Lower bound of Riesz transform kernels revisited and commutators on stratified Lie groups

Abstract

Let G be a stratified Lie group and \j\1 ≤ j ≤ n a basis for the left-invariant vector fields of degree one on G. Let = Σj = 1n j2 be the sub-Laplacian on G and the jth Riesz transform on G is defined by Rj:= j (-)-12, 1 ≤ j ≤ n. In this paper we give a new version of the lower bound of the kernels of Riesz transform Rj and then establish the Bloom-type two weight estimates as well as a number of endpoint characterisations for the commutators of the Riesz transforms and BMO functions, including the L+L( G) to weak L1( G), H1( G) to L1( G) and L∞( G) to BMO( G). Moreover, we also study the behaviour of the Riesz transform kernel on a special case of stratified Lie group: the Heisenberg group, and then we obtain the weak type (1,1) characterisations for the Riesz commutators.