Positive Solutions for Fractional p- Laplace Semipositone Problem with Superlinear Growth

Abstract

We consider a semipositone problem involving the fractional p Laplace operator of the form equation* aligned (-)ps u &=μ( ur-1) in ,\\ u &>0 in ,\\ u &=0 on c, aligned equation* where is a smooth bounded convex domain in RN, p-1<r<p*s-1, where ps*:=NpN-ps, and μ is a positive parameter. We study the behaviour of the barrier function under the fractional p-Laplacian and use this information to prove the existence of a positive solution for small μ using degree theory. Additionally, the paper explores the existence of a ground state positive solution for a multiparameter semipositone problem with critical growth using variational arguments.