arXiv:1102.4809 Abstract | arXiv Analytics

arXiv:1102.4809 [math.AT]Abstract References Reviews Resources

A computation of H^1(Γ, H_1(Σ))

Published 2011-02-23Version 1

Let \Sigma = \Sigma _{g,1} be a compact surface of genus g at least 3 with one boundary component, \Gamma its mapping class group and M = H_1(\Sigma , Z) the first integral homology of \Sigma . Using that \Gamma is generated by the Dehn twists in a collection of 2g+1 simple closed curves (Humphries' generators) and simple relations between these twists, we prove that H^1(\Gamma , M) is either trivial or isomorphic to Z. Using Wajnryb's presentation for \Gamma in terms of the Humphries generators we can show that it is not trivial.

Comments: 9 pages, 1 figure

Categories: math.AT

Subjects: 57M60, 20J06

Keywords: computation, first integral homology, compact surface, wajnrybs presentation, simple relations

Related articles: Most relevant | Search more

arXiv:0905.3121 [math.AT] (Published 2009-05-19)

The computation of Stiefel-Whitney classes

Pierre Guillot

arXiv:2203.07767 [math.AT] (Published 2022-03-15)

Homological stability: a tool for computations

Nathalie Wahl

arXiv:1311.5705 [math.AT] (Published 2013-11-22, updated 2014-02-05)

The 2-torsion in the second homology of the genus $3$ mapping class group

Wolfgang Pitsch

arXiv Analytics

arXiv:1102.4809 [math.AT]Abstract References Reviews Resources

A computation of H^1(Γ, H_1(Σ))

Links

Toolbox

arXiv:1102.4809 [math.AT]AbstractReferencesReviewsResources

A computation of H^1(Γ, H_1(Σ))

Links

Toolbox

arXiv:1102.4809 [math.AT]Abstract References Reviews Resources