Existence of three positive solutions for a nonlocal singular dirichlet boundary problem

Abstract

In this article, we prove the existence of at least three positive solutions for the following nonlocal singular problem equation* (P)\ split (-)su &= f(u)uq, \; \; u>0 \;\; in\;\; ,\\ u &= 0\;\; in\;\; Rn split . equation* where (-)s denotes the fractional Laplace operator for s∈ (0,1), n>2s, q ∈ (0,1), >0 and is smooth bounded domain in Rn. Here f :[0,∞) [0,∞) is a continuous nondecreasing map satisfying u ∞f(u)uq+1=0. We show that under certain additional assumptions on f, (P) possesses at least three distinct solutions for a certain range of . We use the method of sub-supersolutions and a critical point theorem by Amann amann to prove our results. Moreover, we prove a new existence result for a suitable infinite semipositone nonlocal problem which played a crucial role to obtain our main result and is of independent interest.