A stability result for parabolic measures of operators with singular drifts
Abstract
We study the operator \[ ∂t - div A ∇ + B · ∇ \] in parabolic upper-half-space, where A is an elliptic matrix satisfying an oscillation condition and B is a singular drift with a Carleson control. Our main result establishes quantitative A∞-estimates for the parabolic measure in terms of oscillation of A and smallness of B. The proof relies on new estimates for parabolic Green functions that quantify their deviations from linear functions of the normal variable and on a novel, quantitative Carleson measure criterion for anisotropic A∞-weights.
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