Density of minimal hypersurfaces for generic metrics

Published 30 Oct 2017 in math.DG, math.AP, and math.GT | (1710.10752v2)

Abstract: For almost all Riemannian metrics (in the $C^\infty$ Baire sense) on a closed manifold $M^{n+1}$, $3\leq (n+1)\leq 7$, we prove that the union of all closed, smooth, embedded minimal hypersurfaces is dense. This implies there are infinitely many minimal hypersurfaces thus proving a conjecture of Yau (1982) for generic metrics.

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