On flag-no-square $4$-manifolds
Which $4$-manifolds admit a flag-no-square (fns) triangulation? We introduce the "star-connected-sum" operation on such triangulations, which preserves the fns property, from which we derive new constructions of fns $4$-manifolds. In particular, we show the following: (i) there exist non-a...
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| creator | Kalmanovich, Daniel Nevo, Eran Sorcar, Gangotryi |
| description | Which $4$-manifolds admit a flag-no-square (fns) triangulation? We introduce
the "star-connected-sum" operation on such triangulations, which preserves the
fns property, from which we derive new constructions of fns $4$-manifolds. In
particular, we show the following: (i) there exist non-aspherical fns
$4$-manifolds, answering in the negative a question by Przytycki and
Swiatkowski; (ii) for every large enough integer $k$ there exists a fns
$4$-manifold $M_{2k}$ of Euler characteristic $2k$, and further, (iii) $M_{2k}$
admits a super-exponential number (in $k$) of fns triangulations - at least
$2^{\Omega(k \log k)}$ and at most $2^{O(k^{1.5} \log k)}$. |
| doi_str_mv | 10.48550/arxiv.2310.13495 |
| format | Article |
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the "star-connected-sum" operation on such triangulations, which preserves the
fns property, from which we derive new constructions of fns $4$-manifolds. In
particular, we show the following: (i) there exist non-aspherical fns
$4$-manifolds, answering in the negative a question by Przytycki and
Swiatkowski; (ii) for every large enough integer $k$ there exists a fns
$4$-manifold $M_{2k}$ of Euler characteristic $2k$, and further, (iii) $M_{2k}$
admits a super-exponential number (in $k$) of fns triangulations - at least
$2^{\Omega(k \log k)}$ and at most $2^{O(k^{1.5} \log k)}$.</description><identifier>DOI: 10.48550/arxiv.2310.13495</identifier><language>eng</language><subject>Mathematics - Combinatorics ; Mathematics - Geometric Topology</subject><creationdate>2023-10</creationdate><rights>http://creativecommons.org/licenses/by-sa/4.0</rights><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>228,230,781,886</link.rule.ids><linktorsrc>$$Uhttps://arxiv.org/abs/2310.13495$$EView_record_in_Cornell_University$$FView_record_in_$$GCornell_University$$Hfree_for_read</linktorsrc><backlink>$$Uhttps://doi.org/10.48550/arXiv.2310.13495$$DView paper in arXiv$$Hfree_for_read</backlink></links><search><creatorcontrib>Kalmanovich, Daniel</creatorcontrib><creatorcontrib>Nevo, Eran</creatorcontrib><creatorcontrib>Sorcar, Gangotryi</creatorcontrib><title>On flag-no-square $4$-manifolds</title><description>Which $4$-manifolds admit a flag-no-square (fns) triangulation? We introduce
the "star-connected-sum" operation on such triangulations, which preserves the
fns property, from which we derive new constructions of fns $4$-manifolds. In
particular, we show the following: (i) there exist non-aspherical fns
$4$-manifolds, answering in the negative a question by Przytycki and
Swiatkowski; (ii) for every large enough integer $k$ there exists a fns
$4$-manifold $M_{2k}$ of Euler characteristic $2k$, and further, (iii) $M_{2k}$
admits a super-exponential number (in $k$) of fns triangulations - at least
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the "star-connected-sum" operation on such triangulations, which preserves the
fns property, from which we derive new constructions of fns $4$-manifolds. In
particular, we show the following: (i) there exist non-aspherical fns
$4$-manifolds, answering in the negative a question by Przytycki and
Swiatkowski; (ii) for every large enough integer $k$ there exists a fns
$4$-manifold $M_{2k}$ of Euler characteristic $2k$, and further, (iii) $M_{2k}$
admits a super-exponential number (in $k$) of fns triangulations - at least
$2^{\Omega(k \log k)}$ and at most $2^{O(k^{1.5} \log k)}$.</abstract><doi>10.48550/arxiv.2310.13495</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Combinatorics Mathematics - Geometric Topology |
| title | On flag-no-square $4$-manifolds |
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