Admissible Sequences for Talagrand's γ2-functional
Abstract
Suprema of random processes appear naturally in a plethora of disciplines, and Talagrand's majorizing theorem yields a geometric interpretation for them: for a centered Gaussian random process (Xt)t ∈ T, E[t ∈ TXt] is comparable to the γ2-functional of T, a quantity that depends solely on the space (T,d), where d denotes the pseudometric d(u,v)=E[(Xu-Xv)2]. Despite the explicit definition of this functional, an infimum over admissible sequences, this tool tends to be used exclusively as a means to bound the expectation of the supremum of a random process by that of another. This work considers the γ2-functional as a proxy for the quantity of interest by constructing admissible sequences that are close to being optimal, and aims to provide a promising avenue towards understanding expectations of suprema of Gaussian random processes.
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