Cauchy-Szeg\"o operator, quaternionic Siegel upper half space, commutator, weighted Morrey space

Abstract

In the setting of quaternionic Heisenberg group Hn-1, we characterize the boundedness and compactness of commutator [b, C] for the Cauchy--Szeg\"o operator C on the weighted Morrey space Lwp,\,( Hn-1) with p∈(1, ∞), ∈(0, 1) and w∈ Ap( Hn-1). More precisely, we prove that [b, C] is bounded on Lwp,\,( Hn-1) if and only if b∈ BMO( Hn-1). And [b, C] is compact on Lwp,\,( Hn-1) if and only if b∈ VMO( Hn-1).