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The goal of this note is to prove the Half Space Property for RCD (0, N) spaces, namely that if (X, d, m) is a parabolic RCD (0, N) space and C X R is locally the boundary of a locally perimeter minimizing set and it is contained in a half space, then C is a locally finite union of horizontal slices. As a consequence, we obtain oscillation estimates and a Half Space Theorem for minimal hypersurfaces in products M R, where M is a parabolic smooth manifold (possibly weighted and with boundary) with non-negative Ricci curvature. On the way of proving the main results, we also obtain some properties of Green's functions on RCD (K, N) spaces that are of independent interest.
Cucinotta et al. (Mon,) studied this question.