Arithmetic hom-Lie algebras and L-functions
Daniel Larsson
TL;DR
This paper introduces the concept of arithmetic hom-Lie algebras, aiming to motivate number theorists to explore their properties and potential applications in the context of L-functions.
Contribution
It presents a novel connection between hom-Lie algebras and number theory, specifically targeting L-functions, and encourages further research in this interdisciplinary area.
Findings
Proposes a new framework linking hom-Lie algebras to number theory.
Suggests potential applications of hom-Lie algebras in studying L-functions.
Encourages collaboration between algebraists and number theorists.
Abstract
This note started out as a letter to J\"urgen Ritter and is brief attempt to entice some number theorists to study hom-Lie algebras.
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Taxonomy
TopicsAdvanced Topics in Algebra · Algebraic structures and combinatorial models · Advanced Algebra and Geometry