On the construction of non-simple blow-up solutions for the singular Liouville equation with a potential

Abstract

We are concerned with the existence of blowing-up solutions to the following boundary value problem - u= λ V(x) eu-4π N δ0\; in B1, u=0 \; on ∂ B1, where B1 is the unit ball in R2 centered at the origin, V(x) is a positive smooth potential, N is a positive integer (N≥ 1). Here δ0 defines the Dirac measure with pole at 0, and λ>0 is a small parameter. We assume that N=1 and, under some suitable assumptions on the derivatives of the potential V at 0, we find a solution which exhibits a non-simple blow-up profile as λ 0+.