Operation with Concentration Inequalities

Abstract

Following the concentration of the measure theory formalism, we consider the transformation (Z) of a random variable Z having a general concentration function α. If the transformation is λ-Lipschitz with λ>0 deterministic, the concentration function of (Z) is immediately deduced to be equal to α(·/λ). If the variations of are bounded by a random variable having a concentration function (around 0) β: R+ R, this paper sets that (Z) has a concentration function analogous to the so-called parallel product of α and β. With this result at hand (i) we express the concentration of random vectors with independent heavy-tailed entries, (ii) given a transformation with bounded kth differential, we express the so-called ``multilevel'' concentration of (Z) as a function of α, and the operator norms of the successive differentials up to the kth (iii) we obtain a heavy-tailed version of the Hanson--Wright inequality. Finally, in order to rigorously handle the algebraic operations that arise on concentration functions (parallel sums, parallel products, and non-unique pseudo-inverses), we develop at the beginning of the paper a functional framework based on maximally monotone set-valued operators, which provides a natural and coherent formalism for studying these transformations.