prescribed functions: Part II

Abstract

Let (M, g) be a compact Riemann surface with area 1. We investigate the Toda system align cases - u1 = 21(h1eu1-1) - 2(h2eu2-1),\\ - u2 = 22(h2eu2-1) - 1(h1eu1-1), cases align on (M, g) where 1, 2 ∈ (0,4π], and h1 and h2 are two smooth functions on M.When some i equals 4π, the Toda system becomes critical with respect to the Moser-Trudinger inequality for it, making the existence problem significantly more challenging. In their seminal article (Comm. Pure Appl. Math., 59 (2006), no. 4, 526--558), Jost, Lin, and Wang established sufficient conditions for the existence of solutions the Toda system when 1=4π, 2 ∈ (0,4π) or 1=2=4π, assuming that h1 and h2 are both positive. In our previous paper we extended these results to allow h1 and h2 to change signs in the case 1=4π, 2 ∈ (0,4π). In this paper we further extend the study to prove that Jost-Lin-Wang's sufficient conditions remain valid even when h1 and h2 can change signs and 1=2=4π. Our proof relies on an improved version of the Moser-Trudinger inequality for the Toda system, along with edicated analyses similar to Brezis-Merle type and the use of Pohozaev identities.

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