ACS Condition on Minimal Isoparametric Hypersurfaces of Positive Ricci Curvature in Unit Spheres

Abstract

We study the Ambrozio--Carlotto--Sharp (ACS) criterion on minimal isoparametric hypersurfaces Nn+1⊂ Sn+2 with positive Ricci curvature, motivated by the Schoen--Marques--Neves conjecture on Morse index.For g=4 distinct principal curvatures with multiplicities m1,m2, we prove that the pointwise ACS inequality holds if and only if \m1,m2\ 4. Sufficiency is obtained via a moment-relaxation technique yielding the sharp bound 4a2 on the quadratic part of the integrand; necessity follows from an explicit extremal configuration in the top eigenspace of the shape operator. We also verify the ACS condition for g=3 with m1=m2∈\4,8\.As a consequence, for any closed embedded minimal hypersurface Mn in such an ambient manifold, index(M) 2d(d-1)\, b1(M) with d=n+3.

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