Rectifiability of flat singular points for area-minimizing mod(2Q) hypercurrents

Abstract

Consider an m-dimensional area minimizing mod(2Q) current T, with Q∈N, inside a sufficiently regular Riemannian manifold of dimension m + 1. We show that the set of singular density-Q points with a flat tangent cone is countably (m-2)-rectifiable and has locally finite (m-2)-dimensional upper Minkowski content. This complements the thorough structural analysis of the singularities of area-minimizing hypersurfaces modulo p that has been completed in the series of works of De Lellis-Hirsch-Marchese-Stuvard and De Lellis-Hirsch-Marchese-Stuvard-Spolaor, and the work of Minter-Wickramasekera.