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Main Author: Efimov, Alexander I.
Format: Preprint
Published: 2015
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Online Access:https://arxiv.org/abs/1506.00257
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author Efimov, Alexander I.
author_facet Efimov, Alexander I.
contents In this paper we investigate the connection between the Mac Lane (co)homology and Wieferich primes in finite localizations of global number rings. Following the ideas of Polishchuk-Positselski \cite{PP}, we define the Mac Lane (co)homology of the second kind of an associative ring with a central element. We compute this invariants for finite localizations of global number rings with an element $w$ and obtain that the result is closely related with the Wieferich primes to the base $w.$ In particular, for a given non-zero integer $w,$ the infiniteness of Wieferich primes to the base $w$ turns out to be equivalent to the following: for any positive integer $n,$ we have $HML^{II,0}(\mathbb{Z}[\frac1{n!}],w)\ne\mathbb{Q}.$ As an application of our technique, we identify the ring structure on the Mac Lane cohomology of a global number ring and compute the Adams operations (introduced in this case by McCarthy \cite{McC}) on its Mac Lane homology.
format Preprint
id arxiv_https___arxiv_org_abs_1506_00257
institution arXiv
publishDate 2015
record_format arxiv
spellingShingle Mac Lane (co)homology of the second kind and Wieferich primes
Efimov, Alexander I.
Algebraic Geometry
K-Theory and Homology
Number Theory
16E40, 18G40, 58K05, 11R04
In this paper we investigate the connection between the Mac Lane (co)homology and Wieferich primes in finite localizations of global number rings. Following the ideas of Polishchuk-Positselski \cite{PP}, we define the Mac Lane (co)homology of the second kind of an associative ring with a central element. We compute this invariants for finite localizations of global number rings with an element $w$ and obtain that the result is closely related with the Wieferich primes to the base $w.$ In particular, for a given non-zero integer $w,$ the infiniteness of Wieferich primes to the base $w$ turns out to be equivalent to the following: for any positive integer $n,$ we have $HML^{II,0}(\mathbb{Z}[\frac1{n!}],w)\ne\mathbb{Q}.$ As an application of our technique, we identify the ring structure on the Mac Lane cohomology of a global number ring and compute the Adams operations (introduced in this case by McCarthy \cite{McC}) on its Mac Lane homology.
title Mac Lane (co)homology of the second kind and Wieferich primes
topic Algebraic Geometry
K-Theory and Homology
Number Theory
16E40, 18G40, 58K05, 11R04
url https://arxiv.org/abs/1506.00257