Positive solutions for nonlinear Choquard equation with singular nonlinearity

Abstract

In this article, we study the following nonlinear Choquard equation with singular nonlinearity equation* - u = u-q + ( ∫|u|2*μ|x-y|μdy )|u|2*μ-2u, u>0 \; in\; , u = 0 \; on\; ∂, equation* where is a bounded domain in Rn with smooth boundary ∂ , n > 2,\; >0,\; 0 < q < 1, \; 0<μ<n and 2*μ=2n-μn-2. Using variational approach and structure of associated Nehari manifold, we show the existence and multiplicity of positive weak solutions of the above problem, if is less than some positive constant. We also study the regularity of these weak solutions.