Weak solutions of semilinear elliptic equation involving Dirac mass

Abstract

In this paper, we study the following elliptic problem with Dirac mass equationeq 0.1 - u=Vup+k δ0 in RN, |x|+∞u(x)=0, equation where N>2, p>0, k>0, δ0 is Dirac mass at the origin, the function V is a locally Lipchitz continuous in RN\0\ satisfying V(x) c1|x|a0(1+|x|a∞-a0) with a0<N,\ a∞>a0 and c1>0. We obtain two positive solutions of (eq 0.1) with additional conditions for parameters on a∞, a0, p and k. The first solution is a minimal positive solution and the second solution is constructed by Mountain Pass theorem.