Small A∞ results for Dahlberg-Kenig-Pipher operators in sets with uniformly rectifiable boundaries
Abstract
In the present paper, we consider elliptic operators L=-div(A∇) in a domain bounded by a chord-arc surface with small enough constant, and whose coefficients A satisfy a weak form of the Dahlberg-Kenig-Pipher condition of approximation by constant coefficient matrices, with a small enough Carleson norm, and show that the elliptic measure with pole at infinity associated to L is A∞-absolutely continuous with respect to the surface measure on , with a small A∞ constant. In other words, we show that for relatively flat uniformly rectifiable sets and for operators with slowly oscillating coefficients the elliptic measure satisfies the A∞ condition with a small constant and the logarithm of the Poisson kernel has small oscillations.
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