Remarks on a nonlinear nonlocal operator in Orlicz spaces

Abstract

We study integral operators Lu(x)=∫RN(u(x)-u(y))J(x-y)\,dy of the type of the fractional p-Laplacian operator, and the properties of the corresponding Orlicz and Sobolev-Orlicz spaces. In particular we show a Poincar\'e inequality and a Sobolev inequality, depending on the singularity at the origin of the kernel J considered, which may be very weak. Both inequalities lead to compact inclusions. We then use those properties to study the associated elliptic problem Lu=f in a bounded domain , and boundary condition u0 on c; both cases f=f(x) and f=f(u) are considred, including the generalized eigenvalue problem f(u)=λ(u).