H-log spaces of continuous functions, potentials, and elliptic boundary value problems

Abstract

In these notes we study a family of Banach spaces, denoted \, D0,\,()\,, \, ∈\,+\,, and called H-log spaces. For \,0<\,≤\,1\,, one has C0,\,()⊂ D0,\,() ⊂\,C()\,, with compact embedding. These spaces present the following "intermediate" regularity behavior. Solutions \,u\, of second order linear elliptic boundary value problems, under "external forces" \,f∈\, D0,\,()\, for some \,>\,1\,, satisfy \,2\,u∈\, D0,\,-\,1()\,. This result is optimal, since \,2\,u∈\, D0,\,β()\,, for some \,β >\,-1\,, is false in general. We present a preliminary study on this subject.