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Stability of the maximal measurefor piecewise monotonic interval maps

Published online by Cambridge University Press:  01 December 1997

PETER RAITH
Affiliation:
Institut für Mathematik, Universität Wien, Strudlhofgasse 4, A–1090 Wien, Austria (e-mail: peter@banach.mat.univie.ac.at)

Abstract

Let $T:X\to{\Bbb R}$ be a piecewise monotonic map, where $X$ is a finite union of closed intervals. Define $R(T)=\bigcap_{n=0}^{\infty} \overline{T^{-n}X}$, and suppose that $(R(T),T)$ has a unique maximal measure $\mu$. The influence of small perturbations of $T$ on the maximal measure is investigated. If $(R(T),T)$ has positive topological entropy, and if a certain stability condition is satisfied, then every piecewise monotonic map $\tilde{T}$, which is contained in a sufficiently small neighbourhood of $T$, has a unique maximal measure $\tilde{\mu}$, and the map $\tilde{T}\mapsto\tilde{\mu}$ is continuous at $T$.

Type
Research Article
Copyright
1997 Cambridge University Press

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