The Riesz Transform and Fractional Integral Operators in the Bessel Setting
Abstract
Fix λ>0. Consider the Bessel operator λ:=-d2dx2-2λx ddx on R+, where R+:=(0,∞) and dmλ:=x2λdx with dx the Lebesgue measure. We provide a deeper study of the Bessel Riesz transform and fractional integral operator via the related Besov and Triebel--Lizorkin spaces associated with λ. Moreover, we investigate some possible characterization of the commutator of fractional integral operator, which was missing in the literature of the Bessel setting.
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