Degree Counting Theorems for 2x2 non-symmetric singular Liouville Systems

Abstract

Let (M,g) be a compact Riemann surface with no boundary and u=(u1,u2) be a solution of the following singular Liouville system: g ui+Σj=12 aijj(hjeuj∫M hjeujdVg-1)=Σl=1N4πγl(δpl-1), where h1,h2 are positive smooth functions, p1,·s,pN are distinct points on M, δpl are Dirac masses, =(1,2)(i≥ 0) and (γ1,·s,γN)(γl > -1) are constant vectors. In the previous work, we derive a degree counting formula for the singular Liouville system when A satisfies standard assumptions. In this article, we establish a more general degree counting formula for 2×2 singular Liouville system when the coefficient matrix A is non-symmetric and non-invertible. Finally, the existence of solution can be proved by the degree counting formula which depends only on the topology of the domain and the location of .