What does this research mean for the field?

In dimensions n+1≥4, there exist closed (n+1)-dimensional Riemannian manifolds with positive Ricci curvature that admit embedded two-sided minimal hypersurfaces with Morse index one and unbounded first Betti numbers. Novelty: ClaimNovelty.NOVEL_FINDING. Consensus alignment: ConsensusAlignment.NEUTRAL.

What question did this study set out to answer?

The aim is to construct Riemannian manifolds exhibiting positive Ricci curvature and analyze the properties of embedded minimal hypersurfaces.

March 8, 2026Open Access

Ricci curvature and minimal hypersurfaces with large Betti numbers

Puntos clave

The aim is to construct Riemannian manifolds exhibiting positive Ricci curvature and analyze the properties of embedded minimal hypersurfaces.
Construct closed (n+1)-dimensional Riemannian manifolds with positive Ricci curvature.
Investigate embedded two-sided minimal hypersurfaces within these manifolds.
Analyze the Morse index of hypersurfaces and their Betti numbers along a sequence.
Each embedded minimal hypersurface has a Morse index of one.
The first Betti numbers of the hypersurfaces are not uniformly bounded as the sequence progresses.

Resumen

Abstract In any dimension n+1 4 n + 1 ≥ 4 we construct a sequence of closed (n+1) (n + 1) -dimensional Riemannian manifolds with positive Ricci curvature admitting embedded two-sided minimal hypersurfaces such that the following hold: (i) any such hypersurface has Morse index one; (ii) the first Betti numbers of the hypsersurfaces are not uniformly bounded along the sequence.

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