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Torsions and intersection forms of 4-manifolds from trisection diagrams

Published online by Cambridge University Press:  14 December 2020

Vincent Florens*
Affiliation:
Université de Pau, Pau, Laboratoire LMAP, France e-mail: vincent.florens@univ-pau.fr
Delphine Moussard
Affiliation:
Université d’Aix-Marseille, I2M, Marseille, France

Abstract

Gay and Kirby introduced trisections, which describe any closed, oriented, smooth 4-manifold X as a union of three 4-dimensional handlebodies. A trisection is encoded in a diagram, namely three collections of curves in a closed oriented surface $\Sigma $ , guiding the gluing of the handlebodies. Any morphism $\varphi $ from $\pi _1(X)$ to a finitely generated free abelian group induces a morphism on $\pi _1(\Sigma )$ . We express the twisted homology and Reidemeister torsion of $(X;\varphi )$ in terms of the first homology of $(\Sigma ;\varphi )$ and the three subspaces generated by the collections of curves. We also express the intersection form of $(X;\varphi )$ in terms of the intersection form of $(\Sigma ;\varphi )$ .

Type
Article
Copyright
© Canadian Mathematical Society 2020

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Footnotes

The first author was partially supported by the ANR Project LISA 17-CE40-0023-01. While working on the contents of this paper, the second author has been supported by a Postdoctoral Fellowship of the Japan Society for the Promotion of Science. She is grateful to Tomotada Ohtsuki and the Research Institute for Mathematical Sciences for their support. She is now supported by the Région Bourgogne Franche-Comté project ITIQ–3D. She thanks Gwénaël Massuyeau and the Institut de Mathématiques de Bourgogne for their support.

References

Blanchfield, R. C., Intersection theory of manifolds with operators with applications to knot theory . Ann. Math. Second Series 65(1957), 340356.CrossRefGoogle Scholar
Feller, P., Klug, M., Schirmer, T., and Zemke, D., Calculating the homology and intersection form of a $4$ -manifold from a trisection diagram. Proc. Natl. Acad. Sci. U.S.A. 115(2018), no. 43, 1086910874. http://doi.org/10.1073/pnas.1717176115 CrossRefGoogle ScholarPubMed
Gay, D. and Kirby, R., Trisecting 4-manifolds . Geom. Topol. 20(2016), no. 6, 30973132.CrossRefGoogle Scholar
Kirk, P. and Livingston, C., Twisted Alexander invariants, Reidemeister torsion, and Casson–Gordon invariants . Topology. 38(1999), no. 3, 635661.CrossRefGoogle Scholar
Koenig, D., Trisections of 3-manifold bundles over S1 . Preprint, 2017. arxiv:1710.04345 Google Scholar
Laudenbach, F. and Poénaru, V., A note on 4-dimensional handlebodies . Bull. Soc. Math. France 100(1972), 337344.CrossRefGoogle Scholar
Milnor, J., Whitehead torsion . Bull. Amer. Math. Soc. 72(1966), 358426.CrossRefGoogle Scholar
Ranicki, A., The Maslov index and the Wall signature non-additivity invariant. Unpublished, 1997. https://www.maths.ed.ac.uk/~v1ranick/papers/maslov.pdf Google Scholar
Reidemeister, K., Durchschnitt und Schnitt von Homotopieketten. Monatshefte für Mathematik und Physik 48 (1939), pp. 226239.Google Scholar
Turaev, V., Introduction to combinatorial torsions. In Notes taken by Felix Schlenk, Lectures in Mathematics ETH Zürich, Birkhäuser Verlag, Basel, 2001.CrossRefGoogle Scholar
Wall, C. T. C., Non-additivity of the signature . Invent. Math. 7(1969), 269274.CrossRefGoogle Scholar