Singular behavior and generic regularity of min-max minimal hypersurfaces

Abstract

We show that for a generic 8-dimensional Riemannian manifold with positive Ricci curvature, there exists a smooth minimal hypersurface. Without the curvature condition, we show that for a dense set of 8-dimensional Riemannian metrics there exists a minimal hypersurface with at most one singular point. This extends previous work on generic regularity that only dealt with area-minimizing hypersurfaces. These results are a consequence of a more general estimate for a one-parameter min-max minimal hypersurface ⊂ (M,g) (valid in any dimension): H0 (Snm()) + Index() ≤ 1 where Snm() denotes the set of singular points of with a unique tangent cone non-area minimizing on either side.