Estimating the Morse index of free boundary minimal hypersurfaces through covering arguments
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2022-06-05
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Working Paper
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Abstract
Given a compact Riemannian manifold with boundary of dimension between 3 and 7, we show that the Morse index of a free boundary minimal hypersurface grows linearly with the sum of its Betti numbers, where the constant of growth depends on the area of the free boundary minimal hypersurface in question. We are inspired by a groundbreaking combinatorial argument by Song (2019), which we partly simplify and shorten.
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published
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2206.02105
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Cornell University
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09582 - Carlotto, Alessandro (ehemalig) / Carlotto, Alessandro (former)