Characterization of CMO via compactness of the commutators of bilinear fractional integral operators

Abstract

Let Iα be the bilinear fractional integral operator, Bα be a more singular family of bilinear fractional integral operators and b=(b,b). B\'enyi et al. in B1 showed that if b∈ CMO, the BMO-closure of C∞c(Rn), the commutator [b,Bα]i(i=1,2) is a separately compact operator. In this paper, it is proved that b∈ CMO is necessary for [b,Bα]i(i=1,2) is a compact operator. Also, the authors characterize the compactness of the iterated commutator [b,Iα] of bilinear fractional integral operator. More precisely, the commutator [b,Iα] is a compact operator if and only if b∈ CMO.