peer reviewedThe entropy of a symbolic dynamical system is usually defined in terms of the growth rate of the number of distinct allowed factors of length $n$. Bandt, Keller and Pompe showed that, for piecewise monotone interval maps, the entropy is also given by the number of permutations defined by consecutive elements in the trajectory of a point. This result is the starting point of several works of Elizalde where he investigates permutations in shift systems, notably in full shifts and in beta-shifts. The goal of this talk is to survey Elizalde's results. I will end by mentioning the case of negative beta-shifts, which has been simultaneously studied by Elizalde and Moore on the one hand, and by Steiner and myself on the other hand
A well-known formula for the topological entropy of a symbolic system is htop(X) = limn→∞ log N(Λn)/...
AbstractThe scope of this paper is two-fold. First, to present to the researchers in combinatorics a...
Abstract. If an ergodic system has positive entropy, then the Shannon-McMillan-Breiman theorem provi...
The study of permutation complexity can be envisioned as a new kind of symbolic dynamics whose basic...
Elizalde (2011) characterized which permutations can be obtained by ordering consecutive elements in...
Entropy is a powerful tool for the analysis of time series, as it allows describing the probability ...
We analyze the effects of noise on the permutation entropy of dynamical systems. We take as numerica...
In this paper we discuss the relationship between permutation entropy and Kolmogorov-Sinai entropy i...
Abstract—A Motzkin shift is a mathematical model for constraints on genetic sequences. In terms of t...
Entropy is a powerful tool for the analysis of time series, as it allows describing the probability ...
By appealing to a long list of different nonlinear maps we review the characterization of time serie...
In joint work with Ibrahim Salama, we study the complexity function $p_\tau(n)$ of a labeled tree o...
In this paper we discuss subsystem and coding results in Zd symbolic dynamics for d greater than 1. ...
By appealing to a long list of different nonlinear maps we review the characterization of ...
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
A well-known formula for the topological entropy of a symbolic system is htop(X) = limn→∞ log N(Λn)/...
AbstractThe scope of this paper is two-fold. First, to present to the researchers in combinatorics a...
Abstract. If an ergodic system has positive entropy, then the Shannon-McMillan-Breiman theorem provi...
The study of permutation complexity can be envisioned as a new kind of symbolic dynamics whose basic...
Elizalde (2011) characterized which permutations can be obtained by ordering consecutive elements in...
Entropy is a powerful tool for the analysis of time series, as it allows describing the probability ...
We analyze the effects of noise on the permutation entropy of dynamical systems. We take as numerica...
In this paper we discuss the relationship between permutation entropy and Kolmogorov-Sinai entropy i...
Abstract—A Motzkin shift is a mathematical model for constraints on genetic sequences. In terms of t...
Entropy is a powerful tool for the analysis of time series, as it allows describing the probability ...
By appealing to a long list of different nonlinear maps we review the characterization of time serie...
In joint work with Ibrahim Salama, we study the complexity function $p_\tau(n)$ of a labeled tree o...
In this paper we discuss subsystem and coding results in Zd symbolic dynamics for d greater than 1. ...
By appealing to a long list of different nonlinear maps we review the characterization of ...
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
A well-known formula for the topological entropy of a symbolic system is htop(X) = limn→∞ log N(Λn)/...
AbstractThe scope of this paper is two-fold. First, to present to the researchers in combinatorics a...
Abstract. If an ergodic system has positive entropy, then the Shannon-McMillan-Breiman theorem provi...