Wavelets, Multiplier spaces and application to Schr\"odinger type operators with non-smooth potentials

Abstract

In this paper, we employ Meyer wavelets to characterize multiplier spaces between Sobolev spaces without using capacity. Further, we introduce logarithmic Morrey spaces Mt,τr,p(Rn) to establish the inclusion relation between Morrey spaces and multiplier spaces. By wavelet characterization and fractal skills, we construct a counterexample to show that the scope of the index τ of Mt,τr,p(Rn) is sharp. As an application, we consider a Schr\"odinger type operator with potentials in Mt,τr,p(Rn).