Master's Dissertation
DOI
https://doi.org/10.11606/D.55.2019.tde-22032019-163616
Document
Author
Full name
Piere Alexander Rodriguez Valerio
Institute/School/College
Knowledge Area
Date of Defense
Published
São Carlos, 2018
Supervisor
Committee
Mirzaii, Behrooz (President)
Manzoli Neto, Oziride
Ruffino, Fabio Ferrari
Salehyan, Parham
Manzoli Neto, Oziride
Ruffino, Fabio Ferrari
Salehyan, Parham
Title in Portuguese
Regulador de Borel na K-teoria algébrica
Keywords in Portuguese
Anel de inteiros
K-grupos
K-teoria algebraíca
Mapa regulador de Borel
K-grupos
K-teoria algebraíca
Mapa regulador de Borel
Abstract in Portuguese
Neste trabalho,nos apresentamos a K-teoria algébrica a qual é um ramo da álgebra que associa para cada anel comutativo comunidade R, uma sequencia de grupos abelianos ditos de n-ésimos K-grupos do anel R, denotada por Kn(R) . A meados da década de 1950,Alexander Grothendieck da a definição do K0(R) de um anel R. Em 1962, Hyman Bass e Stephen Schanuel apresenta a primeira definição adequada do K1(R) de um anel R. Em 1970, Daniel Quillen da uma definição geral dos K-grupos de um anel R a partir da +- construção do espaço classificante BGL(R). Nosso interesse é o estudo dos K-grupos sobre o anel de inteiros OF sobre um corpo numérico F. Usando alguns resultados de homologia dos grupos lineares, neste trabalho daremos a definição do mapa regulador de Borel.
Title in English
Borel regulator in algebraic k-theory
Keywords in English
Algebraic k-theory
Borel's regulator
K-groups
Ring of integers
Borel's regulator
K-groups
Ring of integers
Abstract in English
In this paper,we present the algebraic K-theory,which is a branch of algebra that associates to any ring with unit R a sequence of abelian groups called n-th K-groups of R, denoted by Kn(R). The mid-1950s, Alexander Grothendieck gave a definition of the K0(R) of any ring R. In1962, Hyman Bass and Stephen Schanuel gave the first adequate definition of K1 of any ring R. In 1970, Daniel Quillen gave a general definition of K-groups of any ring R using the +- construction of the classifying space BGL(R). Our interest is the study of the K-groups on the ring of integers OF over a number field F. Using some results of homology of linear groups, this work will give the definition of Borel's regulator map.
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Publishing Date
2019-03-22
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