Title: Class Field 'Theory - Artin Reciprocity Law
Other Titles: Klassenkörpertheorie - das Artinsche Reziprozitätsgesetz
Language: English
Authors: Papadogiannis, Loukas 
Qualification level: Diploma
Keywords: Klassenkörpertheorie; Artinsches Reziprozitätsgesetz
class field theory; Artin reciprocity law
Advisor: Drmota, Michael 
Issue Date: 2020
Number of Pages: 77
Qualification level: Diploma
In this Thesis we give an introduction in Class Field Theory, provingArtin reciprocity law. The goal of class field theory is to describe the Galois extensions of a local or global field in terms of the arithmetic of the field itself. Apart from a few remarks about the more general cases, these notes will concentrate on the case of abelian extensions, which is the basic case. We give the framework of the theoryintroducing Abstract class field theory and we can see how this canbe translated in the case of global class field theory using idele classgroups as modules or multiplicative groups in the case of local classfield theory. The language that we use is purely algebraic, with theexception of an analytic approach which is mostly redundant nowadays after much effort of the pioneers in that field to confront such a defect, as it was considered.
URI: https://doi.org/10.34726/hss.2020.56963
DOI: 10.34726/hss.2020.56963
Library ID: AC16098957
Organisation: E104 - Institut für Diskrete Mathematik und Geometrie 
Publication Type: Thesis
Appears in Collections:Thesis

Files in this item:

File Description SizeFormat
Class Field Theory - Artin Reciprocity Law.pdf687.15 kBAdobe PDFThumbnail
Show full item record

Page view(s)

checked on Feb 21, 2021


checked on Feb 21, 2021

Google ScholarTM


Items in reposiTUm are protected by copyright, with all rights reserved, unless otherwise indicated.