On singular problems in nonreflexive fractional Orlicz-Sobolev spaces

Abstract

In this work, we deal with existence and uniqueness of positive solution us for the singular quasilinear problem (-ΔΦ)su=u-γ in the nonreflexive fractional Orlicz-Sobolev Ws0LΦ(Ω) for 0<s<1. Furthermore, we show that us converges in LΦ(Ω) to the unique positive solution u∈ W10LΦ(Ω) of the problem -ΔΨu=u-γ as s 1, where Ψ is an appropriate N-function equivalent to the N-function Φ. The main difficulties to obtain existence of weak solutions for both singular quasilinear problems are that their associate energy functionals may not be well-defined on their whole natural workspaces due to the lack of the reflexivity and the presence of the singular term. To overcome these difficulties, we will use the minimization method and present a new approach to building appropriate test functions to prove that the problems have positive minimizers that we showed to be weak solutions of them, respectively.