Global bifurcation for fractional p-Laplacian and application

Abstract

We prove the existence of an unbounded branch of solutions to the non-linear non-local equation (-)sp u=λ |u|p-2u + f(x,u,λ) , u=0 Rn, bifurcating from the first eigenvalue. Here (-)sp denotes the fractional p-Laplacian and ⊂Rn is a bounded regular domain. The proof of the bifurcation results relies in computing the Leray--Schauder degree by making an homotopy respect to s (the order of the fractional p-Laplacian) and then to use results of local case (that is s=1) found in [17]. Finally, we give some application to an existence result.