Lusin characterisation of Hardy spaces associated with Hermite operators
Abstract
Let d ∈ \3, 4, 5, …\ and p ∈ (0,1]. We consider the Hermite operator L = - + |x|2 on its maximal domain in L2(Rd). Let HLp(Rd) be the completion of \ f ∈ L2(Rd): ML f ∈ Lp(Rd) \ with respect to the quasi-norm \|·\|HLp = \|M·\|Lp, where ML f(·) = t > 0 |e-tL f(·)| for all f ∈ L2(Rd). We characterise HLp(Rd) in terms of Lusin integrals associated with Hermite operator.
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