We develop a relative isomorphism theory for random Bernoulli shifts by showing that any random Bernoulli shifts are relatively isomorphic if and only if they have the same fibre entropy. This allows the identification of random Bernoulli shifts with standard Bernoulli shifts
Abstract: The Bernoulli shift is a fundamental theoretic model of a sequence of independent and iden...
AbstractFor a nonatomic Borel probability measure μ on a Polish space X, an isomorphism from (X, μ) ...
We prove that for a certain class of $ℤ^d$ shifts of finite type with positive topological entropy t...
AbstractUsing the marker and filler methods of Keane and Smorodinsky, we prove that entropy is a com...
In these lectures I shall present some of the ideas and methods used in the proof of the celebrated ...
We construct a geometrico-symbolic version of the natural extension of the random β-transformation i...
For any 1-1 measure preserving map T of a probability space we can form the [T , Id] and [T , T -1 ...
version 2: correction of typosExtending work of Hochman, we study the almost-Borel structure, i.e., ...
Almost isomorphism is an equivalence relation on countable state Markov shifts which provides a stro...
In this paper we discuss loosely Bernoulli for Z(d) actions. In particular, we prove that extensions...
We show that Bernoulli shifts induce, on a dense class of sets, weakly mixing automorphisms which ar...
In this paper, we prove that Pesin's entropy formula for random diffeomorphisms holds if and on...
Abstract. In this paper we discuss loosely Bernoulli for Zd actions. In par-ticular, we prove that e...
I will show that if a free ergodic action of a countable group has positive Rokhlin entropy (or, les...
Countable state Markov shifts are a natural generalization of the well-known subshifts of finite typ...
Abstract: The Bernoulli shift is a fundamental theoretic model of a sequence of independent and iden...
AbstractFor a nonatomic Borel probability measure μ on a Polish space X, an isomorphism from (X, μ) ...
We prove that for a certain class of $ℤ^d$ shifts of finite type with positive topological entropy t...
AbstractUsing the marker and filler methods of Keane and Smorodinsky, we prove that entropy is a com...
In these lectures I shall present some of the ideas and methods used in the proof of the celebrated ...
We construct a geometrico-symbolic version of the natural extension of the random β-transformation i...
For any 1-1 measure preserving map T of a probability space we can form the [T , Id] and [T , T -1 ...
version 2: correction of typosExtending work of Hochman, we study the almost-Borel structure, i.e., ...
Almost isomorphism is an equivalence relation on countable state Markov shifts which provides a stro...
In this paper we discuss loosely Bernoulli for Z(d) actions. In particular, we prove that extensions...
We show that Bernoulli shifts induce, on a dense class of sets, weakly mixing automorphisms which ar...
In this paper, we prove that Pesin's entropy formula for random diffeomorphisms holds if and on...
Abstract. In this paper we discuss loosely Bernoulli for Zd actions. In par-ticular, we prove that e...
I will show that if a free ergodic action of a countable group has positive Rokhlin entropy (or, les...
Countable state Markov shifts are a natural generalization of the well-known subshifts of finite typ...
Abstract: The Bernoulli shift is a fundamental theoretic model of a sequence of independent and iden...
AbstractFor a nonatomic Borel probability measure μ on a Polish space X, an isomorphism from (X, μ) ...
We prove that for a certain class of $ℤ^d$ shifts of finite type with positive topological entropy t...