Pointwise Characterizations of Besov and Triebel-Lizorkin Spaces and Quasiconformal Mappings

Abstract

In this paper, the authors characterize, in terms of pointwise inequalities, the classical Besov spaces Bsp,\,q and Triebel-Lizorkin spaces Fsp,\,q for all s∈(0,\,1) and p,\,q∈(n/(n+s),\,∞], both in Rn and in the metric measure spaces enjoying the doubling and reverse doubling properties. Applying this characterization, the authors prove that quasiconformal mappings preserve Fsn/s,\,q on for all s∈(0,\,1) and q∈(n/(n+s),\,∞]. A metric measure space version of the above morphism property is also established.