Reshetnyak-class mappings and composition operators

Abstract

For the Reshetnyak-class homeomorphisms : Y, where~ is a~domain in some Carnot group and~Y is a~metric space, we obtain an~equivalent description as the mappings which induce the bounded composition operator *: Lip(Y) Lq1(), where 1≤ q≤ ∞, as *u=u for u∈ Lip(Y). We demonstrate the utility of our approach by characterizing the homeomorphisms :' of domains in some Carnot group~ G which induce the bounded composition operator *: L1p(') Lip loc(') L1q (), 1≤ q ≤ p≤ ∞, of homogeneous Sobolev spaces. The new proof is much shorter than the one already available, requires a~minimum of tools, and enables us to obtain new properties of the homeomorphisms in question.