Characterizations of A∞ Weights in Martingale Spaces

Abstract

Grafakos systematically proved that A∞ weights have different characterizations for cubes in Euclidean spaces in his classical text book. Very recently, Duoandikoetxea, Mart\'n-Reyes, Ombrosi and Kosz discussed several characterizations of the A∞ weights in the setting of general bases. By conditional expectations, we study A∞ weights in martingale spaces. Because conditional expectations are Radon-Nikod\'ym derivatives with respect to sub-σ-fields which have no geometric structures, we need new ingredients. Under a regularity assumption on weights, we obtain equivalent characterizations of the A∞ weights. Moreover, using weights modulo conditional expectations, we have one-way implications of different characterizations.