An Optimal Regularity Theory for Immersed Stable Minimal Hypersurfaces with Small Singular Set

Abstract

We show that if Mn is a properly immersed, two-sided, stable minimal hypersurface in Bn+11(0) S, where S is closed with Hn-2(S)=0, then dimHsing(M)≤ n-7, namely M Bn+11(0) is represented by a smooth minimal immersion outside a closed set of generally unavoidable singularities which has Hausdorff dimension at most n-7. This provides the optimal a priori size assumption on the non-immersed singular set in order to guarantee optimal regularity. Consequently, such objects form a compact class under mass upper bounds.