Nonlinear boundary problem for Harmonic functions in higher dimensional Euclidean half-spaces

Abstract

In this paper we are interested on solvability of the problem align* cases - u=0 & in \;\;\;Rn+1+\;\;\;\;\;\;\;\;\;\\ \;\;∂ u∂ = V(x)u+b u-1u+f \; & on \;\;∂Rn+1+\;\;\;\;\;\;\;\;\,\, cases align* %Laplace equation in the upper half-space with nonlinear Neumann boundary with high singular data f and potential V on boundary ∂Rn+1+ of half-space Rn+1+=\(x,t)∈Rn+1\,\, t>0\ for n≥ 2. More precisely, inspired at deAlmeida1 and Quittner we introduce a new functional space based in weak-Morrey spaces and we shown existence of positive solutions u to the above problem when inhomogeneous term f∈weak-Mpn(-1)/(Rn) and potential V∈ week-Mn(Rn) are sufficiently small in the natural n/(n-1)<<∞. Our theorems recover the range (n+1)/(n-1)≤ <∞ and immediately imply in solvability of the equivalent nonlocal half-Laplacian problem (-)1/2u=Vu+b u-1u+ f (x) for f and potential V rough than previous ones, in view of strictly inclusions Lλ λp week-Mλp for 1<p<λ<∞. Also, from Campanato's lemma we conclude that u∈ C0,αloc( Rn+1+) is locally H\"older continuous, for f∈Mpn(-1)/(Rn) and V∈ Mn(Rn) in Morrey spaces.