A remark on the majorizing measures theorem for general processes

Abstract

We show that the lower bound in the majorizing measures theorem holds for a large class of random vectors. Specifically, suppose X μ is a centered random vector in Rn with \[ CKL(μ) = θ≠ η\\ θ, η∈ Rn KL(μθ\| μη)\|θ- η\|22 < ∞, \] where μθ denotes the law of the translate θ+ X. Then, for every nonempty, bounded T ⊂ Rn, \[ CKL(μ)\, Eμ[t ∈ T \, X, t ] γ2(T), \] where the righthand side denotes Talagrand's generic chaining functional. This result recovers, as a special case, the lower bound in the majorizing measures theorem for centered Gaussian processes. Our argument critically relies on the rate-distortion integral, recently introduced by J. Liu.