缅北强奸

Event

Carlo Pagano (Concordia Unversity

Thursday, November 24, 2022 14:30to16:00

Title: On Malle's conjecture for nilpotent groups.

础产蝉迟谤补肠迟:听Malle's conjecture is a strengthening of the Galois inverse problem, asking for an asymptotic formula for the count of G-extensions with bounded ramification invariant (discriminant, conductor etc). Yet, even in the case of nilpotent groups, where the Galois inverse problem was solved by Shafarevich, Malle's conjecture is as of now wide open, with the exception of abelian groups (Wright) and a few sporadic families of exceptions.
I will discuss past and ongoing joint work in progress with Peter Koymans on this conjecture, for various orderings. I will explain how the problem is sensitive to the ordering of the fields, and the connection between the discriminant count and the Cohen--Lenstra heuristics. Next, I will explain a new approach we have introduced, in 2021, to attack nilpotent Malle and the partial results obtained so far with that method. Finally, I will discuss work in progress where, under GRH, we prove Malle's conjecture for all odd nilpotent groups, when extensions are ordered by the product of ramified primes.

S茅minaire Qu茅bec-Vermont Number Theory
Concordia University, Library Building, 9th floor, room LB 921-4

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