A first course in module theory

by M. E. Keating

Publisher: Imperial College Press, Publisher: Distributed by World Scientific Pub. in London, River Edge, NJ

Written in English
Cover of: A first course in module theory | M. E. Keating
Published: Pages: 250 Downloads: 68
Share This

Subjects:

  • Modules (Algebra)

Edition Notes

Includes bibliographical references (p. 243-244) and index.

StatementM.E. Keating.
Classifications
LC ClassificationsQA247 .K43 1998
The Physical Object
Paginationxv, 250 p. :
Number of Pages250
ID Numbers
Open LibraryOL350597M
ISBN 10186094096X
LC Control Number98009963

A First Course in Econometric Theory book. Read reviews from world’s largest community for readers.5/5(1). A First Course in String Theory, Second Edition Barton Zwiebach Complete and thorough in its coverage, the author presents the main concepts of string theory in a concrete and physical way in order to develop intuition before formalism, often through simplified and illustrative examples. This course is the first course in a two course sequence that focus on the accounting concepts, principles and theory with an emphasis on the issues that arise in the application of these concepts. Primarily for external reporting purposes. I'm excited to share this knowledge with you, so let's get started. A First Course in Group Theory - Ebook written by Cyril F. Gardiner. Read this book using Google Play Books app on your PC, android, iOS devices. Download for offline reading, highlight, bookmark or take notes while you read A First Course in Group Theory.

Zwiebach avoids the temptation of including topics that would weigh the book down and make many students rush it back to the shelf and quit the course.' Source: Physics Today ' well-written takes us through the hottest topics in string theory research, requiring only a solid background in mechanics and some basic quantum mechanics. . ‎String theory made understandable. Barton Zwiebach is once again faithful to his goal of making string theory accessible to undergraduates. He presents the main concepts of string theory in a concrete and physical way to develop intuition before formalism, often through simplified and illustrative e.   the students and the instructor. A two-semester course emphasizing theory might cover Chapters 1 through 6, 9, 10, 11, 13 thro 20, 21, 22 (the first part), and On the other hand, if applications are to be emphasized, the course might cover Chapters 1 thro and 16 through In an applied course, some of the more theoretical.   Free Online Library: Expect the Unexpected: A First Course in Biostatistics, 2nd Edition.(Raluca Balan and Gilles Lamothe, Brief article, Book review) by "ProtoView"; General interest Books Book reviews.

‎This comprehensive text offers undergraduates a remarkably student-friendly introduction to graph theory. Written by two of the field's most prominent experts, it takes an engaging approach that emphasizes graph theory's history. Unique examples and lucid proofs provide a . The book is organized so that the instructor can select any two of the three. If every chapter of this book is covered, including the advanced topics, then enough material exists for a two-semester course. The first three chapters of this book provide a fairly complete coverage of complex numbers, the functions e^x and e^j and phasors. a first course in string theory Posted By Eiji YoshikawaPublic Library TEXT ID eaa Online PDF Ebook Epub Library well a first course in string theory by barton zwiebach is a publication that has different characteristic with others you may not should recognize that the author is how famous the job is as wise word never.

A first course in module theory by M. E. Keating Download PDF EPUB FB2

The book is intended to serve as supplementary reading for the third or fourth year undergraduate who is taking a course in module theory. The further topics point the way to some projects that might be attempted in conjunction with a taught course.

Get this from a library. A first course in module theory. [M E Keating] -- This book is an introduction to module theory for the reader who knows something about linear algebra and ring theory.

Its main aim is the derivation of the structure theory of modules over Euclidean. A First Course in Module Theory M E Keating Imperial College, London ICP-Imperial College Press.

Contents Introduction vii 1 Rings and Ideals 1 Groups 1 Rings 3 Commutative domains 4 Units 4 Fields 5 Polynomial rings 5 Ideals 7 Principal ideals 8. This work is an introduction to module theory for the reader who knows something about linear algebra and ring theory. The main aim of the book is the derivation of the structure theory of modules over Euclidean domains.

This theory is applied to obtain the structure of abelian groups and the rational canonical and Jordan normal forms of matrices. The basic facts about rings and modules are given in full generality, so that some further topics can be discussed, including projective modules and the connection between modules and representations of book is intended to serve as supplementary reading for the third or fourth year undergraduate who is taking a course in module : Quick Search in Books.

Enter words / phrases / DOI / ISBN / keywords / authors / etc. Search. Quick Search anywhere. Enter words / phrases / DOI / ISBN / keywords / authors / etc. A First Course in Module Theory. Metrics. Downloaded 14 times History. Loading Close Figure Viewer.

Browse All. A First Course in Module Theory | Keating M.E. | download | B–OK. Download books for free. Find books. While the book has very good explanations and great examples for someone new to Module Theory it lacks depth.

I would recommend it for anyone in a Module Theory course, but those at the graduate level purchase other books or just expect that this one will lose its usefulness fairly quickly/5. The basic facts about rings and modules are given in full generality, so that some further topics can be discussed, including projective modules and the connection between modules and representations of book is intended to serve as supplementary reading for the third or fourth year undergraduate who is taking a course in module theory.

On the one hand this book intends to provide an introduction to module theory and the related part of ring theory. Starting from a basic understand-ing of linear algebra the theory is presented with complete proofs. From the beginning the approach is categorical. On the other hand the presentation includes most recent results and includes new ones.

As it presents these ideas, the book states the Modularity Theorem in various forms, relating them to each other and touching on their applications to number theory.

A First Course in Modular Forms is written for beginning graduate students and advanced undergraduates. First Course In Module Theory, A by Mike E Keating,available at Book Depository with free delivery worldwide. First Course In Module Theory, A: Mike E Keating: We use cookies to give you the best possible experience.4/5(1).

A First Course in Modular Forms (Graduate Texts in Mathematics series) by Fred Diamond. This book introduces the theory of modular forms, from which all rational elliptic curves arise, with an eye toward the Modularity Theorem.

First Course In Module Theory, A by Keating Mike E and Publisher ICP. Save up to 80% by choosing the eTextbook option for ISBN:The print version of this textbook is ISBN:X. $\begingroup$ Related: book suggestion on module theory As a comment to this earlier question I mentioned Module Theory: An Approach to Linear Algebra by T.

Blyth (1st edition ; 2nd edition )**. Also worth looking at isTheory of Modules (An Introduction to the Theory of Module Categories) by Alexandru Solian.

Of course you will not learn to do computations in string theory by reading this book but you will get familliar with the words and concepts really quickly. The first part covers classical strings and lightcone quantization of strings (only with Nambu-Gotto action) while introducing the ideas of s:   This book, an outgrowth of the author¿s lectures at the University of California at Berkeley, is intended as a textbook for a one-semester course in basic ring theory.

The material covered includes the Wedderburn-Artin theory of semisimple rings, Jacobson¿s theory of the radical, representation theory of groups and algebras, prime and semiprime rings, local and semilocal rings, 5/5(2).

These notes for a graduate course in set theory are on their way to be-coming a book. They originated as handwritten notes in a course at the University of Toronto given by Prof.

William Weiss. Cynthia Church pro-duced the first electronic copy in December James Talmage Adams produced the copy here in February   Algebraic coding theory is a new and rapidly developing subject, popular for its many practical applications and for its fascinatingly rich mathematical structure.

This book provides an elementary yet rigorous introduction to the theory of error-correcting codes. The best book I've ever seen on the topic is Module Theory: An Approach To Linear Algebra by T.S. Blyth. The book is extremely rigorous yet gentle and can be read after an undergraduate abstract algebra course.

That's the book I'd start with. This book, an outgrowth of the author's lectures at the University of California at Berkeley, is intended as a textbook for a one-semester course in basic ring theory. The material covered includes the Wedderburn-Artin theory of semisimple rings, Jacobson's theory of the radical, representation theory of groups and algebras, prime and semiprime rings, local and semilocal rings, perfect and 5/5(1).

A really good book covering the mathematics behind coding theory - how to send data efficiently using mathematical algorithms. It's very well written and really interesting.

This was a set text for a module I studied and I really enjoyed the course. Worth reading!Reviews: A really good book covering the mathematics behind coding theory - how to send data efficiently using mathematical algorithms.

It's very well written and really interesting. This was a set text for a module I studied and I really enjoyed the course. Worth reading!Reviews: COVID Resources. Reliable information about the coronavirus (COVID) is available from the World Health Organization (current situation, international travel).Numerous and frequently-updated resource results are available from this ’s WebJunction has pulled together information and resources to assist library staff as they consider how to handle coronavirus.

The authors of this book have, for several years, successfully taught a course on coding theory to students at the National University of Singapore.

This book is based on their experiences and provides a thoroughly modern introduction to the subject. Notes on a neat general topology course taught by B. Driver. Notes on a course based on Munkre's "Topology: a first course". By B. Ikenaga. Two sets of notes by D. Wilkins. General topology is discused in the first and algebraic topology in the second.

A paper discussing one point and Stone-Cech compactifications. Book Description "A First Course in Machine Learning by Simon Rogers and Mark Girolami is the best introductory book for ML currently combines rigor and precision with accessibility, starts from a detailed explanation of the basic foundations of Bayesian analysis in the simplest of settings, and goes all the way to the frontiers of the subject such as infinite mixture.

A First Course In Coding Theory (Oxford Applied Mathematics And Computing Science Series) by Hill, Raymond at - ISBN - ISBN - Oxford University Press, U.S.A.

- - Softcover. You are buying ONE brand new BOOK A First Course in Linear Model Theory. Year first published: Approximate dimensions: inches x inches. Author: Nalini Ravishanker. In particular, every projective module is flat. free A free module is a module that has a basis, or equivalently, one that is isomorphic to a direct sum of copies of the scalar ring.

G Galois A Galois module is a module over the group ring of a Galois group. H graded A module over a graded ring = ⨁ ∈ is a graded module if can be expressed as a direct sum ⨁ ∈ and ⊆ +.

This book provides an elementary yet rigorous introduction to the theory of error-correcting codes. Based on courses given by the author over several years to advanced undergraduates and first-year graduated students, this guide includes a large number of exercises, all with solutions, making the book highly suitable for individual : $Books On Line Abstract Algebra: The Basic Graduate Year This is a student-oriented text covering the standard first year graduate course in algebra.

Solutions to all problems are included and some of the reasoning is informal. A Course In Algebraic Number Theory An introduction to the subject, covering both global and local fields.Written in an entertaining and user-friendly style and including more than one hundred exercises, this book is an ideal first course in quantum theory, foundations, and computation for students from undergraduate to PhD level, as well as an opportunity for researchers from a broad range of fields, from physics to biology, linguistics, and.