Variational Methods in Geometry Seminar

Macroscopically minimal hypersurfaces

A decades-old application of the second variation formula proves that if the scalar curvature of a closed 3--manifold is bounded below by that of the product of the hyperbolic plane with the line, then every 2--sided stable minimal surface has area at least that of the hyperbolic surface of the same genus. We can prove a coarser analogue of this statement, taking the appropriate notions of macroscopic scalar curvature and macroscopic minimizing hypersurface from Guth's 2010 proof of the systolic inequality for the n--dimensional torus. The appropriate analogue of hyperbolic area in this setting turns out to be the Gromov simplicial norm. Joint work with Kei Funano.

Date & Time

March 12, 2019 | 1:00pm – 3:00pm

Location

Simonyi Hall 101

Speakers

Hannah Alpert

Affiliation

Ohio State University

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