A Geometric Lower Bound Theorem

Karim Adiprasito; Eran Nevo; José Samper

doi:10.1007/s00039-016-0363-x

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Journal article

Peer reviewed

A Geometric Lower Bound Theorem

Karim Adiprasito, Eran Nevo and José Samper

Geometric and functional analysis, Vol.26(2), pp.359-378

2016-04

DOI: https://doi.org/10.1007/s00039-016-0363-x

Abstract

Analysis

Mathematics

We resolve a conjecture of Kalai relating approximation theory of convex bodies by simplicial polytopes to the face numbers and primitive Betti numbers of these polytopes and their toric varieties. The proof uses higher notions of chordality. Further, for C 2-convex bodies, asymptotically tight lower bounds on the g-numbers of the approximating polytopes are given, in terms of their Hausdorff distance from the convex body.

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Collaboration types: Domestic collaboration; International collaboration
Citation topics: 9 Mathematics; 9.28 Pure Maths; 9.28.246 Moduli Spaces
Web Of Science research areas: Mathematics
ESI research areas: Mathematics

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Details

Title: A Geometric Lower Bound Theorem
Creators: Karim Adiprasito - Einstein Institute of Mathematics The Hebrew University of Jerusalem Jerusalem 91904 Israel
Eran Nevo - Einstein Institute of Mathematics The Hebrew University of Jerusalem Jerusalem 91904 Israel
José Samper - Department of Mathematics University of Washington Seattle WA 98195-4350 USA
Publication Details: Geometric and functional analysis, Vol.26(2), pp.359-378
Publisher: Springer International Publishing
Language: English
Resource Type: Journal article
Record Identifier: 991031613168402976