Characterizations of a class of Musielak--Orlicz BMO spaces via commutators of Riesz potential operators

Abstract

The fractional integral operators Iα can be used to characterize the Musielak--Orlicz Hardy spaces. This paper shows that for b∈ BMO( Rn), the commutators [b,Iα] generated by fractional integral operators Iα with b are bounded from the Musielak--Orlicz Hardy spaces H1( Rn) to the Musielak--Orlicz spaces L2( Rn) (where 1<u<∞ and 1, 2 are growth functions) if and only if b∈ BMO_1,u( Rn), which are a class of non-trivial subspaces of BMO( Rn). Additionally, we obtain the boundedness of the commutator [b,Iα] from H1( Rn) to H2( Rn). The corresponding results are also provided for commutators of fractional integrals associated with general homogeneous kernels.