Add to ORKGAbstract. We study the concepts of continuous shadowing and inverse shad-owing in multidimensional dynamical systems (in particular, Z2-actions), and the problems related to stability are considered. 1
By the Shadowing Lemma we can shadow any sufficient accurate pseudo-trajectory of a hyperbolic syste...
AbstractLet Z(M) be the space of discrete dynamical systems with the C0-topology on a manifold M. It...
Abstract. We use a weaker version of the celebrated Newton–Kantorovich theorem [3] reported by us in...
This book is an introduction to the theory of shadowing of approximate trajectories in dynamical sys...
Focusing on the theory of shadowing of approximate trajectories (pseudotrajectories) of dynamical sy...
2007 We introduce a new hyperbolicity condition for set-valued dynam-ical systems and show that this...
We obtain several results on shadowing and inverse shadowing for set-valued dynamical systems that ...
AbstractWe study linear dynamical systems with multidimensional time in Banach spaces. Using Taylor ...
In this paper, we study relations between shadowing and inverse shadowing for homeomorphisms of a co...
Abstract. We give characterizations of linear dynamical systems via var-ious inverse shadowing prope...
In this paper we introduce a new notion, named controlled shadowing property and we relate it to som...
Rieger J. Shadowing and numerical analysis of set-valued dynamical systems. Bielefeld (Germany): Bie...
AMS Subject Classification 58F15 1 Introduction Computer simulations provide much practical informa...
AbstractWe present, as a simpler alternative for the results of [P. Kościelniak, On genericity of sh...
We discuss a system with a discontinuity moments generator to obtain the solutions. It is proven tha...
By the Shadowing Lemma we can shadow any sufficient accurate pseudo-trajectory of a hyperbolic syste...
AbstractLet Z(M) be the space of discrete dynamical systems with the C0-topology on a manifold M. It...
Abstract. We use a weaker version of the celebrated Newton–Kantorovich theorem [3] reported by us in...
This book is an introduction to the theory of shadowing of approximate trajectories in dynamical sys...
Focusing on the theory of shadowing of approximate trajectories (pseudotrajectories) of dynamical sy...
2007 We introduce a new hyperbolicity condition for set-valued dynam-ical systems and show that this...
We obtain several results on shadowing and inverse shadowing for set-valued dynamical systems that ...
AbstractWe study linear dynamical systems with multidimensional time in Banach spaces. Using Taylor ...
In this paper, we study relations between shadowing and inverse shadowing for homeomorphisms of a co...
Abstract. We give characterizations of linear dynamical systems via var-ious inverse shadowing prope...
In this paper we introduce a new notion, named controlled shadowing property and we relate it to som...
Rieger J. Shadowing and numerical analysis of set-valued dynamical systems. Bielefeld (Germany): Bie...
AMS Subject Classification 58F15 1 Introduction Computer simulations provide much practical informa...
AbstractWe present, as a simpler alternative for the results of [P. Kościelniak, On genericity of sh...
We discuss a system with a discontinuity moments generator to obtain the solutions. It is proven tha...
By the Shadowing Lemma we can shadow any sufficient accurate pseudo-trajectory of a hyperbolic syste...
AbstractLet Z(M) be the space of discrete dynamical systems with the C0-topology on a manifold M. It...
Abstract. We use a weaker version of the celebrated Newton–Kantorovich theorem [3] reported by us in...