On Orlicz spaces satisfying the Hoffmann-Jrgensen inequality
Abstract
Building on Talagrand's proof of the Hoffmann-Jrgensen inequality for Lp spaces and its version for the exponential Orlicz spaces we provide a full characterization of Orlicz functions for which an analogous inequality holds in the Orlicz space L(F), where F is an arbitrary Banach space. As an application we present a characterization of Talagrand-type concentration inequality for suprema of empirical processes with envelope in L (equivalently for sums of independent F-valued random variables in L(F)). This result generalizes in particular an inequality by the first-named author concerning exponentially integrable summands and a recent inequality due to Chamakh-Gobet-Liu on summands with β-heavy tails. Another corollary concerns concentration for convex functions of independent, unbounded random variables, generalizing recent results due to Klochkov-Zhivotovskiy and Sambale. We also obtain a corollary concerning boundedness in L(F) of partial sums of a series of independent random variables, generalizing the original result by Hoffmann-Jrgensen.
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