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Introduction to $p$-adic Analytic Number Theory
 
M. Ram Murty Queen’s University, Kingston, ON, Canada
A co-publication of the AMS and International Press of Boston
Introduction to p-adic Analytic Number Theory
Softcover ISBN:  978-0-8218-4774-9
Product Code:  AMSIP/27.S
List Price: $52.00
MAA Member Price: $46.80
AMS Member Price: $41.60
eBook ISBN:  978-1-4704-1742-0
Product Code:  AMSIP/27.E
List Price: $49.00
MAA Member Price: $44.10
AMS Member Price: $39.20
Softcover ISBN:  978-0-8218-4774-9
eBook: ISBN:  978-1-4704-1742-0
Product Code:  AMSIP/27.S.B
List Price: $101.00 $76.50
MAA Member Price: $90.90 $68.85
AMS Member Price: $80.80 $61.20
Introduction to p-adic Analytic Number Theory
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Introduction to $p$-adic Analytic Number Theory
M. Ram Murty Queen’s University, Kingston, ON, Canada
A co-publication of the AMS and International Press of Boston
Softcover ISBN:  978-0-8218-4774-9
Product Code:  AMSIP/27.S
List Price: $52.00
MAA Member Price: $46.80
AMS Member Price: $41.60
eBook ISBN:  978-1-4704-1742-0
Product Code:  AMSIP/27.E
List Price: $49.00
MAA Member Price: $44.10
AMS Member Price: $39.20
Softcover ISBN:  978-0-8218-4774-9
eBook ISBN:  978-1-4704-1742-0
Product Code:  AMSIP/27.S.B
List Price: $101.00 $76.50
MAA Member Price: $90.90 $68.85
AMS Member Price: $80.80 $61.20
  • Book Details
     
     
    AMS/IP Studies in Advanced Mathematics
    Volume: 272002; 149 pp
    MSC: Primary 11

    This book is an elementary introduction to \(p\)-adic analysis from the number theory perspective. With over 100 exercises, it will acquaint the non-expert with the basic ideas of the theory and encourage the novice to enter this fertile field of research.

    The main focus of the book is the study of \(p\)-adic \(L\)-functions and their analytic properties. It begins with a basic introduction to Bernoulli numbers and continues with establishing the Kummer congruences. These congruences are then used to construct the \(p\)-adic analog of the Riemann zeta function and \(p\)-adic analogs of Dirichlet's \(L\)-functions. Featured is a chapter on how to apply the theory of Newton polygons to determine Galois groups of polynomials over the rational number field. As motivation for further study, the final chapter introduces Iwasawa theory.

    The book treats the subject informally, making the text accessible to non-experts. It would make a nice independent text for a course geared toward advanced undergraduates and beginning graduate students.

    Titles in this series are co-published with International Press of Boston, Inc., Cambridge, MA.

    Readership

    Advanced undergraduates, graduate students, and research mathematicians interested in number theory.

  • Table of Contents
     
     
    • Chapters
    • Historical introduction
    • Bernoulli numbers
    • $p$-adic numbers
    • Hensel’s lemma
    • $p$-adic interpolation
    • $p$-adic $L$-functions
    • $p$-adic integration
    • Leopoldt’s formula for $L_p(1,\chi )$
    • Newton polygons
    • An introduction to Iwasawa theory
  • Reviews
     
     
    • The exposition of the book is clear and self-contained. It contains numerous exercises and is well-suited for use as a text for an advanced undergraduate or beginning graduate course on \(p\)-adic numbers and their applications ... the author should be congratulated on a concise and readable account of \(p\)-adic methods, as they apply to the classical theory of cyclotomic fields ... heartily recommended as the basis for an introductory course in this area.

      Mathematical Reviews
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Accessibility – to request an alternate format of an AMS title
Volume: 272002; 149 pp
MSC: Primary 11

This book is an elementary introduction to \(p\)-adic analysis from the number theory perspective. With over 100 exercises, it will acquaint the non-expert with the basic ideas of the theory and encourage the novice to enter this fertile field of research.

The main focus of the book is the study of \(p\)-adic \(L\)-functions and their analytic properties. It begins with a basic introduction to Bernoulli numbers and continues with establishing the Kummer congruences. These congruences are then used to construct the \(p\)-adic analog of the Riemann zeta function and \(p\)-adic analogs of Dirichlet's \(L\)-functions. Featured is a chapter on how to apply the theory of Newton polygons to determine Galois groups of polynomials over the rational number field. As motivation for further study, the final chapter introduces Iwasawa theory.

The book treats the subject informally, making the text accessible to non-experts. It would make a nice independent text for a course geared toward advanced undergraduates and beginning graduate students.

Titles in this series are co-published with International Press of Boston, Inc., Cambridge, MA.

Readership

Advanced undergraduates, graduate students, and research mathematicians interested in number theory.

  • Chapters
  • Historical introduction
  • Bernoulli numbers
  • $p$-adic numbers
  • Hensel’s lemma
  • $p$-adic interpolation
  • $p$-adic $L$-functions
  • $p$-adic integration
  • Leopoldt’s formula for $L_p(1,\chi )$
  • Newton polygons
  • An introduction to Iwasawa theory
  • The exposition of the book is clear and self-contained. It contains numerous exercises and is well-suited for use as a text for an advanced undergraduate or beginning graduate course on \(p\)-adic numbers and their applications ... the author should be congratulated on a concise and readable account of \(p\)-adic methods, as they apply to the classical theory of cyclotomic fields ... heartily recommended as the basis for an introductory course in this area.

    Mathematical Reviews
Review Copy – for publishers of book reviews
Accessibility – to request an alternate format of an AMS title
Please select which format for which you are requesting permissions.