Add to ORKGIn 1977, Keane and Smorodinsky [2] proved the existence of a ni-tary homomorphism from any nite state Bernoulli process to any other nite state Bernoulli process of lower entropy. Using unit inter-val simulation, we dene such a homomorphism, in which the coding length has exponential tails.
This article defines the class of -valued autoregressive (AR) processes with a unit root of finite t...
We develop a relative isomorphism theory for random Bernoulli shifts by showing that any random Bern...
Classical Hausdorff dimension (sometimes called fractal dimension) was recently effectivized using g...
In 1977, Keane and Smorodinsky showed that there exists a finitary homomorphism from any finite-alph...
In 1977, Keane and Smorodinsky showed that there exists a fini-tary homomorphism from any finite-alp...
AbstractUsing the marker and filler methods of Keane and Smorodinsky, we prove that entropy is a com...
We study the existence of finitary codings (also called finitary homomorphisms or finitary factor ma...
AbstractIt is well known that for any two Bernoulli schemes with a finite number of states and unequ...
For any 1-1 measure preserving map T of a probability space we can form the [T , Id] and [T , T -1 ...
ABSTRACT. This document explores the Bernoulli operator, giving it a variety of different definition...
In these lectures I shall present some of the ideas and methods used in the proof of the celebrated ...
We define rank one for Zᵈ actions and show that those rank one actions with a certain tower shape ar...
For each real number β>1 the β-transformation is dened by Tβx = βx(mod1). In this paper the natural ...
We show that Bernoulli shifts induce, on a dense class of sets, weakly mixing automorphisms which ar...
Abstract. We consider the concepts of continuous Bernoulli sys-tems and non-commutative white noises...
This article defines the class of -valued autoregressive (AR) processes with a unit root of finite t...
We develop a relative isomorphism theory for random Bernoulli shifts by showing that any random Bern...
Classical Hausdorff dimension (sometimes called fractal dimension) was recently effectivized using g...
In 1977, Keane and Smorodinsky showed that there exists a finitary homomorphism from any finite-alph...
In 1977, Keane and Smorodinsky showed that there exists a fini-tary homomorphism from any finite-alp...
AbstractUsing the marker and filler methods of Keane and Smorodinsky, we prove that entropy is a com...
We study the existence of finitary codings (also called finitary homomorphisms or finitary factor ma...
AbstractIt is well known that for any two Bernoulli schemes with a finite number of states and unequ...
For any 1-1 measure preserving map T of a probability space we can form the [T , Id] and [T , T -1 ...
ABSTRACT. This document explores the Bernoulli operator, giving it a variety of different definition...
In these lectures I shall present some of the ideas and methods used in the proof of the celebrated ...
We define rank one for Zᵈ actions and show that those rank one actions with a certain tower shape ar...
For each real number β>1 the β-transformation is dened by Tβx = βx(mod1). In this paper the natural ...
We show that Bernoulli shifts induce, on a dense class of sets, weakly mixing automorphisms which ar...
Abstract. We consider the concepts of continuous Bernoulli sys-tems and non-commutative white noises...
This article defines the class of -valued autoregressive (AR) processes with a unit root of finite t...
We develop a relative isomorphism theory for random Bernoulli shifts by showing that any random Bern...
Classical Hausdorff dimension (sometimes called fractal dimension) was recently effectivized using g...