Manuel González: Inessential operators, perturbation classes and incomparability of Banach spaces


Data: sexta-feira, 25 de abril de 2014, às 14h 

Sala: 243-A 

Palestrante: Manuel González, Universidad de Cantabria 

Título: Inessential operators, perturbation classes and incomparability of Banach spaces


Resumo: Inessential operators appeared as the perturbation class for Fredholm operators, and were applied to define a notion of incomparability of Banach spaces. 

In this talk we begin by introducing the inessential operators. Then we review the perturbation classes problem for Fredholm and semi-Fredholm operators, and present several notions of incomparability of Banach spaces emphasizing the one associated to the inessential operators.


Manuel González: Tauberian operators: Examples and applications

Data: sexta-feira, 11 de abril de 2014, às 14h 

Sala: 243-A 

Palestrante: Manuel González, Universidad de Cantabria 

Título: Tauberian operators: Examples and applications 

Resumo: Tauberian operators first appeared in summability theory (Garling and Wilansky), and were formally introduced by Kalton and Wilansky. These operators have found applications in several topics of Banach space theory like factorization of operators (DFJP factorization), preservation of isomorphic properties (Neidinger), equivalence between the Radon-Nikodym property and the Krein-Milman property (Schachermayer), and refinements of James' characterization of reflexive spaces (Neidinger and Rosenthal). This talk describes some properties of tauberian operators, presents the main source of nontrivial examples (DFJP factorization), provides several characterizations that are useful in applications, and discusses some open problems.

Brice Rodrigue Mbombo: Extreme amenability of the isometry group of the Urysohn space

Data: sexta-feira, 04 de abril de 2014, às 14h

Sala: 243-A

Palestrante: Brice Rodrigue Mbombo, IME-USP

Título: Extreme amenability of the isometry group of the Urysohn space

Resumo: The definition of an extremely amenable group is obtained from the classical definition of an amenable group by removing the two underlined words of the definition: A topological group $G$ is amenable if every continuous $\underline{\text{affine}}$ action of $G$ on compact $\underline{\text{convex}}$ set $X$ admits a fixed point: for some $\xi\in X$ and all $g\in G$, one has $g\xi=\xi$. 



The existence of extremely amenable semigroups was proved by Granirer in $1967$. But it was at first unclear if extremely amenable topological groups existed at all. The first example of this kind was done by Herer and Christensen in $1975$. Some further examples known to date include:


  • $\mathcal{U}(\ell^{2})$, equipped with strong operator topology (Gromov-Milman, $1984$);
  • $Aut\,(\mathbb{Q},\leq)$ with the topology of simple convergence (Pestov, $1998$);
  • $Iso(\mathbb{U})$ where $\mathbb{U}$ is the universal Urysohn space (Pestov, $2002$).
In this talk, we will provide a short history(motivations) of the subject, recall the Kat\v etov construction of the Urysohn space $\mathbb{U}$ and give all details of Pestov Proof of extreme amenability of the group $Iso(\mathbb{U})$.