Karl-Goswin Grosse-Erdmann (2003)
RACSAM
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In these notes we report on recent progress in the theory of hypercyclic and chaotic operators. Our discussion will be guided by the following fundamental problems: How do we recognize hypercyclic operators? How many vectors are hypercyclic? How many operators are hypercyclic? How big can non-dense orbits be?
Fernando León-Saavedra, Vladimír Müller (2006)
Studia Mathematica
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A sequence (Tₙ) of bounded linear operators between Banach spaces X,Y is said to be hypercyclic if there exists a vector x ∈ X such that the orbit Tₙx is dense in Y. The paper gives a survey of various conditions that imply the hypercyclicity of (Tₙ) and studies relations among them. The particular case of X = Y and mutually commuting operators Tₙ is analyzed. This includes the most interesting cases (Tⁿ) and (λₙTⁿ) where T is a fixed operator and λₙ are complex numbers. We also study...
Luis Bernal-Gonzalez (2002)
Colloquium Mathematicae
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We show that if (Tₙ) is a hypercyclic sequence of linear operators on a locally convex space and (Sₙ) is a sequence of linear operators such that the image of each orbit under every linear functional is non-dense then the sequence (Tₙ + Sₙ) has dense range. Furthermore, it is proved that if T,S are commuting linear operators in such a way that T is hypercyclic and all orbits under S satisfy the above non-denseness property then T - S has dense range. Corresponding statements for operators...
Tian, Lixin, Zhou, Jiangbo, Liu, Xun, Zhong, Guangsheng (2005)
International Journal of Mathematics and Mathematical Sciences
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Bernal-González, Luis (2004)
Mathematica Pannonica
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Teresa Bermúdez, Vivien G. Miller (2000)
Extracta Mathematicae
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Bernal-González, Luis (2001)
Mathematica Pannonica
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Luis Bernal-González (2000)
Studia Mathematica
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We furnish several necessary and sufficient conditions for the following property: For a topological space X, a continuous selfmapping S of X and a family τ of continuous selfmappings of X, the image under S of every τ-universal element is also τ-universal. An application in operator theory, where we extend results of Bourdon, Herrero, Bes, Herzog and Lemmert, is given. In particular, it is proved that every hypercyclic operator on a real or complex Banach space has a dense invariant...
Frédéric Bayart, Étienne Matheron, Pierre Moreau (2008)
Commentationes Mathematicae Universitatis Carolinae
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We study the ``smallness'' of the set of non-hypercyclic vectors for some classical hypercyclic operators.
George Costakis, Demetris Hadjiloucas (2006)
Studia Mathematica
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Let T be a continuous linear operator acting on a Banach space X. We examine whether certain fundamental results for hypercyclic operators are still valid in the Cesàro hypercyclicity setting. In particular, in connection with the somewhere dense orbit theorem of Bourdon and Feldman, we show that if for some vector x ∈ X the set Tx,T²/2 x,T³/3 x, ... is somewhere dense then for every 0 < ε < 1 the set (0,ε)Tx,T²/2 x,T³/3 x,... is dense in X. Inspired by a result of Feldman, we...