Add to ORKGIn this paper, we analyze dynamical systems using low separation axioms. In particular, we characterize the T_{2} separation axiom for dynamical systems and describe "T_{2}" dynamical systems. We also characterize recurrence of orbits
AbstractA subset X of a vector space V is said to have the “Separation Property” if it separates lin...
This book provides the first self-contained comprehensive exposition of the theory of dynamical syst...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
Topology is a beautiful science and forms a bridge between geometry and algebra.Topology means (Topo...
In this journey, we are going to explore the separation axioms in greater detail. Separation a...
AbstractThis paper surveys applications of low-dimensional topology to the study of the dynamics of ...
summary:Let $T$ be a permutation of an abstract set $X$. In ZFC, we find a necessary and sufficient ...
This book provides an introduction to the topological classification of smooth structurally stable d...
In this paper various types of separation axioms are studied. The ideas behind these results origina...
The classical (point-set) topology concerns points and relationships between points and subsets. Omi...
AbstractThe equivalence of existence of a Borel section to nonexistence of recurrent aperiodic point...
Abstract. In his seminal paper of 1967 on disjointness in topological dynamics and ergodic theory H....
The purpose of this thesis is to briefly investigate ideas of Wilansky [2] on separation axioms betw...
summary:We propose the title of The Fundamental Theorem of Dynamical Systems for a theorem of Charle...
summary:The problem of topological classification is fundamental in the study of dynamical systems. ...
AbstractA subset X of a vector space V is said to have the “Separation Property” if it separates lin...
This book provides the first self-contained comprehensive exposition of the theory of dynamical syst...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...
Topology is a beautiful science and forms a bridge between geometry and algebra.Topology means (Topo...
In this journey, we are going to explore the separation axioms in greater detail. Separation a...
AbstractThis paper surveys applications of low-dimensional topology to the study of the dynamics of ...
summary:Let $T$ be a permutation of an abstract set $X$. In ZFC, we find a necessary and sufficient ...
This book provides an introduction to the topological classification of smooth structurally stable d...
In this paper various types of separation axioms are studied. The ideas behind these results origina...
The classical (point-set) topology concerns points and relationships between points and subsets. Omi...
AbstractThe equivalence of existence of a Borel section to nonexistence of recurrent aperiodic point...
Abstract. In his seminal paper of 1967 on disjointness in topological dynamics and ergodic theory H....
The purpose of this thesis is to briefly investigate ideas of Wilansky [2] on separation axioms betw...
summary:We propose the title of The Fundamental Theorem of Dynamical Systems for a theorem of Charle...
summary:The problem of topological classification is fundamental in the study of dynamical systems. ...
AbstractA subset X of a vector space V is said to have the “Separation Property” if it separates lin...
This book provides the first self-contained comprehensive exposition of the theory of dynamical syst...
Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic ...