Nonlinear fractional Laplacian problems with nonlocal "gradient terms"

Abstract

Let ⊂ RN, N ≥ 2, be a smooth bounded domain. For s ∈ (1/2,1), we consider a problem of the form \[ \aligned (-)s u & = μ(x)\, Ds2(u) + λ f(x)\,, & in ,\\ u & = 0\,, & in RN , aligned . \] where λ > 0 is a real parameter, f belongs to a suitable Lebesgue space, μ ∈ L∞() and Ds2 is a nonlocal "gradient square" term given by \[ Ds2 (u) = aN,s2p.v. ∫RN |u(x)-u(y)|2|x-y|N+2s dy \,. \] Depending on the real parameter λ > 0, we derive existence and non-existence results. The proof of our existence result relies on sharp Calder\'on-Zygmund type regularity results for the fractional Poisson equation with low integrability data. We also obtain existence results for related problems involving different nonlocal diffusion terms.