Abstract
We present an explicit sequence of pseudo-Anosov maps $\phi_k: S_{2k}\rightarrow S_{2k}$ of surfaces of genus $2k$ whose growth rates converge to one.
Citation
Peter Brinkmann. "A Note on Pseudo-Anosov Maps with Small Growth Rate." Experiment. Math. 13 (1) 49 - 54, 2004.
Information
Published: 2004
First available in Project Euclid: 10 June 2004
zbMATH: 1049.37029
MathSciNet: MR2065567
Subjects:
Primary:
37E30
Keywords:
growth rates
,
Pseudo-Anosov homeomorphisms
,
train tracks
Rights: Copyright © 2004 A K Peters, Ltd.