Brice Rodrigue Mbombo: Amenability test spaces for Polish groups II

Data: segunda-feira, 30 de setembro de 2013, às 14h

Sala:  excepcionalmente na 259-A

Palestrante: Brice Rodrigue Mbombo, IME-USP

Título: Amenability test spaces for Polish groups

Resumo: A topological group $G$ is amenable if every continuous action of  $G$ on a compact space $X$ admits an invariant Borel probability measure.

A compact space $K$ is an amenability test space for a class $\mathcal{C}$ of topological groups if a group $G \in \mathcal{C}$ is amenable if and only if every continuous action of $G$ on $K$ admits an invariant Borel probability measure. De la Harpe and Giordano (C. R. Acad. Sci. Paris 324(1997), 1255–1258), answering a question of Grigorchuk, had proved that the Cantor space $2^{\aleph_{0}}$ is an amenability test space for discrete countable groups. Bogatyi and Fedorchuk (Topol. Methods Nonlinear Anal. 29 (2007), 383–401) had obtained the same conclusion for the Hilbert cube $[0,1]^{\aleph_{0}}$. We observe that the result of Bogatyi and Fedorchuk remain true for the class of Polish groups. We also show that actions on the Cantor space can be used to detect amenability and extreme amenability of Polish non archimedean groups as well as amenability at infinity of discrete countable groups. As corollary, the latter property can also be tested by actions on the Hilbert cube. These results generalise a criterion due to Giordano and de la Harpe.

At the same time, we do not know whether there exists a compact metrizable test space $K$ for detecting extreme amenability of Polish groups, in other words, having the property that a Polish group $G$ has a fixed point in every compact space upon which it acts continuously whenever it has fixed point whenever it acts continuously on $K$. A separable compact $K$ with this property exists for cardinality considerations. 

In this couple of talks, we will provide an history introduction to the notion of amenability for groups before speaking  about amenability test spaces for Polish groups.


This is a joint work with Yousef Al-Gadid and Vladimir Pestov.


Slides of the presentation can be found here.

Brice Rodrigue Mbombo: Amenability test spaces for Polish groups

Data: segunda-feira, 23 de setembro de 2013, às 14h

Sala: 267-A

Palestrante: Brice Rodrigue Mbombo, IME-USP

Título: Amenability test spaces for Polish groups

Resumo: A topological group $G$ is amenable if every continuous action of  $G$ on a compact space $X$ admits an invariant Borel probability measure.

A compact space $K$ is an amenability test space for a class $\mathcal{C}$ of topological groups if a group $G \in \mathcal{C}$ is amenable if and only if every continuous action of $G$ on $K$ admits an invariant Borel probability measure. De la Harpe and Giordano (C. R. Acad. Sci. Paris 324(1997), 1255–1258), answering a question of Grigorchuk, had proved that the Cantor space $2^{\aleph_{0}}$ is an amenability test space for discrete countable groups. Bogatyi and Fedorchuk (Topol. Methods Nonlinear Anal. 29(2007), 383–401) had obtained the same conclusion for the Hilbert cube $[0,1]^{\aleph_{0}}$. We observe that the result of Bogatyi and Fedorchuk remain true for the class of Polish groups. We also show that actions on the Cantor space can be used to detect amenability and extreme amenability of Polish non archimedean groups as well as amenability at infinity of discrete countable groups. As corollary, the latter property can also be tested by actions on the Hilbert cube. These results generalise a criterion due to Giordano and de la Harpe.

At the same time, we do not know whether there exists a compact metrizable test space $K$ for detecting extreme amenability of Polish groups, in other words, having the property that a Polish group $G$ has a fixed point in every compact space upon which it acts continuously whenever it has fixed point whenever it acts continuously on $K$. A separable compact $K$ with this property exists for cardinality considerations. 

In this couple of talks, we will provide an history introduction to the notion of amenability for groups before speaking  about amenability test spaces for Polish groups.


This is a joint work with Yousef Al-Gadid and Vladimir Pestov.

Slides of the presentation can be found here.


Jordi Lopez-Abad: Basic sequences of random unconditional convergence

Data: segunda-feira, 16 de setembro de 2013, às 14h

Sala: 267-A

Palestrante: Jordi Lopez-Abad, ICMAT - Madrid

Título: Basic sequences of random unconditional convergence

Resumo: This is a notion of partial unconditionality of random flavour introduced by P. Billard, S. Kwapien, A. Pelczynski in the mid 90's. We will also introduce its dual notion of basic sequences of average unconditional divergence. We will present known results and open problems. This is a Joint work with P. Tradacete (Madrid).

Jordi Lopez-Abad: The Banach-Saks property of a set and its convex hull

Data: segunda-feira, 09 de setembro de 2013, às 14h

Sala: 267-A

Palestrante: Jordi Lopez-Abad, ICMAT - Madrid

Título: The Banach-Saks property of a set and its convex hull

Resumo: We present an example of a set which has the Banach-Saks property, yet its convex hull does not. In fact, our example has Banach-Saks rank 1 while its convex hull has rank 2. We will discuss the relationship between the ranks of a set and of its convex hull. This is a Joint work with C. Ruiz and P. Tradacete (Madrid).