Optimal L1-bounds for submartingales

Abstract

The optimal function f satisfying E |Σ1n Xi | f(E|X1|,...,E|Xn|) for every martingale (X1,X1+X2, ...,Σi=1n Xi) is shown to be given by f(a) = \ak-Σi=1k-1 ai\k=1n \ ak2\k=3n for a∈[0,∞[n. A similar result is obtained for submartingales (0,X1,X1+X2,..., Σi=1n Xi). The optimality proofs use a convex-analytic comparison lemma of independent interest.