Fonctions maximales centr\'ees de Hardy-Littlewood pour les op\'erateurs de Grushin
Abstract
Let MG denotes the centered Hardy-Littlewood maximal function associated to the Carnot-Carath\'eodory distance or to the pseudo-distance associated to the fundamental solution of the Grushin operator on xn × u, G = Σi = 1n ∂2∂ xi2 + (Σi = 1n xi2) ∂2∂ u2. We get Lp (p > 1) dimension free estimates for MG. We prove also that there exists a constant A > 0 such that \| MG \|L1 L1, ∞ ≤ A n, ∀ n.
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