Simplifying indefinite fibrations on 4-manifolds

Baykur, R. İnanç; Saeki, Osamu

doi:10.1090/tran/8325

Cited by 8 publications

(13 citation statements)

References 71 publications

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“…Since the path is constant near the boundary circles it can be viewed as a generic path of functions on the original surface Σ, giving the desired homotopy f t for t ∈ [ 2 6 , 5 6 ] thus completing the homotopy f t for t ∈ [0, 1]. Repeating the process we can find a generic path f t for t ∈ [1,2]. Composing the two homotopies gives the desired result.…”

Section: Morse Functions and The Dual Handlebody Complexmentioning

confidence: 99%

“…We next seek to understand how vanishing cycles change as we modify a Morse 2-function. Following [2], we say a local modification of critical images which takes a critical image C 0 and produces a critical image C 1 is always realizable if there is a smooth 1-parameter family of smooth maps F t : X such that the critical image of F 0 is C 0 and the critical image of F 1 is C 1 . We will need three particular always realizable moves in this paper.…”

Section: Reference Paths and Modifications Of Wrinkled Fibrationsmentioning

confidence: 99%

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Uniqueness of 4-manifolds described as sequences of 3-d handlebodies

Islambouli¹

2021

Preprint

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Given a description of a manifold, two natural questions arise: existence and uniqueness. For example, closed, orientable 3-manifolds can be described as surgeries on a link in S 3 . The existence problem for this description was addressed by Lickorish and Wallace [21] [29] who showed that any closed, orientable 3-manifold is given by surgery on a link in S 3 . In [15], Kirby proved a uniqueness theorem for these descriptions, showing that any two link-surgeries yielding the same 3-manifold are related by handle slides and blowups. Similarly, Moise [24] showed that every closed, orientable 3-manifold can be described as a Heegaard splitting, and Reidemeister and Singer [26] [25] showed that any two Heegaard splittings giving the same 3-manifold are related by a stabilization operation.Moving up a dimension, there has been a variety of new descriptions of smooth, orientable, closed 4-manifolds. In [8], Gay showed that any such 4manifold can be described as a loop of Morse functions on a surface, and used this fact to give a novel proof of that the smooth, oriented, 4-dimensional cobordism group is isomorphic to Z. In [17], Klug and the author showed that these 4-manifolds can be represented as a loop in the pants complex, and this was used to provide a combinatorial calculation of the aforementioned cobordism group as well as to give invariants of loops in the pants complex. Kirby and Thompson [16] have also showed that any such 4-manifold can be described as a loop in the cut complex, and they used this to define an invariant of 4-manifolds which detects the 4-sphere among homotopy spheres. Finally, in [13] Naylor and the author introduced multisections of 4-manifolds and used them to describe 4manifold operations such as cork twisting and log transforms diagrammatically on a surface.As these descriptions all stem from trisections [7], there are inherent similarities between them. Most obviously, all of the information in these decompositions can be given on a surface. Nevertheless it was not clear how to pass between these descriptions. The first half of this paper is focused on constructing explicit correspondences between certain quotients of the aforementioned sets. These quotients still retain all of the information needed to construct a unique smooth 4-manifold, together with a multisection structure.The second half of the paper is dedicated to showing how any two multi-1

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Section: Morse Functions and The Dual Handlebody Complexmentioning

confidence: 99%

Section: Reference Paths and Modifications Of Wrinkled Fibrationsmentioning

confidence: 99%

Uniqueness of 4-manifolds described as sequences of 3-d handlebodies

Islambouli¹

2021

Preprint

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“…In this section we discuss connections to stable maps of 4-manifolds to the disk. The reader is referred to [BS17] for an overview of the topic well suited to our setting and to [GG73] for the theoretical underpinnings of the subject. The smooth Figure 22.…”

Section: Multisections and Stable Mapsmentioning

confidence: 99%

Multisections of 4-manifolds

Islambouli¹,

Naylor²

2020

Preprint

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We introduce multisections of smooth, closed 4-manifolds, which generalize trisections to decompositions with more than three pieces. This decomposition describes an arbitrary smooth, closed 4-manifold as a sequence of cut systems on a surface. We show how to carry out many smooth cut and paste operations in terms of these cut systems. In particular, we show how to implement a cork twist, whereby we show that an arbitrary exotic pair of smooth 4-manifolds admit 4-sections differing only by one cut system. By carrying out fiber sums and log transforms, we also show that the elliptic fibrations E(n)p,q all admit genus 3 multisections, and draw explicit diagrams for these manifolds.

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“…Note that such an algorithmic construction is an important ingredient in [3,4] for constructing simplified broken Lefschetz fibrations and simplified trisections on fourdimensional manifolds.…”

Section: A New Proofmentioning

confidence: 99%

“…This made an explicit construction very hard to realize. On the contrary, our new proof presented in this paper modifies the original map only by homotopy: furthermore, it is not only constructive, but also algorithmic, which is an important ingredient for the simplification process for maps on 4-manifolds proposed in [3] (see also [4]).…”

Section: Introductionmentioning

confidence: 99%

Elimination of Definite Fold. Ii

Saeki

2019

Kyushu J. Math.

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In this paper, we first give a new simple proof for the elimination theorem of definite folds by homotopy for generic smooth maps of manifolds of dimension strictly greater than two into the 2-sphere or into the real projective plane. Our new proof has the advantage that it is not only constructive, but also algorithmic: the procedure enables us to construct various explicit examples. We also study simple stable maps of 3-manifolds into the 2-sphere without definite folds. Furthermore, we prove the non-existence of singular Legendre fibrations on 3-manifolds, answering negatively a question posed in our previous paper.

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Simplifying indefinite fibrations on 4-manifolds

Cited by 8 publications

References 71 publications

Uniqueness of 4-manifolds described as sequences of 3-d handlebodies

Uniqueness of 4-manifolds described as sequences of 3-d handlebodies

Multisections of 4-manifolds

Elimination of Definite Fold. Ii

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