Two fixed points of a topological dynamical system are said to be of the same type if there exists a homeomorphic conjugacy of the system into itself sending the one fixed point into the other. The system will be said to be homogeneous if all its fixed points are of the same type. We introduce algebraic methods to investigate related questions for the shifts of expanding maps
We study sequences of analytic conjugacy classes of rational maps which diverge in moduli space. In ...
In this work we show that two-piece eventually expanding maps have the same topological dynamics as ...
AbstractUsing topological conjugacies, a continuous mapping from the Cantor set onto itself approxim...
[EN] In this paper, we study the class of simple systems on R induced by homeomorphisms having finit...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
In this article, we review some of our research in the study of one-dimensional dynamical systems, i...
Many situations can be modeled as solutions of systems of simultaneous equations. If the functions o...
Abstract: Recently a new class of critical points, termed as perpetual points, where acceleration be...
This book provides an introduction to the topological classification of smooth structurally stable d...
AbstractWe will say that two subshifts are essentially conjugate if they are topologically conjugate...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
AbstractThe equivalence of existence of a Borel section to nonexistence of recurrent aperiodic point...
The problem stated in its most general terms is this. Given a space S and a mapping t of S into itse...
For diffeomorphisms on surfaces with basic sets, we show the following type of rigidity result: if a...
. If two smooth unimodal maps or real analytic critical circle maps have the same bounded combinator...
We study sequences of analytic conjugacy classes of rational maps which diverge in moduli space. In ...
In this work we show that two-piece eventually expanding maps have the same topological dynamics as ...
AbstractUsing topological conjugacies, a continuous mapping from the Cantor set onto itself approxim...
[EN] In this paper, we study the class of simple systems on R induced by homeomorphisms having finit...
We study fixed point theorems for maps which satisfy a property of stretching a suitably oriented to...
In this article, we review some of our research in the study of one-dimensional dynamical systems, i...
Many situations can be modeled as solutions of systems of simultaneous equations. If the functions o...
Abstract: Recently a new class of critical points, termed as perpetual points, where acceleration be...
This book provides an introduction to the topological classification of smooth structurally stable d...
AbstractWe will say that two subshifts are essentially conjugate if they are topologically conjugate...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
AbstractThe equivalence of existence of a Borel section to nonexistence of recurrent aperiodic point...
The problem stated in its most general terms is this. Given a space S and a mapping t of S into itse...
For diffeomorphisms on surfaces with basic sets, we show the following type of rigidity result: if a...
. If two smooth unimodal maps or real analytic critical circle maps have the same bounded combinator...
We study sequences of analytic conjugacy classes of rational maps which diverge in moduli space. In ...
In this work we show that two-piece eventually expanding maps have the same topological dynamics as ...
AbstractUsing topological conjugacies, a continuous mapping from the Cantor set onto itself approxim...
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