A molecular reconstruction theorem for Hp(·)ω(Rn)

Abstract

In this article we give a molecular reconstruction theorem for Hωp(·)(Rn). As an application of this result and the atomic decomposition developed in [5] we show that classical singular integrals can be extended to bounded operators on Hωp(·)(Rn). We also prove, for certain exponents q(·) and certain weights ω, that Riesz potential Iα, with 0 < α < n, can be extended to a bounded operator from Hp(·)ω(Rn) into Hq(·)ω(Rn), for 1p(·) := 1q(·) + αn.

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