Variaiton and λ-jump inequalities on Hp spaces

Abstract

Let φ∈ S with ∫φ (x)\, dx=1, and define φt(x)=1tnφ (xt), and denote the function family \φt f(x)\t>0 by f(x). Suppose that there exists a constant C1 such that Σt>0 |φt(x)|2<C1 for all x∈ Rn. Then (i) There exists a constant C2>0 such that \|V2( f)\|Lp≤ C2\|f\|Hp,\;\;nn+1<p≤ 1 for all f∈ Hp(Rn), nn+1<p≤ 1. (ii) The λ-jump operator Nλ( f) satisfies \|λ [Nλ( f)]1/2\|Lp≤ C3\|f\|Hp,\;\;nn+1<p≤ 1, uniformly in λ >0 for some constant C3>0.