Cargando…

Number theory 3: Iwasawa theory and modular forms

This is the third of three related volumes on number theory. (The first two volumes were also published in the Iwanami Series in Modern Mathematics, as volumes 186 and 240.) The two main topics of this book are Iwasawa theory and modular forms. The presentation of the theory of modular forms starts...

Descripción completa

Detalles Bibliográficos
Autores principales: Kurokawa, Nobushige, Kurihara, Masato, Saito, Takeshi
Lenguaje:eng
Publicado: American Mathematical Society 2012
Materias:
XX
Acceso en línea:http://cds.cern.ch/record/2754399
_version_ 1780969413051154432
author Kurokawa, Nobushige
Kurihara, Masato
Saito, Takeshi
author_facet Kurokawa, Nobushige
Kurihara, Masato
Saito, Takeshi
author_sort Kurokawa, Nobushige
collection CERN
description This is the third of three related volumes on number theory. (The first two volumes were also published in the Iwanami Series in Modern Mathematics, as volumes 186 and 240.) The two main topics of this book are Iwasawa theory and modular forms. The presentation of the theory of modular forms starts with several beautiful relations discovered by Ramanujan and leads to a discussion of several important ingredients, including the zeta-regularized products, Kronecker's limit formula, and the Selberg trace formula. The presentation of Iwasawa theory focuses on the Iwasawa main conjecture, which establishes far-reaching relations between a p-adic analytic zeta function and a determinant defined from a Galois action on some ideal class groups. This book also contains a short exposition on the arithmetic of elliptic curves and the proof of Fermat's last theorem by Wiles. Together with the first two volumes, this book is a good resource for anyone learning or teaching modern algebraic number theory.
id cern-2754399
institution Organización Europea para la Investigación Nuclear
language eng
publishDate 2012
publisher American Mathematical Society
record_format invenio
spelling cern-27543992021-04-21T16:43:27Zhttp://cds.cern.ch/record/2754399engKurokawa, NobushigeKurihara, MasatoSaito, TakeshiNumber theory 3: Iwasawa theory and modular formsXXThis is the third of three related volumes on number theory. (The first two volumes were also published in the Iwanami Series in Modern Mathematics, as volumes 186 and 240.) The two main topics of this book are Iwasawa theory and modular forms. The presentation of the theory of modular forms starts with several beautiful relations discovered by Ramanujan and leads to a discussion of several important ingredients, including the zeta-regularized products, Kronecker's limit formula, and the Selberg trace formula. The presentation of Iwasawa theory focuses on the Iwasawa main conjecture, which establishes far-reaching relations between a p-adic analytic zeta function and a determinant defined from a Galois action on some ideal class groups. This book also contains a short exposition on the arithmetic of elliptic curves and the proof of Fermat's last theorem by Wiles. Together with the first two volumes, this book is a good resource for anyone learning or teaching modern algebraic number theory.American Mathematical Societyoai:cds.cern.ch:27543992012
spellingShingle XX
Kurokawa, Nobushige
Kurihara, Masato
Saito, Takeshi
Number theory 3: Iwasawa theory and modular forms
title Number theory 3: Iwasawa theory and modular forms
title_full Number theory 3: Iwasawa theory and modular forms
title_fullStr Number theory 3: Iwasawa theory and modular forms
title_full_unstemmed Number theory 3: Iwasawa theory and modular forms
title_short Number theory 3: Iwasawa theory and modular forms
title_sort number theory 3: iwasawa theory and modular forms
topic XX
url http://cds.cern.ch/record/2754399
work_keys_str_mv AT kurokawanobushige numbertheory3iwasawatheoryandmodularforms
AT kuriharamasato numbertheory3iwasawatheoryandmodularforms
AT saitotakeshi numbertheory3iwasawatheoryandmodularforms