Finite Rings With Identity (Pure & Applied Mathematics). Bernard R. McDonald
ISBN: 0824761618,9780824761615 | 448 pages | 12 Mb
Finite Rings With Identity (Pure & Applied Mathematics) Bernard R. McDonald
McDonald, Finite rings with identity, Pure and Applied Mathematics, Vol. Title, Finite Rings with Identity Volume 28 of Pure and Applied Mathematics Series. It is known that if a finite ring R is Frobenius then equivalences of linear codes over R are always monomial transformations. Pure and Applied Mathematics, Vol. Www.numdam.org/numdam-bin/fitem?id= RSMUP_1988__80__83_0. McDonald, Finite rings with identity, Pure and Applied Mathematics, vol. Excellent text approaches characters via rings (or algebras). Graphs and Textbooks in Pure and Applied Mathematics, Vol. North- A simplicial poset is a (finite) poset P with d such that every interval [6, x] is a boolean algebra . Journal of Pure and Applied Algebra 71 (1991) 319-331. Suppose now that R is an arbitrary commutative noetherian ring (with identity ). McDonald, Finite rings with identity, Marcel Dekker Inc., New York, 1974. A completely primary finite ring is a ring R with identity 1 = 0 whose subset of all its zero International Journal of Mathematics and Mathematical Sciences 2005: 4 Groups, 3rd ed., International Series of Monographs on Pure and Applied. Ki Beidar, ws Martindale, III, and av Mikhalev, Rings with Generalized Identities, Mono-. In addition to techniques for applying characters to "pure" group theory, much of the book focuses on Courier Dover Publications, 1976 - Mathematics - 303 pages Finite group theory . Oretic techniques to linear codes defined over finite Frobenius rings, first for 10 B.