Dimension free bounds for the vector-valued Hardy-Littlewood maximal operator
Abstract
In this article, Fefferman-Stein inequalities in Lp( Rd;q) withbounds independent of the dimension d are proved, for all 1 p, q + ∞.This result generalizes in a vector-valued setting the famous one by Steinfor the standard Hardy-Littlewood maximal operator. We then extendour result by replacing q with an arbitrary UMD Banach lattice. Finally,we prove similar dimensionless inequalities in the setting of the Grushinoperators.
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