Blow-up phenomena for the Liouville equation with a singular source of integer multiplicity

Abstract

We are concerned with the existence of blowing-up solutions to the following boundary value problem - u= a(x) eu-4π N δ0\; in , u=0 \; on ∂ , where is a smooth and bounded domain in 2 such that 0∈, a(x) is a positive smooth function, N is a positive integer and >0 is a small parameter. Here δ0 defines the Dirac measure with pole at 0. We find conditions on the function a and on the domain under which there exists a solution u blowing up at 0 and satisfying ∫o a(x)eu 8π(N+1) as 0+.