Equivalent definitions of dyadic Muckenhoupt and Reverse H\"older classes in terms of Carleson sequences, weak classes, and comparability of dyadic L L and A∞ constants

Abstract

In the dyadic case the union of the Reverse H\"older classes, RHpd is strictly larger than the union of the Muckenhoupt classes Apd. We introduce the RH1d condition as a limiting case of the RHpd inequalities as p tends to 1 and show the sharp bound on RH1d constant of the weight w in terms of its A∞d constant. We also take a look at the summation conditions of the Buckley type for the dyadic Reverse H\"older and Muckenhoupt weights and deduce them from an intrinsic lemma which gives a summation representation of the bumped average of a weight. Our lemmata also allow us to obtain summation conditions for continuous Reverse H\"older and Muckenhoupt classes of weights and both continuous and dyadic weak Reverse H\"older classes. In particular, it shows that a weight belongs to the class RH1 if and only if it satisfies Buckley's inequality. We also show that the constant in each summation inequality of Buckley's type is comparable to the corresponding Muckenhoupt or Reverse H\"older constant.