Ad­vanced Sem­in­ar "Num­ber The­ory and Arith­met­ic­al Stat­ist­ics"

  Location: A3.339                     Time: 14:15 - 15:45

SoSe 2024

The seminar will take place regularly on Tuesdays from April 9th, 2024.

  • Tuesday, 16.04.2024 Jan Diekmann "Fermat's Last Theorem for regular primes"
  • Tuesday, 23.04.2024 Michael Baake, "Dynamical and spectral properties of some shift spaces of number-theoretic origin" (11:15 - 12:45 Uhr, Medienraum D2.314)
  • Tuesday, 23.04.2024 Fabian Gundlach, Symmetries of the set of squarefree integers in a number field 
  • Tuesday, 21.05.2024 Marc Technau, The distribution of quadratic non-residues: A stroll through the garden
  • Tuesday, 28.05.2024 Béranger Seguin, tba
  • Tuesday, 11.06.2024 Daniel Windisch, Algebraic geometry of equilibria in cooperative games

Ober­sem­in­ar "Num­ber The­ory and Arith­met­ic­al Stat­ist­ics": Daniel Windisch (Leipzig), Al­geb­ra­ic geo­metry of equi­lib­ria in co­oper­at­ive games

Location: A3.339
Organizer: Prof. Dr. Jürgen Klüners

Title: Algebraic geometry of equilibria in cooperative games

Abstract: The classical notion of Nash equilibria imposes the somewhat
unnatural assumption of independent non-cooperative acting
on the players of a game. In 2005, the philosopher Wolfgang Spohn
introduced a new concept, called dependency equilibria, that also
takes into consideration cooperation of the players.
Dependency equilibria are, however, much more involved from a
mathematical viewpoint.

This talk will give the necessary background in game theory
and will show how basic (real) algebraic geometry can be used
to study dependency equilibria and game theoretical questions
in general. It is based on joint work with Irem Portakal.

Ober­sem­in­ar "Num­ber The­ory and Arith­met­ic­al Stat­ist­ics": Daniel Windisch (Leipzig), Al­geb­ra­ic geo­metry of equi­lib­ria in co­oper­at­ive games

Location: A3.339
Organizer: Prof. Dr. Jürgen Klüners

Title: Algebraic geometry of equilibria in cooperative games

Abstract: The classical notion of Nash equilibria imposes the somewhat
unnatural assumption of independent non-cooperative acting
on the players of a game. In 2005, the philosopher Wolfgang Spohn
introduced a new concept, called dependency equilibria, that also
takes into consideration cooperation of the players.
Dependency equilibria are, however, much more involved from a
mathematical viewpoint.

This talk will give the necessary background in game theory
and will show how basic (real) algebraic geometry can be used
to study dependency equilibria and game theoretical questions
in general. It is based on joint work with Irem Portakal.