Pointwise bounds on Dirichlet Green's functions for a singular drift term plus Laplacian

We show optimal upper and lower pointwise estimates for the Green's function for elliptic operators that are the sum of a Laplacian term and a singular drift term that behaves like the inverse distance to the boundary, in not necessarily bounded chord-arc domains in ^n with n 3. In particular, such a term does not belong to the Lorentz space or the Kato space considered in other recent work of Sakellaris and Mourgoglou. We also do not make any assumptions on the divergence of the drift term. Adopting standards arguments, while assuming the Bourgain estimate on the elliptic measure, this also shows doubling of the corresponding elliptic measure, in the chord-arc domains.