Positive solutions for semilinear fractional elliptic problems involving an inverse fractional operator

Abstract

This paper is devoted to the study of the existence of positive solutions for a problem related to a higher order fractional differential equation involving a nonlinear term depending on a fractional differential operator, (-)α u=λ u+ (-)β|u|p-1u in ; (-)ju=0 on ∂, for j∈Z,\: 0≤ j< [α] where is a bounded domain in RN, 0<β<1, β<α<β+1 and λ>0. In particular, we study the fractional elliptic problem, (-)α-β u= λ(-)-βu+ |u|p-1u in ; u=0 on ∂, and we prove existence or nonexistence of positive solutions depending on the parameter λ>0, up to the critical value of the exponent p, i.e., for 1<p≤ 2μ*-1 where μ:=α-β and 2μ*=2NN-2μ is the critical exponent of the Sobolev embedding.