Stefano Meda scite author profile

Abstract. We prove that if q is in (1, ∞), Y is a Banach space, and T is a linear operator defined on the space of finite linear combinations of (1, q)-atoms in R n with the property that sup{ T a Y : a is a (1, q)-atom} < ∞, then T admits a (unique) continuous extension to a bounded linear operator from H 1 (R n ) to Y . We show that the same is true if we replace (1, q)-atoms by continuous (1, ∞)-atoms. This is known to be false for (1, ∞)-atoms.

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Functional Calculus for the Ornstein–Uhlenbeck Operator

Garcı́a-Cuerva

Mauceri²,

Meda³

et al. 2001

Journal of Functional Analysis

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H¹and BMO for certain locally doubling metric measure spaces of finite measure

2010

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In a previous paper the authors developed a H 1 −BM O theory for unbounded metric measure spaces (M, ρ, µ) of infinite measure that are locally doubling and satisfy two geometric properties, called "approximate midpoint" property and "isoperimetric" property. In this paper we develop a similar theory for spaces of finite measure. We prove that all the results that hold in the infinite measure case have their counterparts in the finite measure case. Finally, we show that the theory applies to a class of unbounded, complete Riemannian manifolds of finite measure and to a class of metric measure spaces of the form (R d , ρϕ, µϕ), where dµϕ = e −ϕ dx and ρϕ is the Riemannian metric corresponding to the length element ds 2 = (1+|∇ϕ|) 2 ( dx 2 1 +· · ·+ dx 2 d ). This generalizes previous work of the last two authors for the Gauss space.2000 Mathematics Subject Classification. 42B20, 42B30, 46B70, 58C99 .

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Stefano Meda

Vector-Valued Multipliers on Stratified Groups

Personal Experience in Surgical Management of Pulmonary Pleomorphic Carcinoma

On the $H^1$--$L^1$ boundedness of operators

Functional Calculus for the Ornstein–Uhlenbeck Operator

H¹and BMO for certain locally doubling metric measure spaces of finite measure

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About

Stefano Meda

Vector-Valued Multipliers on Stratified Groups

Personal Experience in Surgical Management of Pulmonary Pleomorphic Carcinoma

On the $H^1$--$L^1$ boundedness of operators

Functional Calculus for the Ornstein–Uhlenbeck Operator

H1and BMO for certain locally doubling metric measure spaces of finite measure

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H¹and BMO for certain locally doubling metric measure spaces of finite measure