A bound on the index of exponent-$4$ algebras in terms of the   $u$-invariant

Karim Johannes Becher; Fatma Kader Bing\"ol

arXiv:2301.03378·math.RA·February 13, 2024

A bound on the index of exponent-$4$ algebras in terms of the $u$-invariant

Karim Johannes Becher, Fatma Kader Bing\"ol

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TL;DR

This paper establishes bounds on the index of exponent-4 central simple algebras over certain fields using the $u$-invariant, and introduces a new construction for fields with $u$-invariant 6.

Contribution

It provides a new bound on the index of exponent-4 algebras in terms of the $u$-invariant and presents a novel construction for nonreal fields with $u$-invariant 6.

Findings

01

Bound on index of exponent-4 algebras in terms of $u$-invariant.

02

New construction for nonreal fields with $u$-invariant 6.

Abstract

For a prime number $p$ , an integer $e \geq 2$ and a field $F$ containing a primitive $p^{e}$ -th root of unity, the index of central simple $F$ -algebras of exponent $p^{e}$ is bounded in terms of the $p$ -symbol length of $F$ . For a nonreal field $F$ of characteristic different from $2$ , the index of central simple algebras of exponent $4$ is bounded in terms of the $u$ -invariant of $F$ . Finally, a new construction for nonreal fields of $u$ -invariant $6$ is presented.

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Taxonomy

TopicsAdvanced Topics in Algebra · Rings, Modules, and Algebras · Finite Group Theory Research