impan seminar:

working group in applications of set theory



October 16th, Gabriel Salazar (IMPAN) 1115 room 105: Some Applications of Shelah's Black Box
Abstract:Shelah’s Black Box is a combinatorial principle that allows us to partially predict a given map under specific cardinal conditions. Very roughly speaking, if you can get a result using Jensen’s Diamond Principle then you can get a weak version of it in ZFC using the Black Box. In this talk I will present some algebraic constructions realized by means of this principle, focusing in the combinatorial aspect behind them.
Previous talks this semester:










Talks in the second semester of 2013-14.

Talks in the first semester of 2013-14.

Talks in the second semester of 2012-13.

Talks in the first semester of 2012-13.

Talks in the second semester of 2011-12.

Talks in the first semester of 2011-12.

Time and place: Thursdays 11.15-13.00 am, room 105, Sniadeckich 8

.

The scope of the seminar: Set-theoretic combinatorial and topological methods in diverse fields of mathematics, with a special emphasis on abstract analysis like Banach spaces, Banach algebras, C*-algebras, Here we include both the developing of such methods as forcing, descriptive set theory, Ramsey theory as well as their concrete applications in the fields mentioned above.

Working group style: We will make efforts so that this seminar has more a working character rather than the presentation style. This means that we encourage long digressions, discussions, background preparations and participation of everyone. We would like to immerse ourselves into the details of the mathematical arguments studied.

Participants this semester so far:

  • Leandro Candido (IM PAN/USP)
  • Marek Cuth (WCMCS-IM PAN)
  • Michal Doucha (IMPACT/IM PAN)
  • Tomasz Kochanek (IM PAN/MIM UW)
  • Piotr Koszmider (IM PAN)
  • Gabriel Salazar (IM PAN)
  • Damian Sobota (Ph. D. student IM PAN)
  • Michał Świętek (Ph. D. student UJ/WCMCS-IM PAN)
Forthcoming talks:

  • 23.10 - Michał Świętek on a construction of a Boolean algebra A such that the Banach space C(KA) has few operators.