An L1-theory for p-Schr\"odinger equations with confinement in measure

Abstract

We consider stationary p-Schr\"odinger equations on the whole space with integrable data and potentials that are confining in measure. We introduce asymptotic energy solutions in an asymptotic Lp framework and establish existence and uniqueness in the degenerate range p2. The proof relies on a new Rellichx2013Kondrachov-type compactness theorem of independent interest, which provides sufficient conditions for families of Sobolev functions to be precompact in asymptotic Lp spaces, without any dimension-dependent restriction on the exponent. For data in the duality regime L1(Rn) Lp'(Rn), asymptotic energy solutions coincide with weak energy solutions. We also show that additional compactness assumptions yield localized entropy-type solutions and, under suitable local regularity, distributional solutions.