Classification of Radial Solutions to Liouville Systems with Singularities
Abstract
Let A=(aij)n× n be a nonnegative, symmetric, irreducible and invertible matrix. We prove the existence and uniqueness of radial solutions to the following Liouville system with singularity: \arrayll ui+Σj=1n aij|x|βjeuj(x)=0, R2, i=1,...,n ∫ R2|x|βieui(x)dx<∞, i=1,...,n array. where β1,...,βn are constants greater than -2. If all βis are negative we prove that all solutions are radial and the linearized system is non-degenerate.
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