Construction of blowup solutions for Liouville systems
Abstract
We study the following Liouville system defined on a flat torus equation \ arraylr - ui=Σj=1n aijj(hj euj∫ hj euj-1), \\ uj∈ Hper1() for i∈ I=\1,·s,n\, array . equation where hj∈ C3(), hj>0, j>0 and u=(u1,..,un) is doubly periodic on ∂. The matrix A=(aij)n× n satisfies certain properties. One central problem about Liouville systems is whether multi-bubble solutions do exist. In this work we present a comprehensive construction of multi-bubble solutions in the most general setting.
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