On multiplier processes under weak moment assumptions
Abstract
We show that if V ⊂ n satisfies a certain symmetry condition (closely related to unconditionaity) and if X is an isotropic random vector for which \|∈rX,t\|Lp ≤ L p for every t ∈ Sn-1 and p n, then the corresponding empirical and multiplier processes indexed by V behave as if X were L-subgaussian.
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