Boundedness of Commutators on Hardy Spaces over Metric Measure Spaces of Non-homogeneous Type

Abstract

Let (X,d,μ) be a metric measure space satisfying the so-called upper doubling condition and the geometrically doubling condition. Let T be a Calder\'on-Zygmund operator with kernel satisfying only the size condition and some H\"ormander-type condition, and b∈RBMO(μ) (the regularized BMO space with the discrete coefficient). In this paper, the authors establish the boundedness of the commutator Tb:=bT-Tb generated by T and b from the atomic Hardy space H1(μ) with the discrete coefficient into the weak Lebesgue space L1,\,∞(μ). The boundedness of the commutator generated by the generalized fractional integral Tα\,(α∈(0,1)) and the RBMO(μ) function from H1(μ) into L1/(1-α),\,(μ) is also presented. Moreover, by an interpolation theorem for sublinear operators, the authors show that the commutator Tb is bounded on Lp(μ) for all p∈(1,∞).