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": Mi­chael Baake (Biele­feld), Dy­nam­ic­al and spec­tral prop­er­ties of some shift spaces of num­ber-the­or­et­ic ori­gin

Location: D2.314 Medienraum
Organizer: Prof. Dr. Jürgen Klüners

Titel: Dynamical and spectral properties of some shift spaces of number-theoretic origin

Abstract: While B-free systems in one dimension have been studied for a long time, considerably less is known on their higher-dimensional analogues. Starting from the visible points of the integer lattice, a large class of such systems emerge via k-free integers in algebraic number fields. We discuss typical examples with some focus on their spectral properties and on topological invariants such as entropy and (extended) symmetries.

Ober­sem­in­ar "Num­ber The­ory and Arith­met­ic­al Stat­ist­ics": Mi­chael Baake (Biele­feld), Dy­nam­ic­al and spec­tral prop­er­ties of some shift spaces of num­ber-the­or­et­ic ori­gin

Location: D2.314 Medienraum
Organizer: Prof. Dr. Jürgen Klüners

Titel: Dynamical and spectral properties of some shift spaces of number-theoretic origin

Abstract: While B-free systems in one dimension have been studied for a long time, considerably less is known on their higher-dimensional analogues. Starting from the visible points of the integer lattice, a large class of such systems emerge via k-free integers in algebraic number fields. We discuss typical examples with some focus on their spectral properties and on topological invariants such as entropy and (extended) symmetries.