Chang-Shou Lin, Zhaohu Nie, Juncheng Wei
Published 2016-10-11Version 1
This paper establishes certain existence and classification results for solutions to $SU(n)$ Toda systems with three singular sources at 0, 1, and $\infty$. First, we determine the necessary conditions for such an $SU(n)$ Toda system to be related to an $n$th order hypergeometric equation. Then, we construct solutions for $SU(n)$ Toda systems that satisfy the necessary conditions and also the interlacing conditions from Beukers and Heckman. Finally, for $SU(3)$ Toda systems satisfying the necessary conditions, we classify, under a natural reality assumption, that all the solutions are related to hypergeometric equations. This proof uses the Pohozaev identity.
Classification of solutions to general Toda systems with singular sources
Classification of solutions to Toda systems of types $C$ and $B$ with singular sources
Necessary conditions for blow-up solutions to the restricted Euler--Poisson equations
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