The strip entropy is studied in this article. We prove that the strip entropy approximation is valid for every ray of a golden-mean tree. This result extends the previous result of [Petersen-Salama, Discrete \& Continuous Dynamical Systems, 2020] on the conventional 2-tree. Lastly, we prove that the strip entropy approximation is valid for eventually periodic rays of a class of Markov-Cayley trees
AbstractBy constructing a non-negative martingale on a homogeneous tree, a class of small deviation ...
Consider, for any n ∈ N, the set Posn of all n-periodic tree patterns with positive topological entr...
AbstractIn this paper we show that if f:I→I is a map such that the inverse limit space, P=lim←{I,f}i...
In joint work with Ibrahim Salama, we study the complexity function $p_\tau(n)$ of a labeled tree o...
We study the topological entropy of hom tree-shifts and show that, although the topological entropy ...
Given a Zd topological Markov shift S and a d×d integer matrix M with det(M) ¹ 0, we introduce the M...
A well-known formula for the topological entropy of a symbolic system is htop(X) = limn→∞ log N(Λn)/...
AbstractWe present the anisotropic version of the classical Alon–Boppana theorem on the asymptotic s...
We present a method to compute rigorous upper bounds for the topological entropy h(T,A) of a continu...
In this paper we discuss subsystem and coding results in Zd symbolic dynamics for d greater than 1. ...
The Markov-Dyck shifts arise from finite directed graphs. An expression for the zeta function of a M...
Artículo de publicación ISIIn [9], Hochman and Meyerovitch gave a complete characterization of the s...
Let χ be the class of 1-D and 2-D subshifts. This thesis defines a new function, HS : χ x R → [0,∞] ...
We extend the classical notion of block structure for periodic orbits of interval maps to the settin...
We apply coupling techniques in order to prove that the transfer operators associated with random to...
AbstractBy constructing a non-negative martingale on a homogeneous tree, a class of small deviation ...
Consider, for any n ∈ N, the set Posn of all n-periodic tree patterns with positive topological entr...
AbstractIn this paper we show that if f:I→I is a map such that the inverse limit space, P=lim←{I,f}i...
In joint work with Ibrahim Salama, we study the complexity function $p_\tau(n)$ of a labeled tree o...
We study the topological entropy of hom tree-shifts and show that, although the topological entropy ...
Given a Zd topological Markov shift S and a d×d integer matrix M with det(M) ¹ 0, we introduce the M...
A well-known formula for the topological entropy of a symbolic system is htop(X) = limn→∞ log N(Λn)/...
AbstractWe present the anisotropic version of the classical Alon–Boppana theorem on the asymptotic s...
We present a method to compute rigorous upper bounds for the topological entropy h(T,A) of a continu...
In this paper we discuss subsystem and coding results in Zd symbolic dynamics for d greater than 1. ...
The Markov-Dyck shifts arise from finite directed graphs. An expression for the zeta function of a M...
Artículo de publicación ISIIn [9], Hochman and Meyerovitch gave a complete characterization of the s...
Let χ be the class of 1-D and 2-D subshifts. This thesis defines a new function, HS : χ x R → [0,∞] ...
We extend the classical notion of block structure for periodic orbits of interval maps to the settin...
We apply coupling techniques in order to prove that the transfer operators associated with random to...
AbstractBy constructing a non-negative martingale on a homogeneous tree, a class of small deviation ...
Consider, for any n ∈ N, the set Posn of all n-periodic tree patterns with positive topological entr...
AbstractIn this paper we show that if f:I→I is a map such that the inverse limit space, P=lim←{I,f}i...