A new look at the fractional Poisson problem via the Logarithmic Laplacian

Abstract

We analyze the s-dependence of solutions us to the family of fractional Poisson problems (-)s u =f in , u 0 on RN in an open bounded set ⊂ RN, s ∈ (0,1). In the case where is of class C2 and f ∈ Cα() for some α>0, we show that the map (0,1) L∞(), s us is of class C1, and we characterize the derivative ∂s us in terms of the logarithmic Laplacian of f. As a corollary, we derive pointwise monotonicity properties of the solution map s us under suitable assumptions on f and . Moreover, we derive explicit bounds for the corresponding Green operator on arbitrary bounded domains which are new even for the case s=1, i.e., for the local Dirichlet problem - u = f in , u 0 on ∂ .