MathematischeGesellschaft Finiteness properties of S-arithmetic groups in positive characteristic |  |  |
Vortragende Person:Prof. Dr. Ralf Köhl, Justus-Liebig-Universität Gießen
Veranstalter:Mathematisches Institut
Beschreibung:
The finiteness properties of discrete groups measure whether a given group is finitely generated, finitely presented or, more generally, admits an Eilenberg-MacLane space with a finite n-skeleton.
By a result by Borel-Serre, S-arithmetic groups in characteristic 0 enjoy the above finiteness properties for any given natural number n. In contrast, the group SL(2,F_q[t]) -- and more generally, any non-uniform tree lattice -- is not even finitely generated.
In 2013, Bux, Witzel, and myself established these finiteness properties in positive characteristic based on filtrations of Bruhat-Tits buildings via Busemann functions stemming from Harder's reduction theory.
In my talk I will revise the above-mentioned finiteness properties, establish the non-finite generation of tree lattices, discuss the relationship between the geometry of numbers in positive characteristic and the Riemann-Roch theorem, and then introduce the Busemann functions coming from Harder's reduction theory.
By a result by Borel-Serre, S-arithmetic groups in characteristic 0 enjoy the above finiteness properties for any given natural number n. In contrast, the group SL(2,F_q[t]) -- and more generally, any non-uniform tree lattice -- is not even finitely generated.
In 2013, Bux, Witzel, and myself established these finiteness properties in positive characteristic based on filtrations of Bruhat-Tits buildings via Busemann functions stemming from Harder's reduction theory.
In my talk I will revise the above-mentioned finiteness properties, establish the non-finite generation of tree lattices, discuss the relationship between the geometry of numbers in positive characteristic and the Riemann-Roch theorem, and then introduce the Busemann functions coming from Harder's reduction theory.
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Veranstaltungsart:Kolloquium
Veranstaltungssprache:Deutsch
Kategorie:Forschung
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Direkter Link zur Veranstaltung:https://events.goettingen-campus.de/event?eventId=17652
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