# A geometric approach to counting norms in cyclic extensions of function   fields

**Authors:** Vlad Matei

arXiv: 1705.10727 · 2020-10-26

## TL;DR

This paper develops a geometric method using a twisted Grothendieck Lefschetz trace formula to explicitly count norms in cyclic extensions of function fields, extending classical number field results.

## Contribution

It introduces a new geometric approach to counting norms in cyclic function field extensions, providing explicit asymptotics and revealing homological stability phenomena.

## Key findings

- Explicit asymptotic formulas for norms in cyclic extensions
- A new geometric and cohomological framework for counting problems
- Discovery of homological stability phenomena in the context of function fields

## Abstract

In this paper we prove an explicit version of a function field analogue of a classical result of Odoni about norms in number fields in the case of a cyclic Galois extensions. In the particular case of a quadratic extension, we recover the result of Bary-Soroker, Smilanski, and Wolf which deals with finding asymptotics for a function field version on sums of two squares, improved upon by Gorodetsky , and reproved by the author in his Ph.D thesis using the method of this paper. The main tool is a twisted Grothendieck Lefschetz trace formula, inspired by the work of Church, Farb and Ellenberg on representation stability and asymptotic for point counts on varieties. Using a combinatorial description of the cohomology we obtain a precise quantitative result which works in the $q^n\rightarrow \infty$ regime, and a new type of homological stability phenomena, which arises from the computation of certain inner products of representations.

## Full text

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## References

20 references — full list in the complete paper: https://tomesphere.com/paper/1705.10727/full.md

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Source: https://tomesphere.com/paper/1705.10727