Generalized quasi-linear fractional Wentzell problems

Abstract

Given a bounded (ε,δ)-domain ⊂eqR\!N (N≥2) whose boundary :=∂ is a d-set for d∈(N-p,N), we investigate a generalized quasi-linear elliptic boundary value problem governed by the regional fractional p-Laplacian (-)s_p, in , and generalized fractional Wentzell boundary conditions of type C'p,sNp'(1-s)u+β|u|q-2 u+ηqu\,=\,g∈dent∈dent∈denton\,\,, where ηq stands as a nonlocal fractional-type q-operator on (also refered as a Besov q-map), C'p,sNp'(1-s) denotes the fractional p-normal derivative operator in , and p,\,q are two growth exponents acting on the interior and boundary, respectively (which are in general unrelated between each other). We first show that this model equation admits a unique weak solution, which is globally bounded in . Furthermore, given two distinct weak solution related to this boundary value problem with different data values, we establish a priori L∞-estimates for the difference of weak solutions with upper bound depending in the differences of the respective interior and boundary data functions. Additionally, a Weak Comparison Principle is derived, and we conclude by establishing a sort of nonlinear Fredholm Alternative related to this generalized elliptic fractional model equation.