Joan Birman, Peter Brinkmann, Keiko Kawamuro
Published 2010-01-28, updated 2012-04-18Version 7
We investigate the structure of the characteristic polynomial det(xI-T) of a transition matrix T that is associated to a train track representative of a pseudo-Anosov map [F] acting on a surface. As a result we obtain three new polynomial invariants of [F], one of them being the product of the other two, and all three being divisors of det(xI-T). The degrees of the new polynomials are invariants of [F ] and we give simple formulas for computing them by a counting argument from an invariant train track. We give examples of genus 2 pseudo-Anosov maps having the same dilatation, and use our invariants to distinguish them.
Comments: Published in Journal of Topology and Analysis, Vol. 4, No 1 (2012) 13-47
Journal: Journal of Topology and Analysis, Vol. 4, No 1 (2012) 13-47
A Transcendental Invariant of Pseudo-Anosov Maps
Polynomial invariants which can distinguish the orientations of knots
Polynomial Invariants, Knot Homologies, and Higher Twist Numbers of Weaving Knots $W(3,n)$
![QR code for arXiv:1001.5094 [math.GT]](http://oss.arxitics.com/images/favicon.svg)