Classification and nondegeneracy of SU(n+1) Toda system with singular sources

Abstract

We consider the following Toda system ui + Σj = 1n aijeuj = 4πγiδ0 in R2, ∫ R2eui dx < ∞, ∀ 1≤ i ≤ n, where γi > -1, δ0 is Dirac measure at 0, and the coefficients aij form the standard tri-diagonal Cartan matrix. In this paper, (i) we completely classify the solutions and obtain the quantization result: Σj=1n aij∫2euj dx = 4π (2+γi+γn+1-i), \;\;∀\; 1≤ i ≤ n. This generalizes the classification result by Jost and Wang for γi=0, ∀ \;1≤ i≤ n. (ii) We prove that if γi+γi+1+...+γj Z for all 1≤ i≤ j≤ n, then any solution ui is radially symmetric w.r.t. 0. (iii) We prove that the linearized equation at any solution is non-degenerate. These are fundamental results in order to understand the bubbling behavior of the Toda system.