Muckenhoupt-type weights and the intrinsic structure in Bessel Setting

Abstract

Fix λ>-1/2 and λ =0. Consider the Bessel operator (introduced by Muckenhoupt--Stein) λ:=-d2dx2-2λx ddx on R+:=(0,∞) with dmλ(x):=x2λdx and dx the Lebesgue measure on R+. In this paper, we study the Muckenhoupt-type weights which reveal the intrinsic structure in this Bessel setting along the line of Muckenhoupt--Stein and Andersen--Kerman. Besides, exploiting more properties of the weights Ap,λ introduced by Andersen--Kerman, we introduce a new class Ap,λ such that the Hardy--Littlewood maximal function is bounded on the weighted Lpw space if and only if w is in Ap,λ. Moreover, along the line of Coifman--Rochberg--Weiss, we investigate the commutator [b,Rλ] with Rλ:=ddx(λ)-12 to be the Bessel Riesz transform. We show that for w∈ Ap,λ, the commutator [b, Rλ] is bounded on weighted Lpw if and only if b is in the BMO space associated with λ.