Classifying solutions of SU(n+1) Toda system around a singular source

Abstract

Consider a positive integer n and γ1>-1,·s,γn>-1. Let D=\z∈ C:|z|<1\, and let (aij)n× n denote the Cartan matrix of su(n+1). Utilizing the ordinary differential equation of (n+1)th order around a singular source of SU(n+1) Toda system, as discovered by Lin-Wei-Ye ( Invent Math, 190(1):169-207, 2012), we precisely characterize a solution (u1,·s, un) to the SU(n+1) Toda system equation* cases ∂2 ui∂ z∂ z+Σj=1n aij euj&=π γ iδ 0\,\, on\,\, D\\ -12\,∫D \0\ eui dz d z &< ∞ cases for all i=1,·s, n equation* using (n+1) holomorphic functions that satisfy the normalized condition. Additionally, we demonstrate that for each 1≤ i≤ n, 0 represents the cone singularity with angle 2π(1+γi) for the metric eui| dz|2 on D\0\, which can be locally characterized by (n-1) non-vanishing holomorphic functions at 0.