Morse index, Betti numbers and singular set of bounded area minimal hypersurfaces

Abstract

We introduce a combinatorial argument to study closed minimal hypersurfaces of bounded area and high Morse index. Let (Mn+1,g) be a closed Riemannian manifold and ⊂ M be a closed embedded minimal hypersurface with area at most A>0 and with a singular set of Hausdorff dimension at most n-7. We show the following bounds: there is CA>0 depending only on n, g, and A so that Σi=0n bi() ≤ CA (1+index()) if 3≤ n+1≤ 7, Hn-7(Sing()) ≤ CA (1+index())7/n if n+1≥ 8, where bi denote the Betti numbers over any field, Hn-7 is the (n-7)-dimensional Hausdorff measure and Sing() is the singular set of . In fact in dimension n+1=3, CA depends linearly on A. We list some open problems at the end of the paper.