Fabien Durand
Published 2008-07-28Version 1
A minimal subshift $(X,T)$ is linearly recurrent if there exists a constant $K$ so that for each clopen set $U$ generated by a finite word $u$ the return time to $U$, with respect to $T$, is bounded by $K|u|$. We prove that given a linearly recurrent subshift $(X,T)$ the set of its non-periodic subshift factors is finite up to isomorphism. We also give a constructive characterization of these subshifts.
Journal: Ergodic Theory and Dynamical Systems 20 (2000) 1061-1078
Large deviation for return times
Growth of the number of geodesics between points and insecurity for riemannian manifolds
Corrigendum and addendum to: Linearly recurrent subshifts have a finite number of non-periodic factors
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