A Revisit on Commutators of linear and bilinear Fractional Integral Operator

Abstract

Let Iα be the linear and Iα be the bilinear fractional integral operators. In the linear setting, it is known that the two-weight inequality holds for the first order commutators of Iα. But the method can't be used to obtain the two weighted norm inequality for the higher order commutators of Iα. In this paper, we first give an alternative proof for the first order commutators of Iα. This new approach allows us to consider the higher order commutators. This was done by showing that the commutator [b,Iα] can be represented as a finite linear combination of some paraproducts. Then, by using the Cauchy integral theorem, we show that the two-weight inequality holds for the higher order commutators of Iα. In the bilinear setting, we present a dyadic proof for the characterization between BMO and the boundedness of [b,Iα]. Moreover, some bilinear paraproducts are also treated in order to obtain the boundedness of [b,Iα].