Comparing 4–manifolds in the pants complex
via trisections

Islambouli, Gabriel

doi:10.2140/agt.2018.18.1799

Cited by 2 publications

(1 citation statement)

References 12 publications

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“…The theory of trisections was introduced by Gay and Kirby as a novel way of studying the smooth topology of 4-manifolds [10]. Since then, the theory has developed in a number of directions: Extensions of the theory to the settings of manifolds with boundary [6,7,8], knotted surfaces [22], algebraic objects [1], and higher dimensional manifolds [29] have been established; programs offering connections with singularity theory [9,10,11,12], and Dehn surgery [20,23], have been initiated; some classification results have been obtained [20,24]; interpretations of constructions and cutand-paste operation have been explored [13]; and new invariants have been proposed [15,18]. The purpose of this note is two-fold: motivate an extension of the classification program and generate a rich set of examples of manifolds with trisection diagrams that are simple enough to be amenable to study.…”

Section: Outlinementioning

confidence: 99%

Trisections and spun four-manifolds

Meier

2018

Mathematical Research Letters

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We study trisections of 4-manifolds obtained by spinning and twist-spinning 3-manifolds, and we show that, given a (suitable) Heegaard diagram for the 3-manifold, one can perform simple local modifications to obtain a trisection diagram for the 4-manifold. We also show that this local modification can be used to convert a (suitable) doubly-pointed Heegaard diagram for a 3-manifold/knot pair into a doubly-pointed trisection diagram for the 4-manifold/2-knot pair resulting from the twist-spinning operation.This technique offers a rich list of new manifolds that admit trisection diagrams that are amenable to study. We formulate a conjecture about 4-manifolds with trisection genus three and provide some supporting evidence. 1 We call a 4-manifold X irreducible if each summand of any connected sum decomposition of X is either X or a homotopy 4-sphere.

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Section: Outlinementioning

confidence: 99%

Trisections and spun four-manifolds

Meier

2018

Mathematical Research Letters

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Simplifying indefinite fibrations on 4-manifolds

Baykur

Saeki

2023

Trans. Amer. Math. Soc.

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The main goal of this article is to connect some recent perspectives in the study of 4 4 -manifolds from the vantage point of singularity theory. We present explicit algorithms for simplifying the topology of various maps on 4 4 -manifolds, which include broken Lefschetz fibrations and indefinite Morse 2 2 -functions. The algorithms consist of sequences of moves, which modify indefinite fibrations in smooth 1 1 -parameter families. These algorithms allow us to give purely topological and constructive proofs of the existence of simplified broken Lefschetz fibrations and Morse 2 2 -functions on general 4 4 -manifolds, and a theorem of Auroux–Donaldson–Katzarkov on the existence of certain broken Lefschetz pencils on near-symplectic 4 4 -manifolds. We moreover establish a correspondence between broken Lefschetz fibrations and Gay–Kirby trisections of 4 4 -manifolds, and show the existence and stable uniqueness of simplified trisections on all 4 4 -manifolds. Building on this correspondence, we also provide several new constructions of trisections, including infinite families of genus- 3 3 trisections with homotopy inequivalent total spaces, and exotic same genera trisections of 4 4 -manifolds in the homeomorphism classes of complex rational surfaces.

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Comparing 4–manifolds in the pants complex via trisections

Cited by 2 publications

References 12 publications

Trisections and spun four-manifolds

Trisections and spun four-manifolds

Simplifying indefinite fibrations on 4-manifolds

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