Compactness of commutators for singular integrals on Morrey spaces (Q2882884)

The aim of this note is to give a necessary and sufficient condition in order to ensure compactness for a commutator between a singular integral \(T\) and a multiplication operator \(M_b\). The authors show that the commutator \([b,T]\) defined by \(M_bT-TM_b\) is a compact operator in the Morrey space \(L^{p,\lambda}\) if and only if the multiplier \(b\) is a \(VMO\) function. The authors also give a condition for a subset of a Morrey space to be strongly pre-compact.