Majorizing measures and proportional subsets of bounded orthonormal systems

Abstract

In this article we prove that for any orthonormal system (j)j=1n ⊂ L2 that is bounded in L∞, and any 1 < k <n, there exists a subset I of cardinality greater than n-k such that on \i\i ∈ I, the L1 norm and the L2 norm are equivalent up to a factor μ ( μ)5/2, where μ = n/k k. The proof is based on a new estimate of the supremum of an empirical process on the unit ball of a Banach space with a good modulus of convexity, via the use of majorizing measures.