On Orbits of Operators on Hilbert Space

Smith, Lidia

2009 August 1900

In this dissertation we treat some problems about possible density of orbits for non-hypercyclic operators and we enlarge the class of known non-orbit-transitive operators. One of the questions related to hypercyclic operators that we answer is whether the density (in the set of positive real numbers) of the norms of the elements in the orbit for each nonzero vector in the Hilbert space is sufficient to imply that at least one vector has orbit dense in the Hilbert space. We show that the density of the norms is not a sufficient condition to imply hypercyclicity by constructing a weighted bilateral shift that, on one hand, satisfies the orbit-density property (in the sense defined above), but, on the other hand, fails to be hypercyclic. The second major topic that we study refers to classes of operators that are not hypertransitive (or orbit-transitive) and is related to the invariant subspace problem on Hilbert space. It was shown by Jung, Ko and Pearcy in 2005 that every compact perturbation of a normal operator is not hypertransitive. We extend this result, after introducing the related notion of weak hypertransitivity, by giving a sufficient condition for an operator to belong to the class of non-weakly-hypertransitive operators. Next, we study certain 2-normal operators and their compact perturbations. In particular, we consider operators with a slow growth rate for the essential norms of their powers. Using a new idea, of accumulation of growth for each given power on a set of different orthonormal vectors, we establish that the studied operators are not hypertransitive.

hypercyclic

orbit-transitive

hypertransitive

Dense Orbits of the Aluthge Transform

Rion, Kevin

25 March 2011

No description available.

Mathematics

Hypercyclic Vector

Hypercyclic Operator

Aluthge Transform

Weighted Shift

Hypercyclic Algebras and Affine Dynamics

Papathanasiou, Dimitrios

10 April 2017

No description available.

Mathematics

hypercyclic algebras

affine dynamics

Hypercyclic Extensions of an Operator on a Hilbert Subspace with Prescribed Behaviors

Kadel, Gokul Raj

26 July 2013

No description available.

Mathematics

Hypercyclicity

Periodic points

Chaotic extension

Adjoint operator

Dual hypercyclic operator

Hypercyclic extension

Fredholm extension

Hypercyclic subspace

A Strictly Weakly Hypercyclic Operator with a Hypercyclic Subspace

Madarasz, Zeno

11 August 2023

No description available.

Mathematics

Hypercyclic operator

hypercyclic subspace

weak topology

weak operator topology

strong operator topology

Disjoint Hypercyclic and Supercyclic Composition Operators

Martin, Ozgur

04 August 2010

No description available.

Mathematics

Hypercyclic and supercyclic vectors

disjoint hypercyclic operators

universal families

composition operators

Recurrence in Linear Dynamics

Puig de Dios, Yunied

30 March 2015

A bounded and linear operator is said to be hypercyclic if there exists a vector such that its orbit under the action of the operator is dense. The first example of a hypercyclic operator on a Banach space was given in 1969 by Rolewicz who showed that if B is the unweighted unilateral backward shift on l 2 , then λB is hypercyclic if and only if |λ| > 1. Among its features, we can mention for example that finite-dimensional spaces cannot support hypercyclic operators, proved by Kitai. On the other hand, several people have shown in different contexts, in the Hilbert space frame, that the set of hypercyclic vectors for a hypercyclic operator is a Gδ dense set. This thesis is divided into four chapters. In the first one, we give some preliminaries by mentioning some definitions and known results that will be of great help later. In chapter 2, we introduce a refinement of the notion of hypercyclicity, relative to the set N(U, V ) = {n ∈ N : T −nU ∩ V 6= ∅} when belonging to a certain collection F of subsets of N, namely a bounded and linear operator T is called F-operator if N(U, V ) ∈ F, for any pair of non-empty open sets U, V in X. First, we do an analysis of the hierarchy established between F-operators, whenever F covers those families mostly studied in Ramsey theory. Second, we investigate which kind of properties of density can have the sets N(x, U) = {n ∈ N : T nx ∈ U} and N(U, V ) for a given hypercyclic operator, and classify the hypercyclic operators accordingly to these properties. In chapter three, we introduce the following notion: an operator T on X satisfies property PF if for any U non-empty open set in X, there exists x ∈ X such that N(x, U) ∈ F. Let BD the collection of sets in N with positive upper Banach density. We generalize the main result of a paper due to Costakis and Parissis using a strong result of Bergelson and Mccutcheon in the vein of Szemerédi’s theorem, leading us to a characterization of those operators satisfying property PBD. It turns out that operators having property PBD satisfy a kind of recurrence described in terms of essential idempotents of βN (the Stone-Čech compactification of N). We will discuss the case of weighted backward shifts satisfying property PBD. On the other hand, as a consequence we obtain a characterization of reiteratively hypercyclic operators, i.e. operators for which there exists x ∈ X such that for any U non-empty open set in X, the set N(x, U) ∈ BD. The fourth chapter focuses on a refinement of the notion of disjoint hypercyclicity. We extend a result of Bès, Martin, Peris and Shkarin by stating: Bw is F-weighted backward shift if and only if (Bw, . . . , Br w) is d-F, for any r ∈ N, where F runs along some filters containing strictly the family of cofi- nite sets, which are frequently used in Ramsey theory. On the other hand, we point out that this phenomenon does not occur beyond the weighted shift frame by showing a mixing linear operator T on a Hilbert space such that the tuple (T, T2 ) is not d-syndetic. We also, investigate the relationship between reiteratively hypercyclic operators and d-F tuples, for filters F contained in the family of syndetic sets. Finally, we examine conditions to impose in order to get reiterative hypercyclicity from syndeticity in the weighted shift frame. / Puig De Dios, Y. (2014). Recurrence in Linear Dynamics [Tesis doctoral]. Universitat Politècnica de València. https://doi.org/10.4995/Thesis/10251/48473

Hypercyclic operator

F-operator

Ramsey theory

Essential idempotent

Reiteratively hypercyclic operator

MATEMATICA APLICADA

Hypercyclic Extensions Of Bounded Linear Operators

Turcu, George R.

20 December 2013

No description available.

Mathematics

hypercyclic operators

extensions of hypercyclic operators

chaotic operators

hypercyclic vectors

periodic points

Banach space

Hilbert space

linear operator

hypercyclicity

operator theory

orthogonal projection

Operadores hipercíclicos e o critério de hiperciclicidade / Hypercyclic operators and the hypercyclicity criterion

Augusto, Andre Quintal

03 August 2015

Dado um espaço vetorial topológico $X$ e um operador linear $T$ contínuo em $X$, dizemos que $T$ é {\\it hipercíclico} se, para algum $y \\in X$, o conjunto $\\{y, T(y), T^2(y), T^3(y), \\ldots T^n(y) \\ldots \\}$ for denso em $X$. Um dos principais resultados envolvendo operadores hipercíclicos consiste no chamado {\\it Critério de Hiperciclicidade}. Tal Critério fornece uma condição suficiente para que um operador linear contínuo seja hipercíclico. Por muitos anos, procurou-se saber se o Critério também era uma condição necessária. Em \\cite, Bayart e Matheron construíram, nos espaços de Banach clássicos $c_0$ e $\\ell_p, 1 \\leq p < \\infty$, um operador hipercíclico $T$ que não satisfaz o Critério. Neste trabalho, apresentamos a construção realizada por Bayart e Matheron. Além disso, também apresentamos alguns resultados sobre hiperciclicidade. / Given a topological vector space $X$ and a continuous linear operator $T$, we say that $T$ is {\\it hypercylic} if, for some $y \\in X$, the set $\\{y, T(y), T^2(y), T^3(y), \\ldots T^n(y) \\ldots \\}$ is dense in $X$. One of the main results concerning hypercyclic operators is the so-called {\\it Hypercyclicity Criterion}. Such Criterion gives a sufficient condition to a continuous linear operator be hypercyclic. For many years, it sought to know if the Criterion was also a necessary condition. In \\cite, Bayart and Matheron constructed, in the classical Banach spaces $c_0$ e $\\ell_p, 1 \\leq p < \\infty$, a hypercyclic operator $T$ which doesn\'t satisfy the Criterion. In this work, we present the Bayart/Matheron construction. We also present some results about hypercyclicity.

Critério de hiperciclicidade

Hiperciclicidade

Hypercyclic operators

Hypercyclicity

Hypercyclicity criterion

Operadores hipercíclicos.

Operadores hipercíclicos e o critério de hiperciclicidade / Hypercyclic operators and the hypercyclicity criterion

Andre Quintal Augusto

03 August 2015

Dado um espaço vetorial topológico $X$ e um operador linear $T$ contínuo em $X$, dizemos que $T$ é {\\it hipercíclico} se, para algum $y \\in X$, o conjunto $\\{y, T(y), T^2(y), T^3(y), \\ldots T^n(y) \\ldots \\}$ for denso em $X$. Um dos principais resultados envolvendo operadores hipercíclicos consiste no chamado {\\it Critério de Hiperciclicidade}. Tal Critério fornece uma condição suficiente para que um operador linear contínuo seja hipercíclico. Por muitos anos, procurou-se saber se o Critério também era uma condição necessária. Em \\cite, Bayart e Matheron construíram, nos espaços de Banach clássicos $c_0$ e $\\ell_p, 1 \\leq p < \\infty$, um operador hipercíclico $T$ que não satisfaz o Critério. Neste trabalho, apresentamos a construção realizada por Bayart e Matheron. Além disso, também apresentamos alguns resultados sobre hiperciclicidade. / Given a topological vector space $X$ and a continuous linear operator $T$, we say that $T$ is {\\it hypercylic} if, for some $y \\in X$, the set $\\{y, T(y), T^2(y), T^3(y), \\ldots T^n(y) \\ldots \\}$ is dense in $X$. One of the main results concerning hypercyclic operators is the so-called {\\it Hypercyclicity Criterion}. Such Criterion gives a sufficient condition to a continuous linear operator be hypercyclic. For many years, it sought to know if the Criterion was also a necessary condition. In \\cite, Bayart and Matheron constructed, in the classical Banach spaces $c_0$ e $\\ell_p, 1 \\leq p < \\infty$, a hypercyclic operator $T$ which doesn\'t satisfy the Criterion. In this work, we present the Bayart/Matheron construction. We also present some results about hypercyclicity.

Critério de hiperciclicidade

Hiperciclicidade

Operadores hipercíclicos.

Hypercyclic operators

Hypercyclicity

Hypercyclicity criterion