On dimension stable spaces of measures

Abstract

In this paper, we define spaces of measures DSβ(Rd) with dimensional stability β ∈ (0,d). These spaces bridge between Mb(Rd), the space of finite Radon measures, and DSd(Rd)= H1(Rd), the real Hardy space. We show the spaces DSβ(Rd) support Sobolev inequalities for β ∈ (0,d], while for any β ∈ [0,d] we show that the lower Hausdorff dimension of an element of DSβ(Rd) is at least β.

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