Sharp focal radius estimate and rigidity of hypersurfaces in manifolds with positive curvature

Abstract

We prove a sharp Clifford-threshold focal-radius estimate and rigidity for immersed hypersurfaces. Under a p-form curvature condition, formulated by the Weitzenböck curvature term together with Ricp p, any closed two-sided immersion F:Σm Mm+1 with bp(Σ; R)≠0 and 1 p m/2 satisfies \[ rf(F,M)π4. \] The equality case is rigid: if the ambient manifold is complete, equality forces the hypersurface to be locally the Clifford hypersurface Sp(1/2)× Sm-p(1/2)⊂ Sm+1(1); if the ambient manifold is compact and connected, it is a spherical space form. The curvature condition follows from 1 for p=1, from normalized PIC11 for p=2, and from curvature operator bounded below by one in all degrees. By quotient lifting and the Hopf fibrations, we also obtain focal-radius estimates in CPn and HPn, with projective Clifford rigidity, without any Betti-number assumption.