2-Complexes with Large 2-Girth

• dc.contributor.author: Dotterrer, Dominic
• dc.contributor.author: Kahle, Matthew
• dc.contributor.author: Guth, Lawrence
• dc.date.issued: 2017-09
• dc.identifier.issn: 0179-5376
• dc.identifier.issn: 1432-0444
• dc.identifier.uri: http://hdl.handle.net/1721.1/117122
• dc.description.abstract: The 2-girth of a 2-dimensional simplicial complex X is the minimum size of a non-zero 2-cycle in H[subscript 2](X,Z/2) . We consider the maximum possible girth of a complex with n vertices and m 2-faces. If m=n[superscript 2+α] for α<1/2 , then we show that the 2-girth is at most 4n[superscript 2−2α] and we prove the existence of complexes with 2-girth at least c[subscript α,ϵ]n[superscript 2−2α−ϵ]. On the other hand, if α>1/2, the 2-girth is at most Cα . So there is a phase transition as α passes 1 / 2. Our results depend on a new upper bound for the number of combinatorial types of triangulated surfaces with v vertices and f faces. Keywords: Random simplicial complexes, Homology, Counting surfaces
• dc.description.sponsorship: Simons Foundation (Investigator Grant)
• dc.publisher: Springer US
• dc.relation.isversionof: http://dx.doi.org/10.1007/s00454-017-9926-3
• dc.source: Springer US
• dc.type: Article
• dc.identifier.citation: Dotterrer, Dominic, et al. “2-Complexes with Large 2-Girth.” Discrete & Computational Geometry, vol. 59, no. 2, Mar. 2018, pp. 383–412.
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.contributor.mitauthor: Guth, Lawrence
• dc.relation.journal: Discrete & Computational Geometry
• dc.eprint.version: Author's final manuscript
• dc.language.rfc3066: en
• dc.identifier.orcid: https://orcid.org/0000-0002-1302-8657