The Gundy-Stein decomposition with explicit constants

Abstract

Let ( Fn)n 1 be a filtration and let f0 belong to L1( F∞). For the martingale fn= E[f Fn] and each λ>0 we prove a Gundy--Stein decomposition \[ f=g+h+k \] with explicit numerical constants. In the positive closed case the three parts satisfy explicit bounds, and the bounded part is bounded above by λ. We also prove a one-parameter form for the bounded part and two-point sharpness results, including a joint sharpness statement for arbitrary decompositions under the condition 0 k λ. We also obtain an exact four-term refinement of the decomposition, separating the bounded term into a stopped part and a conditional expectation term. As applications we obtain an explicit weak-type (1,1) estimate for truncated martingale multipliers and a John--Nirenberg inequality for martingale BMO on atomic α-regular filtrations.

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