Add to ORKGInternational audienceWe show that an invertible bilateral weighted shift is strongly structurally stable if and only if it has the shadowing property. We also exhibit a Köthe sequence space supporting a frequently hypercyclic weighted shift, but no chaotic weighted shifts
Abstract. We provide a characterization of J-class and Jmix-class unilateral weighted shifts on l∞(N...
The classification of homogeneous scalar weighted shifts is known. Recently, Koranyi obtained a larg...
Semihyperbolic dynamical systems generated by Lipschitz mappings are investigated. A special form of...
In Linear Dynamics, the most studied class of linear operators is certainly that of weighted shifts,...
Focusing on the theory of shadowing of approximate trajectories (pseudotrajectories) of dynamical sy...
Usually backward shift is neither chaotic nor hypercyclic. We will show that on the space A(Omega) o...
ABSTRACT. A method is given to construct a strictly cyclic bilateral weighted shift on [2 from a str...
We give characterizations for finite collections of disjoint hypercyclic weighted shift operators, b...
International audienceBayart and Ruzsa [Ergodic Theory Dynam. Systems 35 (2015)] have recently shown...
AbstractIn this paper, we shall further investigate the dynamical properties of general weighted shi...
In this paper the analytic-spectral structure of the commutant of an invertible bilateral weighted s...
We show that every unilateral weighted backward shift T on ℓ p, where 1⩽p\u3c∞ has the factorization...
In this paper, we give some properties of subspace-disk transitive operators and use th...
In this article we develop a general technique which takes a known characterization of a property fo...
An operator (linear and continuous) in a Fréchet space is hypercyclic if there exists a vector whose...
Abstract. We provide a characterization of J-class and Jmix-class unilateral weighted shifts on l∞(N...
The classification of homogeneous scalar weighted shifts is known. Recently, Koranyi obtained a larg...
Semihyperbolic dynamical systems generated by Lipschitz mappings are investigated. A special form of...
In Linear Dynamics, the most studied class of linear operators is certainly that of weighted shifts,...
Focusing on the theory of shadowing of approximate trajectories (pseudotrajectories) of dynamical sy...
Usually backward shift is neither chaotic nor hypercyclic. We will show that on the space A(Omega) o...
ABSTRACT. A method is given to construct a strictly cyclic bilateral weighted shift on [2 from a str...
We give characterizations for finite collections of disjoint hypercyclic weighted shift operators, b...
International audienceBayart and Ruzsa [Ergodic Theory Dynam. Systems 35 (2015)] have recently shown...
AbstractIn this paper, we shall further investigate the dynamical properties of general weighted shi...
In this paper the analytic-spectral structure of the commutant of an invertible bilateral weighted s...
We show that every unilateral weighted backward shift T on ℓ p, where 1⩽p\u3c∞ has the factorization...
In this paper, we give some properties of subspace-disk transitive operators and use th...
In this article we develop a general technique which takes a known characterization of a property fo...
An operator (linear and continuous) in a Fréchet space is hypercyclic if there exists a vector whose...
Abstract. We provide a characterization of J-class and Jmix-class unilateral weighted shifts on l∞(N...
The classification of homogeneous scalar weighted shifts is known. Recently, Koranyi obtained a larg...
Semihyperbolic dynamical systems generated by Lipschitz mappings are investigated. A special form of...