Compactness of Riesz transform commutator associated with Bessel operators
Abstract
Let λ>0 and λ:=-d2dx2-2λx ddx be the Bessel operator on R+:=(0,∞). We first introduce and obtain an equivalent characterization of CMO( R+,\, x2λdx). By this equivalent characterization and establishing a new version of the Fr\'echet-Kolmogorov theorem in the Bessel setting, we further prove that a function b∈ BMO( R+,\, x2λdx) is in CMO( R+,\, x2λdx) if and only if the Riesz transform commutator [b, R_λ] is compact on Lp( R+, x2λdx) for any p∈(1, ∞).
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