Sharp estimates for conditionally centred moments and for compact operators on Lp spaces

Abstract

Let (, F, P) be a probability space, be a random variable on (, F, P), G be a sub-σ-algebra of F, and let EG = E(· | G) be the corresponding conditional expectation operator. We obtain sharp estimates for the moments of - EG in terms of the moments of . This allows us to find the optimal constant in the bounded compact approximation property of Lp([0, 1]), 1 < p < ∞.