Carleson Conditions for Weights: The quantitative small constant case

TL;DR

This paper explores the relationship between Carleson measures and $A_ abla$ weights, establishing that when one measure is small, the other is also small, with a square root dependence, and applies this to elliptic measure theory.

Contribution

It provides a quantitative small constant relationship between Carleson measures and $A_ abla$ weights, extending previous qualitative results and applying to elliptic operators.

Findings

Quantitative bounds between Carleson measures and $A_ abla$ weights.

Square root dependence when one quantity is small.

Application to elliptic measures with Dahlberg-Kenig-Pipher coefficients.

Abstract

We investigate the small constant case of a characterization of $A_\infty$ weights due to Fefferman, Kenig and Pipher. In their work, Fefferman, Kenig and Pipher bound the logarithm of the $A_\infty$ constant by the Carleson norm of a measure built out of the heat extension, up to a multiplicative and additive constant (as well as the converse). We prove, qualitatively, that when one of these quantities is small so is the other. In fact, we show that these quantities are bounded by a constant times the square root of the other, provided at least one of them is sufficiently small. We also give an application of our result to the study of elliptic measures associated to elliptic operators with coefficients satisfying the ``Dahlberg-Kenig-Pipher" condition. We suspect that the square root dependence in the bound used in this application is sharp and give some justification for this in the last section.