Area-minimizing hypersurfaces in manifolds of Ricci curvature bounded below

Abstract

In this paper, we study area-minimizing hypersurfaces in manifolds of Ricci curvature bounded below with Cheeger-Colding theory. Let Ni be a sequence of smooth manifolds with Ricci curvature ≥-n2 on B1+'(pi) for constants 0, '>0, and volume of B1(pi) has a positive uniformly lower bound. Assume B1(pi) converges to a metric ball B1(p∞) in the Gromov-Hausdorff sense. For an area-minimizing hypersurface Mi in B1(pi) with ∂ Mi⊂∂ B1(pi), we prove the continuity for the volume function of area-minimizing hypersurfaces equipped with the induced Hausdorff topology. In particular, each limit M∞ of Mi is area-minimizing in B1(p∞) provided B1(p∞) is a smooth Riemannian manifold. By blowing up argument, we get sharp dimensional estimates for the singular set of M∞ in R, and S M∞. Here, R, S are the regular and singular parts of B1(p∞), respectively.