FUNDAMENTALNAYA I PRIKLADNAYA MATEMATIKA

(FUNDAMENTAL AND APPLIED MATHEMATICS)

2005, VOLUME 11, NUMBER 5, PAGES 47-55

A bound for the topological entropy of homeomorphisms of a punctured two-dimensional disk

O. N. Biryukov

Abstract

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We consider homeomorphisms $f$ of a punctured $2$-disk $D2\backslash P$, where $P$ is a finite set of interior points of $D2$, which leave the boundary points fixed. Any such homeomorphism induces an automorphism $f$_* of the fundamental group of $D2\backslash P$. Moreover, to each homeomorphism $f$, a matrix $B$_f(t) from $GL(n,$Z[t,t⁻¹]) can be assigned by using the well-known Burau representation.

The purpose of this paper is to find a nontrivial lower bound for the topological entropy of $f$. First, we consider the lower bound for the entropy found by R. Bowen by using the growth rate of the induced automorphism $f$_*. Then we analyze the argument of B. Kolev, who obtained a lower bound for the topological entropy by using the spectral radius of the matrix $B$_f(t), where $t$Î C, and slightly improve his result.

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Last modified: February 26, 2006