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Your search keyword '"Fávaro, Vinícius V."' showing total 22 results
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22 results on '"Fávaro, Vinícius V."'

1. On frequently supercyclic operators and an F_{\Gamma}-hypercyclicity criterior with applications

Author

Alves, Thiago R., Botelho, Geraldo, and Fávaro, Vinicius V.

Subjects
Mathematics - Functional Analysis, 47A16, 47B01
Abstract

Given a Furstenberg family F and a subset {\Gamma} of C, we introduce and explore the notions of F_{\Gamma}-hypercyclic operator and F-hypercyclic scalar set. First, the study of F_C-hypercyclic operators yields new interesting information about frequently supercyclic, U-frequently supercyclic, reiteratively supercyclic and supercyclic operators. Then we provide a criterion for identifying F_{\Gamma}-hypercyclic operators. As applications of this criterion, we show that any unilateral pseudo-shift operator on c_0(N) or l_p(N) is F_{\Gamma}-hypercyclic for every unbounded subset {\Gamma} of C. Moreover, under the same condition on {\Gamma}, we show that any separable infinite-dimensional Banach space supports an F_{\Gamma}-hypercyclic operator. Finally, our study provides sufficient and necessary conditions for a subset {\Gamma} of C to be a hypercyclic scalar set. These results give partial answers to a question raised by Charpentier, Ernst, and Menet in 2016., Comment: 22 pages

Published
2024

2. Generalized Hyperbolicity, Stability and Expansivity for Operators on Locally Convex Spaces

Author

Bernardes Jr., Nilson C., Caraballo, Blas M., Darji, Udayan B., Fávaro, Vinícius V., and Peris, Alfred

Subjects
Mathematics - Dynamical Systems, Mathematics - Functional Analysis, Primary 47A16, 37B65, 37B25. Secondary 37B05, 37C50, 37D20
Abstract

We introduce and study the notions of (generalized) hyperbolicity, topological stability and (uniform) topological expansivity for operators on locally convex spaces. We prove that every generalized hyperbolic operator on a locally convex space has the finite shadowing property. Contrary to what happens in the Banach space setting, hyperbolic operators on Fr\'echet spaces may fail to have the shadowing property, but we find additional conditions that ensure the validity of the shadowing property. Assuming that the space is sequentially complete, we prove that generalized hyperbolicity implies the strict periodic shadowing property, but we also show that the hypothesis of sequential completeness is essential. We show that operators with the periodic shadowing property on topological vector spaces have other interesting dynamical behaviors, including the fact that the restriction of such an operator to its chain recurrent set is topologically mixing and Devaney chaotic. We prove that topologically stable operators on locally convex spaces have the finite shadowing property and the strict periodic shadowing property. As a consequence, topologically stable operators on Banach spaces have the shadowing property. Moreover, we prove that generalized hyperbolicity implies topological stability for operators on Banach spaces. We prove that uniformly topologically expansive operators on locally convex spaces are neither Li-Yorke chaotic nor topologically transitive. Finally, we characterize the notion of topological expansivity for weighted shifts on Fr\'echet sequence spaces. Several examples are provided.

Published
2024

6. Chaos in convolution operators on the space of entire functions of infinitely many complex variables

Author

Caraballo, Blas M. and Fávaro, Vinícius V.

Subjects
Mathematics - Functional Analysis, Mathematics - Dynamical Systems
Abstract

A classical result of Godefroy and Shapiro states that every nontrivial convolution operator on the space $\mathcal{H}(\mathbb{C}^n)$ of entire functions of several complex variables is hypercyclic. In sharp contrast with this result F\'avaro and Mujica show that no translation operator on the space $\mathcal{H}(\mathbb{C}^\mathbb{N})$ of entire functions of infinitely many complex variables is hypercyclic. In this work we study the linear dynamics of convolution operators on $\mathcal{H}(\mathbb{C}^\mathbb{N})$. First we show that no convolution operator on $\mathcal{H}(\mathbb{C}^\mathbb{N})$ is neither cyclic nor $n$-supercyclic for any positive integer $n$. After we study the notion of Li--Yorke chaos in non-metrizable topological vector spaces and we show that every nontrivial convolution operator on $\mathcal{H}(\mathbb{C}^\mathbb{N})$ is Li--Yorke chaotic., Comment: 10 pages

Published
2018

7. Hypercyclicity, existence and approximation results for convolution operators on spaces of entire functions

Author

Fávaro, Vinícius V. and Jatobá, Ariosvaldo M.

Subjects
Mathematics - Functional Analysis, 47A16, 46G20, 46E10, 46E50
Abstract

In this work we shall prove new results on the theory of convolution operators on spaces of entire functions. The focus is on hypercyclicity results for convolution operators on spaces of entire functions of a given type and order; and existence and approximation results for convolution equations on spaces of entire functions of a given type and order. In both cases we give a general method to prove new results that recover, as particular cases, several results of the literature. Applications of these more general results are given, including new hypercyclicity results for convolution operators on spaces on entire functions on $\mathbb{C}^n.$, Comment: 25 pages

Published
2018

8. Lineability and spaceability for the weak form of Peano's theorem and vector-valued sequence spaces

Author

Barroso, Cleon, Botelho, Geraldo, Fávaro, Vinícius V., and Pellegrino, Daniel

Subjects
Mathematics - Functional Analysis
Abstract

Two new applications of a technique for spaceability are given in this paper. For the first time this technique is used in the investigation of the algebraic genericity property of the weak form of Peano's theorem on the existence of solutions of the ODE $u'=f(u)$ on $c_0$. The space of all continuous vector fields $f$ on $c_0$ is proved to contain a closed $\mathfrak{c}$-dimensional subspace formed by fields $f$ for which -- except for the null field -- the weak form of Peano's theorem fails to be true. The second application generalizes known results on the existence of closed $\mathfrak{c}$-dimensional subspaces inside certain subsets of $\ell_p(X)$-spaces, $0 < p < \infty$, to the existence of closed subspaces of maximal dimension inside such subsets., Comment: 12 pages

Published
2011

9. General criteria for a stronger notion of lineability.

Author

Fávaro, Vinícius V., Pellegrino, Daniel, Raposo Jr., Anselmo, and Ribeiro, Geivison

Subjects
*COMMERCIAL space ventures, *TOPOLOGY
Abstract

A subset A of a vector space X is called \alpha-lineable whenever A contains, except for the null vector, a subspace of dimension \alpha. If X has a topology, then A is \alpha-spaceable if such subspace can be chosen to be closed. The vast existing literature on these topics has shown that positive results for lineability and spaceability are quite common. Recently, the stricter notions of (\alpha,\beta)-lineability/spaceability were introduced as an attempt to shed light on more subtle issues. In this paper, among other results, we prove some general criteria for the notion of (\alpha,\beta)-lineability/spaceability and, as applications, we extend recent results of different authors. [ABSTRACT FROM AUTHOR]

Published
2024
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