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Tight complexes in 3-space admit perfect discrete Morse functions
Journal article   Open access  Peer reviewed

Tight complexes in 3-space admit perfect discrete Morse functions

Karim Adiprasito and Bruno Benedetti
European journal of combinatorics, Vol.45, pp.71-84
2015-04
DOI: https://doi.org/10.1016/j.ejc.2014.10.002

Abstract

In 1967, Chillingworth proved that all convex simplicial 3-balls are collapsible. Using the classical notion of tightness, we generalize this to arbitrary manifolds: we show that all tight polytopal 3-manifolds admit some perfect discrete Morse function. We also strengthen Chillingworth’s theorem by proving that all convex simplicial 3-balls are non-evasive. In contrast, we show that many non-evasive 3-balls cannot be realized in a convex way.
url
https://doi.org/10.1016/j.ejc.2014.10.002View
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9 Mathematics
9.28 Pure Maths
9.28.246 Moduli Spaces
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Mathematics
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