Riesz Transform Characterizations of H1 and BMO on Ahlfors Regular Sets with Small Oscillations
Abstract
We employ the Riesz transform as a means for describing geometric properties of sets in Rn, and study the extent to which they can be used to characterize function spaces defined on said sets. In particular, characterizations of the end-point spaces on the Lebesgue scale Lp with 1<p<∞, namely the Hardy space H1 and the John-Nirenberg space BMO, are produced in terms of the Riesz transforms on Ahlfors regular sets in Rn with small oscillations (quantified in terms of the BMO nature of the outward unit normal). These generalize the celebrated results of C.~Fefferman and E.~Stein in the flat Euclidean setting.
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