Bubbling solutions for a planar exponential nonlinear elliptic equation with a singular source

Abstract

Let be a bounded domain in R2 with smooth boundary, we study the following elliptic Dirichlet problem cases -= e-sφ1-4παδp-h(x)\,\,\,\, \,in\,\,\,\,\,,\\[2mm] =0 \,\,\,\, on\,\ \,∂, cases where s>0 is a large parameter, h∈ C0,γ(), p∈, α∈(-1,+∞), δp denotes the Dirac measure supported at point p and φ1 is a positive first eigenfunction of the problem -φ=λφ under Dirichlet boundary condition in . If p is a strict local maximum point of φ1, we show that such a problem has a family of solutions s with arbitrary m bubbles accumulating to p, and the quantity ∫es→8π(m+1+α)φ1(p) as s→+∞.