Add to ORKGInternational audienceWe give a description of the link between topological dynamical systems and their dimension groups. The focus is on minimal systems and, in particular, on substitution shifts. We describe in detail the various classes of systems including Sturmian shifts and interval exchange shifts. This is a preliminary version of a book which will be published by Cambridge University Press. Any comments are of course welcome
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
Abstract: The key idea here is borrowed from dimension theory. The starting point is a new concept w...
This monograph aims to provide an advanced account of some aspects of dynamical systems in the frame...
International audienceWe give a description of the link between topological dynamical systems and th...
International audienceWe give a description of the link between topological dynamical systems and th...
Translated from the popular French edition, the goal of the book is to provide a self-contained intr...
International audienceThe present paper explores substitution minimal systems and their relation to ...
The theory of general dynamical systems evolved originally in the context of modeling movement in ph...
Dynamical systems are abundant in theoretical physics and engineering. Their understanding, with suf...
When we have two extensions of a Cantor minimal system which are both one-to-one on at least one orb...
In another article we associated a dynamical system to a non-properly ordered Bratteli diagram. In t...
In another article we associated a dynamical system to a non- properly ordered Bratteli diagram. In ...
When we have two extensions of a Cantor minimal system which are both one-to-one on at least one orb...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
The purpose of this note is to point out some of the phenomena which arise in the transition from cl...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
Abstract: The key idea here is borrowed from dimension theory. The starting point is a new concept w...
This monograph aims to provide an advanced account of some aspects of dynamical systems in the frame...
International audienceWe give a description of the link between topological dynamical systems and th...
International audienceWe give a description of the link between topological dynamical systems and th...
Translated from the popular French edition, the goal of the book is to provide a self-contained intr...
International audienceThe present paper explores substitution minimal systems and their relation to ...
The theory of general dynamical systems evolved originally in the context of modeling movement in ph...
Dynamical systems are abundant in theoretical physics and engineering. Their understanding, with suf...
When we have two extensions of a Cantor minimal system which are both one-to-one on at least one orb...
In another article we associated a dynamical system to a non-properly ordered Bratteli diagram. In t...
In another article we associated a dynamical system to a non- properly ordered Bratteli diagram. In ...
When we have two extensions of a Cantor minimal system which are both one-to-one on at least one orb...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
The purpose of this note is to point out some of the phenomena which arise in the transition from cl...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
Abstract: The key idea here is borrowed from dimension theory. The starting point is a new concept w...
This monograph aims to provide an advanced account of some aspects of dynamical systems in the frame...