Jacek Dziubański scite author profile

We identify the dual space of the Hardy-type space H 1 L related to the time independent Schrödinger operator L = − + V , with V a potential satisfying a reverse Hölder inequality, as a BMO-type space BMO L . We prove the boundedness in this space of the versions of some classical operators associated to L (Hardy-Littlewood, semigroup and Poisson maximal functions, square function, fractional integral operator). We also get a characterization of BMO L in terms of Carlesson measures.

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On Hardy spaces associated with Bessel operators

Betancor

Dziubański

Torrea

2009

J Anal Math

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H^pspaces associated with Schrödinger operators with potentials from reverse Hölder classes

2003

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Abstract. Let A = −∆ + V be a Schrödinger operator on R d , d ≥ 3, where V is a nonnegative potential satisfying the reverse Hölder inequality with an exponent q > d/2. We say that f is an element ofA admits a special atomic decomposition. Introduction. Let k t (x, y) be the integral kernels of the semigroup of linear operators {T t } t>0 generated by a Schrödinger operatorThroughout this paper we assume that V is a nonnegative potential on R d that belongs to the reverse Hölder class RH q , q > d/2, that is, there exists a constant C > 0 such that

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