Logo

Smarandache Near-rings by W. B. Vasantha Kandasamy

Large book cover: Smarandache Near-rings

Smarandache Near-rings
by

Publisher: American Research Press
ISBN/ASIN: 1931233667
ISBN-13: 9781931233668
Number of pages: 201

Description:
Near-rings are one of the generalized structures of rings. This is a book on Smarandache near-rings where the Smarandache analogues of the near-ring concepts are developed. The reader is expected to have a good background both in algebra and in near-rings; for, several results are to be proved by the reader as an exercise.

Download or read it online for free here:
Download link
(1.2MB, PDF)

Similar books

Book cover: Set Theoretic Approach to Algebraic Structures in MathematicsSet Theoretic Approach to Algebraic Structures in Mathematics
by - Educational Publisher
This book brings out how sets in algebraic structures can be used to construct the most generalized algebraic structures, like set linear algebra / vector space, set ideals in groups and rings and semigroups, and topological set vector spaces.
(6051 views)
Book cover: Lectures On Unique Factorization DomainsLectures On Unique Factorization Domains
by - Tata Institute Of Fundamental Research
In this book we shall study some elementary properties of Krull rings and factorial rings, regular rings (local and factorial), and descent methods (Galoisian descent, the Purely inseparable case, formulae concerning derivations).
(5603 views)
Book cover: An Introduction to Nonassociative AlgebrasAn Introduction to Nonassociative Algebras
by - Project Gutenberg
Concise study presents in a short space some of the important ideas and results in the theory of nonassociative algebras, with particular emphasis on alternative and (commutative) Jordan algebras. Written as an introduction for graduate students.
(8992 views)
Book cover: The OctonionsThe Octonions
by - University of California
The octonions are the largest of the four normed division algebras. The author describes them and their relation to Clifford algebras and spinors, Bott periodicity, projective and Lorentzian geometry, Jordan algebras, and the exceptional Lie groups.
(13701 views)