6 edition of **Rings, modules and linear algebra** found in the catalog.

Rings, modules and linear algebra

Brian Hartley

- 66 Want to read
- 12 Currently reading

Published
**1970**
by Chapman & Hall in London
.

Written in English

- Algebras, Linear,
- Modules (Algebra),
- Rings (Algebra)

**Edition Notes**

Statement | by B. Hartley [and] T. O. Hawkes. |

Series | Chapman and Hall mathematics series |

Contributions | Hawkes, Trevor O., 1936- |

The Physical Object | |
---|---|

Pagination | xi, 210 p. : |

Number of Pages | 210 |

ID Numbers | |

Open Library | OL22803294M |

ISBN 10 | 412098105 |

LC Control Number | 70528830 |

3) B. Hartley, T. O. Hawkes, Chapman and Hall, Rings, Modules and Linear Algebra. (Possibly out of print, but many library should have it. Relatively concise and covers all the material in the course). 4) Neils Lauritzen, Concrete Abstract Algebra, CUP () (Excellent on groups, rings and fields, and covers topics in the Number Theory course. Get this from a library! Rings, modules and linear algebra: a further course in algebra describing the structure of Abelian groups and canonical forms of matrices through the study of rings and modules,. [B Hartley; Trevor O Hawkes] -- An account of how a certain fundamental algebraic concept can be introduced, developed, and applied to solve some concrete algebraic problems.

Algebra became more general and more abstract in the s as more algebraic structures were invented. Hamilton ({) invented quaternions (see section) and GrassmannFile Size: 1MB. Syllabus for the Algebra Qualifying Exam. Recommended book: Algebra, Lang (revised third edition) Groups (Ch. 1) Isomorphism theorems; permutation groups; group actions; p-groups and Sylow’s theorem; solvable groups; composition series; Jordan-Holder theorem. Rings, Modules and Commutative Algebra (Ch. 2,3 and 4).

Get this from a library! Rings, modules and linear algebra: a further course in algebra describing the structure of Abelian groups and canonical forms of matrices through the study of rings and modules. [Brian Hartley; T O Hawkes]. Until the 19th century, linear algebra was introduced through systems of linear equations and modern mathematics, the presentation through vector spaces is generally preferred, since it is more synthetic, more general (not limited to the finite-dimensional case), and conceptually simpler, although more abstract.. A vector space over a field F (often the field of the real numbers.

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Buy Rings, Modules and Linear Algebra (Chapman and Hall mathematics series) on FREE SHIPPING on qualified orders Rings, Modules and Linear Algebra (Chapman and Hall mathematics series): Hartley, B., Hawkes, T.O.: : Books.

Rings, Modules and Linear Algebra. A further course in algebra describing the structure of Abelian groups and canonical forms of matrices through the study of rings and modules by Hartley, B., Hawkes, T.

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Hungerford, Algebra, Springer, GTM. Rings and Buchsbaum, Groups, Rings and Modules, Dover. Berrick and Keating, An introduction to rings and modules with K-theory in view, CUP; Beachy, Introductory Lectures on Rings and Modules, CUP.

Hartley and Hawkes, Rings, Modules and Linear Algebra, Chapman and Hall. Buy Algebras, Rings and Modules: Volume 1: v. 1 (Mathematics and Its Applications) by Hazewinkel, Michiel, Gubareni, Nadiya, Kirichenko, V.V. (ISBN: ) from Amazon's Book Store.

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As a natural continuation of the first volume of Algebras, Rings and Modules, this book provides both the classical aspects of the theory of groups and their representations as well as a general introduction to the modern theory of representations including the representations of quivers and finite partially ordered sets and their applications to finite dimensional algebras.

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has been written with considerable attention to accuracy, and has been proofread with care. Cited by: 7. Rings and modules Notation: AˆB means Ais a subset of B, possibly equal to B.

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This introduc-tory section revisits ideas met in the early part of Analysis I and in Linear Algebra I, to set the scene and provide File Size: KB. The book is divided into five parts. The first part contains fundamental information such as an informal introduction to sets, number systems, matrices, and determinants.

The second part deals with groups. The third part treats rings and modules. The fourth part is concerned with field theory.5/5(2). Gaussian properties of rings Prufer domains Zariski-Riemann spaces divisibility properties commutative rings factorization theory in rings and semigroups fully inert modules homological algebra integer-valued polynomials linear algebra over rings module theory multiplicative ideal theory polynomial functions quasi-injective modules star operations topological entropy valuation rings.Summary.

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For example, we learned in linear algebra that the deter-minant det is a homomorphism from hR 2×2,0,1iinto hR,0,1i. The key fact from linear algebra is det(AB) = detAdetB.

We note in passing that the multiplication on the .