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Ober­sem­in­ar "Num­ber The­ory and Arith­met­ic­al Stat­ist­ics": Prof. Dr. Jür­gen Klün­ers (Pader­born), Asymp­tot­ics of nil­po­tent ex­ten­sions of num­ber fields

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

Titel: Asymptotics of nilpotent extensions of number fields

Abstract: We give an overview about the proof of the weak Malle conjecture for nilpotent groups. Given a group G and a number field k, Malle defines a counting function.

Z(k,G;x) which counts all (finitely many) number fields with Galois group G and norm of the discriminant bounded by x. Malle conjectures that this counting function is
O(x^a * log(x)), where a(G) and b(k,G) are explicit constants. In the weak version we show the correctness of the constant a(G).