Sharp estimates involving A∞ and LlogL constants, and their applications to PDE

Abstract

It is a well known fact that the union of the Reverse H\"older classes coincides with the union of the Muckenhoupt classes Ap, but the A∞ constant of the weight w, which is a limit of its Ap constants, is not a natural characterization for the weight in Reverse H\"older classes. We introduce the RH1 condition as a limiting case of the RHp inequalities as p tends to 1. Then we show sharp bound on RH1 constant of the weight w in terms of its A∞ constant (from above and from below). We also prove the sharp version of the Gehring theorem for the case p=1, completing the answer to the famous question of Bojarski in dimension one. We illustrate our results by two straight-forward applications: to the Dirichlet problem for elliptic PDE's.