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         Algebraic Number Theory:     more books (102)
  1. Algebraic K Theory and Algebraic Number Theory: Proceedings of a Seminar Held January 12-16, 1987 With Support from the National Science Foundation (Contemporary Mathematics) by Seminar on Algebraic K-Theory and Algebraic Number Theory, Michael R. Stein, et all 1989-01
  2. Algebraic Number Theory (Pure and Applied Mathematics) by R. Long, 1977-09-01
  3. Algebraic Number Theory and Algebraic Geometry: Papers Dedicated to A.N. Parshin on the Occasion of His Sixtieth Birthday (Contemporary Mathematics)
  4. Algebraic Theory of Numbers by Hermann Weyl, 1998-04-20
  5. The Theory of Algebraic Number Fields by David Hilbert, 2010-11-02
  6. Lectures on the Theory of Algebraic Numbers (Graduate Texts in Mathematics) by E. T. Hecke, 2010-11-02
  7. Algebraic theory of numbers by Pierre Samuel, 1970
  8. The Elements Of The Theory Of Algebraic Numbers by Legh Wilber Reid, 2010-09-10
  9. Selected Papers on Number Theory and Algebraic Geometry (American Mathematical Society Translations Series 2)
  10. Select Topics in Algebra: and Its Interrelations with Logic, Number Theory and Algebraic Geometry (Mathematics and its Applications) by I. Bucur, 1984-09-30
  11. Selected Papers on Number Theory, Algebraic Geometry, and Differential Geometry (American Mathematical Society Translations Series 2)
  12. Foundations of the theory of algebraic numbers by Harris Hancock, 1964
  13. P-Adic Methods in Number Theory and Algebraic Geometry (Contemporary Mathematics) by Steven Sperber, Alan Adolphson, 1992-07
  14. The theory of algebraic numbers (Carus mathematical monographs series;no.9) by Harry Pollard, 1950

41. AMCA: Frobenius Groups: It's All Algebraic Number Theory Presented By Ron Brown
Abstracts Conference Homepage. Frobenius groups it's all algebraicnumber theory by Ron Brown University of Hawaii Frobenius groups
http://at.yorku.ca/cgi-bin/amca/cacv-07
AMCA Document # cacv-07 International Conference and Workshop on Valuation Theory
July 26 - August 11, 1999
University of Saskatchewan
Saskatoon, Saskatchewan, Canada Organizers
Franz-Viktor Kuhlmann, Salma Kuhlmann, Murray Marshall, Deirdre Haskell, Hans Schoutens
View Abstracts
Conference Homepage Frobenius groups: it's all algebraic number theory
by
Ron Brown
University of Hawaii Frobenius groups play a prominent role in the general theory of finite groups. After reviewing definitions we show that the problem of finding all Frobenius groups with abelian Frobenius kernel is a problem in algebraic number theory. We illustrate this with a very elementary construction of all Frobenius groups whose Frobenius complement is either the quaternion group or the special linear group SL(2,Z/5Z) and with some combinatorial results (e.g., a count of the metabelian Frobenius groups of order at most one million). The key idea is that Frobenius groups with abelian kernel correspond precisely to finite modules over certain well-behaved classical maximal orders, and the indecomposable modules correspond to powers of maximal ideals of the associated Dedekind domain. Connections with Amitsur's calculation of the finite groups which are subgroups of division rings will be mentionned.

42. Math 525: Algebraic Number Theory. Information Page
Math 525 algebraic number theory. Supplemental material on algebraic numberfields will be drawn from algebraic number theory by Stewart and Tall.
http://www.math.binghamton.edu/dikran/525/
Math 525: Algebraic Number Theory
This is the information page for Math 525, Fall 2002. Text: A Classical Introduction to Modern Number Theory, 2nd edition, by K. Ireland and M. Rosen. Supplemental material on algebraic number fields will be drawn from "Algebraic Number Theory" by Stewart and Tall. I do not expect to cover the complete text in a single semester. Instead I plan to discuss Chapters 5-12, with supplemental material on algebraic number fields as time permits. Many of the standard results in algebraic number theory can also be regarded as results in algebraic K-theory, so algebraic topologists may be interested in this course.
Homework
Assignment Chapter Problems Date Due September 10 September 19 September 26 Thursday, October 10 Thursday, October 17 2, 3, 4, 5, 6 [(a) only], 7 [-7-3w only], 8 [143 only], 13, 14 Tuesday, October 29 Thursday, November 7 handout (8 problems) Tuesday, November 26 handout (7 problems) Thursday, December 12
Tests
Test Material Location Date and Time Chapters 5-7 LN 2205 October 2, 7-9 PM

43. International Conference On Number Theory
Topics elementary, analytical and algebraic number theory and its applications. Ostravice, 38 September 2001.
http://www.osu.cz/prf/katedry/matematiky/cz_announcement.html

Final announcement
The 15 th Czech and Slovak International Conference on Number Theory
Ostravice (Czech Republic), Hotel Monter
September 3. - 8., 2001
Organized by the Department of Mathematics of the Faculty of Sciences of the University of Ostrava Department of Mathematics, Institute of Chemical Technology, Prague Department of Mathematics, Masaryks University of Brno Department of Mathematical Analysis, Charles University, Prague Mathematical institute of Slovak Academy of Scientes, Bratislava PARTICIPANTS The following mathematicians confirmed the participation INVITED SPEAKERS Takashi Agoh, Japan
Jannis A. Antoniadis, Greece
Antal Bege, Romania
Kurt Girstmair, Austria
Alain Escassut, France
Peter Grabner, Austria
Cornelius Greither, Germany
Georges Grekos, France
Kalman Gyory, Hungary Franz Halter - Koch, Austria Terence Jackson, United Kingdom Anatoly Karatsuba, Russia Gunter Lettl, Austria Claude Levesque, Canada

44. Algebraic Number Theory
algebraic number theory. The lectures for MATH0053, Algebraic NumberTheory, FebruaryMay 2001, have now finished. Fairly complete
http://www.bath.ac.uk/~masgks/MATH0053/
Algebraic Number Theory
The lectures for MATH0053, Algebraic Number Theory, February-May 2001, have now finished. Fairly complete notes on the course are available as Postscript. There are copies of them and of the solutions to the examples sheets in the pigeonholes in 1 West Level 3. Examples sheets The reading list for the course, available from the library catalogue , lists some relevant books which are available in the University of Bath Library . For number theory, Stewart and Tall is a useful source. For pure commutative ring theory, there are three standard books, all called Commutative Algebra . All are excellent, but all are hard to read as a first introduction. They are by Zariski and Samuel, by Atiyah and Macdonald, and by Matsumura. The first two are in the library; the last is not, but I have a copy I am willing to lend if anybody is interested.
Examples sheets

45. E. Pohst Computational Algebraic Number Theory
Translate this page E. Pohst Computational algebraic number theory. Michael E. Pohst Computationalalgebraic number theory, DMV Seminar, Bd. 21, Birkhäuser
http://www.uni-karlsruhe.de/~CAIS/CAR/CAR14/node26.html
Next: Up: Previous:
E. Pohst: Computational Algebraic Number Theory
Michael E. Pohst: Computational Algebraic Number Theory
Next: Up: Previous:
Ulrich Schwardmann
Fri Sep 22 12:20:21 MET DST 1995

46. H. Cohen A Course In Computational Algebraic Number Theory
Translate this page H. Cohen A Course in Computational algebraic number theory. H. Cohen A Coursein Computational algebraic number theory, 1993, ISBN 3-540-55640-0, Grad.
http://www.uni-karlsruhe.de/~CAIS/CAR/CAR14/node21.html
Next: J.S. DevittCalculus Up: Previous:
H. Cohen: A Course in Computational Algebraic Number Theory
H. Cohen: A Course in Computational Algebraic Number Theory 1993, ISBN 3-540-55640-0, Grad. Texts in Math., Springer-Verlag, Berlin-Heidelberg-New York, DM 88..
L Q und C , Hilbertsche und Webersche Klassenpolynome).
Den Anwendungen gelten die letzten drei Kapitel, und zwar Kapitel 8 der Faktorisierung von Zahlen und den Primzahltests in ''the dark ages'' (Pocklington-Lehmerscher (N-1)-Test, Pollard's rho-Methode, Verfahren von Shanks und die (p-1)-Methode), Kapitel 9 den Primzahltests (mittels Jacobisummen oder elliptischer Kuven, Goldwasser-Kilian-Atkin) und Kapitel 10 der Faktorisierung (Kettenbruchmethode, Klassengruppenverfahren, Methode der elliptischen Kurven nach Lenstra, quadratisches Sieb, zahlentheoretisches Sieb) jeweils in ''modern times''.
Der Stoff erstreckt sich durchaus auf Teile der Zahlentheorie und Algebra, die nicht
Next: J.S. DevittCalculus Up: Previous:
Ulrich Schwardmann
Fri Sep 22 12:20:21 MET DST 1995

47. Topics In Algebraic Number Theory
Topics in algebraic number theory (EPSRC/LMS Short Course). Schedule. Suggestedreading list. TOPICS IN algebraic number theory. LMS/EPSRC Short Course.
http://www.mth.kcl.ac.uk/events/short_courses/ANT_Sep_2002.html
King's Maths Home What's new Search ...
Mathsoc
Mathematics Department
Topics in Algebraic Number Theory
(EPSRC/LMS Short Course)
  • Schedule
  • Suggested reading list
  • TOPICS IN ALGEBRAIC NUMBER THEORY
    LMS/EPSRC Short Course
    King's College London, 2-6 September 2002
    Organiser: David Burns Algebraic number theory has a long and distinguished history and remains one of the most significant areas of research in mathematics. The subject has in particular enjoyed spectacular advances in recent years, with Wiles' proof of Fermat's last theorem standing as one of the undisputed milestones of twentieth century mathematics. The analysis of problems in number theory, even those of a seemingly concrete and explicit nature, may well however involve the interplay of results and techniques from may different branches of pure mathematics. In conjunction with the increasing pace of current developments this means that it is all too easy to feel relatively isolated from the fundamental advances which are being achieved today. With this problem in mind, the lectures at this short course aim to provide students with a grounding in some of the areas which are of central importance in both algebraic number theory and arithmetic algebraic geometry. The topics to be discussed have been chosen both because they have been of pivotal significance to recent developments and also because they illustrate well the wide variety of techniques and the nature of the problems which arise in much of the fundamental research which is being conducted today. The lecturers and course titles are:

    48. London Postgraduate Study Group In Algebraic Number Theory
    London postgraduate study group in algebraic number theory, Study groupon padic Galois Representations. This term (Spring 2002) there
    http://www.mth.kcl.ac.uk/events/psgant2.html
    London postgraduate study group in algebraic Number theory
    Study group on p-adic Galois Representations
    This term (Spring 2002) there will be a study group on Wednesday afternoons in Imperial College, revolving around the paper: "Construction des representations p-adiques semi-stables" - Colmez, Fontaine Inventiones 140 (2000) 143 In fact the main aim of the study group will be to learn the general theory of p-adic Galois representations that would enable one to read Colmez-Fontaine.... this general theory (due mainly to Fontaine) appears all over the place in modern arithmetic geometry. The first organisational meeting will take place on Wednesday 9th Jan at 2:30pm in the usual room (658). Ill also give an overview of the syllabus. I think there are very few prerequisites: Basically it would be helpful to know something about profinite groups and the basics about finite extensions of the p-adics. But if you don't then don't worry too much. cheers, - jon dee Return to list of seminar series KCL Maths Dept Home page UCL Maths Dept Home page ... IC Maths Dept Home page Department of Mathematics - King's College London document.write("This document was last modified by G.M.T. Watts on " + document.lastModified)

    49. Introduction To Algebraic Number Theory
    Introduction to algebraic number theory. 34 hours of lectures perweek. Lecturer Steffen D. Bentzen. Content Aims and objectives
    http://www.imf.au.dk/Mathematics/education/courses2/node20.html
    Next: Introduction to computability theory Up: C courses Previous: Homotopy and homology
    Introduction to algebraic number theory
    3-4 hours of lectures per week. Lecturer: Steffen D. Bentzen Content:
    Aims and objectives:
    • To acquire a basic understanding of algebraic number fields, in particular quadratic and cyclotomic fields.
    Keywords:
    • Ring of integers, ideals, Galois theory, decomposition laws.
    Course description: An algebraic number is a root of a rational polynomial, and an algebraic number field is a field obtained from Q by adjoining an algebraic number. In this course we study the basic theory of such fields. An essential property of the ordinary integers is the unique factorization theorem. This theorem is no longer valid for a general number field. A major theme in the course will be to "repair" this defect. The students are required to participate actively in the course, in the form of either seminars or exercises (depending on the number of participants). Prerequisites: 1. del plus a general algebraic interest.

    50. Introduction To Algebraic Number Theory
    Introduction to algebraic number theory. 34 hours of lectures perweek. Lecturer Steffen Bentzen Content Aims and objectives
    http://www.imf.au.dk/Mathematics/education/F99/courses2/node18.html
    Next: Linear algebraic groups Up: C courses - introductory Previous: Harmonic analysis
    Introduction to algebraic number theory
    [] 3-4 hours of lectures per week. [ Lecturer: Steffen Bentzen Content: ] Aims and objectives:
    • To acquire a basic understanding of algebraic number fields, in particular quadratic and cyclotomic fields.
    Keywords:
    • Ring of integers, ideals, Galois theory, decomposition laws.
    Course description: An algebraic number is a root of a rational polynomial, and an algebraic number field is a field obtained from Q by adjoining an algebraic number. In this course we study the basic theory of such fields. An essential property of the ordinary integers is the unique factorization theorem. This theorem is no longer valid for a general number field. A major theme in the course will be to "repair" this defect. The students are required to participate actively in the course, in the form of either seminars or exercises (depending on the number of participants). Prerequisites ] 1. del plus a general algebraic interest. [

    51. Algebraic Number Theory
    algebraic number theory. This leads to understanding that number theoryand algebraic geometry is in fact one and the same domain.
    http://www.mccme.ru/mathinmoscow/courses/number.htm
    Algebraic Number Theory
    We present the basics of number theory emphasizing the striking similarity between the properties of usual integers and those of polynomials over a finite field. This leads to understanding that number theory and algebraic geometry is in fact one and the same domain. The core of number theory being an elementary problem, we stick to concrete examples. What is a number theory problem? Rings of residues, finite fields Integers and polynomials Quadratic fields Global fields Prime decomposition and class group Sign and units Zeta-functions Arithmetic of curves Books: K. Ireland and M. Rosen, A classical introduction to modern number theory. Springer, 1982. Math in Moscow Home Page List of courses

    52. Algorithmic Number Theory
    9.5. ERHbased methods. 9.6. Primality testing using algebraic number theory.9.7. Generation of random primes. 9.8. Prime number sieves. 9.9.
    http://www.math.uwaterloo.ca/~shallit/antdesc.html
    Algorithmic Number Theory
    From the Preface: This is the first volume of a projected two-volume set on algorithmic number theory, the design and analysis of algorithms for problems from the theory of numbers. This volume focuses primarily on those problems from number theory that admit relatively efficient solutions. The second volume will largely focus on problems for which efficient algorithms are not known, and applications thereof. We hope that the material in this book will be useful for readers at many levels, from the beginning graduate student to experts in the area. The early chapters assume that the reader is familiar with the topics in an undergraduate algebra course: groups, rings, and fields. Later chapters assume some familiarity with Galois theory. As stated above, this book discusses the current state of the art in algorithmic number theory. This book is not The book contains a large bibliography with references to more than 1800 papers and books. The BibTeX files for the bibliography of the book are available for your use without charge.

    53. Algebraic Number Theory
    Click to enlage algebraic number theory Edwin Weiss. Our Price, $12.95. AvailabilityIn Stock. (Usually ships in 24 to 48 hours). Format Book. ISBN 0486401898.
    http://store.doverpublications.com/0486401898.html
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    Edwin Weiss Our Price Availability: In Stock
    (Usually ships in 24 to 48 hours) Format: Book ISBN: Page Count: Dimensions: 5 3/8 x 8 1/2 Careful organization and clear, detailed proofs make this book ideal either for classroom use or as a stimulating series of exercises for mathematically minded individuals. Modern abstract techniques focus on introducing elementary valuation theory, extension of valuations, local and ordinary arithmetic fields, and global, quadratic, and cyclotomic fields.
    Buy Now!

    54. Workshop Information Explicit Algebraic Number Theory NWO-OTKA
    Workshop Information Explicit algebraic number theory NWOOTKAworkshop from 27 Sep 2002 through 2 Oct 2002,
    http://www.lc.leidenuniv.nl/lc/web/2002/20020927/info.php3?wsid=67

    55. Workshop Participants List B Explicit Algebraic Number Theory
    Translate this page Workshop participants list Explicit algebraic number theory NWO-OTKA workshop,
    http://www.lc.leidenuniv.nl/lc/web/2002/20020927/participants.php3?wsid=67

    56. Colin D. Walter - Algebraic Number Theory Publications
    Colin D. Walter algebraic number theory Publications. From the goodold days before Fermat's Last Theorem had been proved, here
    http://www.co.umist.ac.uk/~cdw/algebraic-number-theory.html
    Colin D. Walter - Algebraic Number Theory Publications
    From the good old days before Fermat's Last Theorem had been proved, here are some of my contributions to the subject: ( Some over bars etc may not be clear in the post script files, and some symbols may not print properly - particularly symbols for the rational integers and rational field - contact me for the sources if you wish. [6] C. D. Walter, Pure fields of degree 9 with class number prime to 3 , Annales de l'Institut Fourier, Grenoble (1980), pp. 1-16. [5] C. D. Walter, The ambiguous class group and the genus group of certain non-normal extensions , Mathematika (1979), pp. 113-124. [4] C. D. Walter, Kuroda's class number relation , Acta Arithmetica (1979), pp. 41-51. [3] C. D. Walter, Brauer's class number relation , Acta Arithmetica (1979), pp. 33-40. [2] C. D. Walter, A class number relation in Frobenius extensions of number fields , Mathematika (1977), pp. 216-225. The class number of pure fields of prime degree , Mathematika (1976), pp. 220-226.

    57. Number Theory - Wikipedia
    In algebraic number theory, the concept of number is expanded to the algebraicnumbers which are roots of polynomials with rational coefficients.
    http://www.wikipedia.org/wiki/Number_theory
    Main Page Recent changes Edit this page Older versions Special pages Set my user preferences My watchlist Recently updated pages Upload image files Image list Registered users Site statistics Random article Orphaned articles Orphaned images Popular articles Most wanted articles Short articles Long articles Newly created articles All pages by title Blocked IP addresses Maintenance page External book sources Printable version Talk
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    Number theory
    From Wikipedia, the free encyclopedia. Traditionally, number theory is that branch of pure mathematics concerned with the properties of integers . More generally, it has come to be concerned with a wider class of problems that are "easily understood by laymen" - this expansion has occurred as the techniques are used to attack wider varieties of problems. Number theory may be subdivided into several fields according to the methods used and the questions investigated. In elementary number theory , the integers are studied without use of techniques from other mathematical fields. Questions of divisibility, the Euclidean algorithm to compute greatest common divisors , factorization of integers into prime numbers , investigation of perfect numbers and congruences belong here. Typical statements are

    58. Oberwolfach-Seminars 2002
    Explicit algebraic number theory November 10 16, 2002. The spirit of the presentseminar is similar, within the smaller compass of algebraic number theory.
    http://www.mfo.de/Seminars/Seminars_2002.html
    Mathematisches Forschungsinstitut Oberwolfach / Oberwolfach-Seminars
    Oberwolfach-Seminars 2002
    These seminars are a continuation of the DMV-Seminars initiated by Deutsche Mathematiker Vereinigung. They address postdocs and Ph.D. students from all over Europe. The aim is to introduce the participants to a particular hot development. The seminars take place at Mathematisches Forschungsinstitut Oberwolfach. The number of participants is restricted to 25. Applications including a short summary of previous work and interest should be sent to: Prof. Dr. Gert-Martin Greuel
    Fachbereich Mathematik
    67663 Kaiserslautern, Germany
    Poster of Oberwolfach-Seminars 2002 as Postscript file Oberwolfach-Seminare 2001
    Oberwolfach Tagungs-Programm 2002

    Finite Markov Chains
    May 19 - 25, 2002
    Deadline for Application:
    April 15, 2002
    Organizers:
    Jim Fill (Baltimore)
    Laurent Saloff-Coste (Ithaca)
    Subjects:
    The aim of these lectures is to present some modern aspects of the theory of finite ergodic Markov chains. One focus will be on bounds on the time needed to reach approximate equilibrium; another will be on perfect simulation. Techniques to be presented include both (1) analytic methods based on eigenvalues, functional inequalities, and comparison, and (2) probabilistic methods such as coupling, strong stationary times and duality, coupling from the past, and the Randomness Recycler.

    59. Number Theory - Cambridge University Press
    A Brief Guide to algebraic number theory HPF SwinnertonDyer Price£16.95. Broad graduate-level account of algebraic number theory
    http://publishing.cambridge.org/stm/mathematics/number/
    Home Number Theory
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    A Panorama of Number Theory or The View from Baker's Garden
    Edited by Gisbert Wustholz This is a selection of high quality articles on number theory by leading figures.
    A Brief Guide to Algebraic Number Theory

    H. P. F. Swinnerton-Dyer Broad graduate-level account of Algebraic Number Theory, including exercises, by a world-renowned author. ‘… masterfully written. It has to be recommended to number theorists and more general to working algebraists.’ J. Schoissengeier, Monatshefte für Mathematik Hardback
    Cambridge University Press 2003.

    60. Algebra And Number Theory At PSU
    Algebra and number theory group. Members, seminars, preprints, links.Category Science Math Number Theory Research Groups...... Colloquium F2000 . Links to some interesting sites Number Theory WebHave fun! algebraic number theory Archives Preprints appear here!
    http://www.math.psu.edu/vstein/alg/antheory/numtheory.html

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