Michal Stukow
Published 2006-01-07Version 1
Let t_a be the Dehn twist about a circle a on an orientable surface. It is well known that for each circle b and an integer n, I(t_a^n(b),b)=|n|I(a,b)^2, where I(,) is the geometric intersection number. We prove a similar formula for circles on nonorientable surfaces. As a corollary we prove some algebraic properties of twists on nonorientable surfaces. We also prove that if M(N) is the mapping class group of a nonorientable surface N, then up to a finite number of exceptions, the centraliser of the subgroup of M(N) generated by the twists is equal to the centre of M(N) and is generated by twists about circles isotopic to boundary components of N.
Comments: 33 pages, 28 figures, to appear in Fundamenta Mathematicae
Journal: Fundamenta Mathematicae 189 (2006), 117-147
An algebraic characterization of a Dehn twist for nonorientable surfaces
On the commutator length of a Dehn twist
Simplicial Maps of the Complexes of Curves on Nonorientable Surfaces
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