Positive factorizations of mapping classes

Baykur, R İnanç; Monden, Naoyuki; Van Horn-Morris, Jeremy

doi:10.2140/agt.2017.17.1527

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Positive factorizations of mapping classes

R İnanç Baykur, Naoyuki Monden and Jeremy Van Horn-Morris

Algebraic & Geometric Topology 17 (2017) 1527–1555

DOI: 10.2140/agt.2017.17.1527

Abstract

In this article, we study the maximal length of positive Dehn twist factorizations of surface mapping classes. In connection to fundamental questions regarding the uniform topology of symplectic $4$ –manifolds and Stein fillings of contact $3$ –manifolds coming from the topology of supporting Lefschetz pencils and open books, we completely determine which boundary multitwists admit arbitrarily long positive Dehn twist factorizations along nonseparating curves, and which mapping class groups contain elements admitting such factorizations. Moreover, for every pair of positive integers $g$ and $n$ , we tell whether or not there exist genus- $g$ Lefschetz pencils with $n$ base points, and if there are, what the maximal Euler characteristic is whenever it is bounded above. We observe that only symplectic $4$ –manifolds of general type can attain arbitrarily large topology regardless of the genus and the number of base points of Lefschetz pencils on them.

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Keywords

mapping class groups, Lefschetz fibrations, contact manifolds, symplectic manifolds

Mathematical Subject Classification 2010

Primary: 20F65, 53D35, 57R17

References

Publication

Received: 24 September 2015

Revised: 13 May 2016

Accepted: 7 June 2016

Published: 17 July 2017

Authors

R İnanç Baykur
Department of Mathematics and Statistics University of Massachusetts Lederle Graduate Research Tower 710 North Pleasant Street Amherst, MA 01003-9305 United States

Naoyuki Monden
Department of Engineering Science Osaka Electro-Communication University Hatsu-cho 18-8 Neyagawa 572-8530 Japan

Jeremy Van Horn-Morris
Department of Mathematical Sciences The University of Arkansas Fayetteville, AR 72701 United States

Volume 17, issue 3 (2017)