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Main Authors: Huber, Annette, Kalck, Martin
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2405.21053
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author Huber, Annette
Kalck, Martin
author_facet Huber, Annette
Kalck, Martin
contents We apply the structure theory of finite dimensional algebras in order to deduce dimension formulas for spaces of period numbers, i.e., complex numbers defined by integrals of algebraic nature. We get a complete and conceptually clear answer in the case of $1$-periods, generalising classical results like Baker's theorem on the logarithms of algebraic numbers and partial results in Huber--W{ü}stholz \cite{huber-wuestholz}. The application to the case of Mixed Tate Motives (i.e., Multiple Zeta Values) recovers the dimension estimates of Deligne--Goncharov \cite{deligne-goncharov}.
format Preprint
id arxiv_https___arxiv_org_abs_2405_21053
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Dimension formulas for period spaces via motives and species
Huber, Annette
Kalck, Martin
Number Theory
Rings and Algebras
Representation Theory
We apply the structure theory of finite dimensional algebras in order to deduce dimension formulas for spaces of period numbers, i.e., complex numbers defined by integrals of algebraic nature. We get a complete and conceptually clear answer in the case of $1$-periods, generalising classical results like Baker's theorem on the logarithms of algebraic numbers and partial results in Huber--W{ü}stholz \cite{huber-wuestholz}. The application to the case of Mixed Tate Motives (i.e., Multiple Zeta Values) recovers the dimension estimates of Deligne--Goncharov \cite{deligne-goncharov}.
title Dimension formulas for period spaces via motives and species
topic Number Theory
Rings and Algebras
Representation Theory
url https://arxiv.org/abs/2405.21053