Weak type estimates associated to Burkholder's martingale inequality
Abstract
Given a probability space (, A, μ), let A1, A2, ... be a filtration of σ-subalgebras of A and let E1, E2, ... denote the corresponding family of conditional expectations. Given a martingale f = (f1, f2, ...) adapted to this filtration and bounded in Lp() for some 2 p < ∞, Burkholder's inequality claims that \|f\|Lp() cp \| (Σk=1∞ Ek-1(|dfk|2) )1/2 \|Lp() + (Σk=1∞ \|dfk\|pp )1/p. Motivated by quantum probability, Junge and Xu recently extended this result to the range 1 < p < 2. In this paper we study Burkholder's inequality for p=1, for which the techniques (as we shall explain) must be different. Quite surprisingly, we obtain two non-equivalent estimates which play the role of the weak type (1,1) analog of Burkholder's inequality. As application, we obtain new properties of Davis decomposition for martingales.
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