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21	A new construction of the Joseph ideal Garfinkle, Devra January 1982 (has links) Thesis (Ph.D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1982. / MICROFICHE COPY AVAILABLE IN ARCHIVES AND SCIENCE / Bibliography: leaf 77. / by Devra Garfinkle. / Ph.D. Mathematics. Ideals (Algebra) Representations of algebras Lie algebras Universal enveloping algebras
22	Prime ideals of the infinite product ring of p-adic integers / Sprano, Timothy E. January 1900 (has links) Thesis (Ph. D.)--University of Idaho, 2006. / Abstract. "April 2006." Includes bibliographical references (leaf 69). Also available online in PDF format.
23	Some Mal'cev conditions for varieties of algebras. Moses, Mogambery. January 1991 (has links) This dissertation deals with the classification of varieties according to their Mal'cev properties. In general the so called Mal'cev-type theorems illustrate an interplay between first order properties of a given class of algebras and the lattice properties of the congruence lattices of algebras of the considered class. CHAPTER 1. A survey of some notational conventions, relevant definitions and auxiliary results is presented. Several examples of less frequently used algebras are given together with the important properties of some of them. The term algebra T(X) and useful results concerning 'term' operations are established. A K-reflection is defined and a connection between a K-reflection of an algebra and whether a class K satisfies an identity of the algebra is established. CHAPTER 2. The Mal'cev-type theorems are presented in complete detail for varieties which are congruence permutable, congruence distributive, arithmetical, congruence modular and congruence regular. Several examples of varieties which exhibit these properties are presented together with the necessary verifications. CHAPTER 3. A general scheme of algorithmic character for some Mal'cev conditions is presented. R. Wille (1970) and A. F. Pixley (1972) provided algorithms for the classification of varieties which exhibit strong Mal'cev properties. This chapter is largely devoted to a modification of the Wille-Pixley schemes. It must be noted that this modification is quite different from all such published schemes. The results are the same as in Wille's scheme but slightly less general than in Pixley's. The text presented here, however is much simpler. As an example, the scheme is used to confirm Mal'cev's original theorem on congruence permutable varieties. Finally, the so-called Chinese var£ety is defined and Mal'cev conditions are established for such a variety of algebras . CHAPTER 4. A comprehensive survey of literature concerning Mal'cev conditions is given in this chapter. / Thesis (M.Sc.)-University of Natal, Durban, 1991. Algebra, Universal. Ideals (Algebra) Varieties (Universal Algebra) Theses--Mathematics.
24	Bourbaki ideals / Whittle, Carrie A., January 1900 (has links) Thesis (M.S.)--Missouri State University, 2008. / "August 2008." Includes bibliographical references (leaf 53). Also available online.
25	Properties of R-Modules Granger, Ginger Thibodeaux 08 1900 (has links) This thesis investigates some of the properties of R-modules. The material is presented in three chapters. Definitions and theorems which are assumed are stated in Chapter I. Proofs of these theorems may be found in Zariski and Samuel, Commutative Algebra, Vol. I, 1958. It is assumed that the reader is familiar with the basic properties of commutative rings and ideals in rings. Properties of R-modules are developed in Chapter II. The most important results presented in this chapter include existence theorems for R-modules and properties of submodules in R-modules. The third and final chapter presents an example which illustrates how a ring R, may be regarded as an R-module and speaks of the direct sum of ideals of a ring as a direct sum of submodules. Commutative Algebra R-modules commutative rings Commutative rings. Ideals (Algebra)
26	Primary decomposition of ideals in a ring Oyinsan, Sola 01 January 2007 (has links) The concept of unique factorization was first recognized in the 1840s, but even then, it was still fairly believed to be automatic. The error of this assumption was exposed largely through attempts to prove Pierre de Fermat's, 1601-1665, last theorem. Once mathematicians discovered that this property did not always hold, it was only natural for them to try to search for the strongest available alternative. Thus began the attempt to generalize unique factorization. Using the ascending chain condition on principle ideals, we will show the conditions under which a ring is a unique factorization domain. Decomposition (Mathematics) Ideals (Algebra) Rings (Algebra) Factorization (Mathematics) Commutative algebra Commutative algebra Decomposition (Mathematics) Factorization (Mathematics) Ideals (Algebra) Rings (Algebra) Algebraic Geometry
27	Numbers of generators of ideals in local rings and a generalized Pascal's Triangle Riderer, Lucia 01 January 2005 (has links) This paper defines generalized binomial coefficients and shows that they can be used to generate generalized Pascal's Triangles and have properties analogous to binomial coefficients. It uses the generalized binomial coefficients to compute the Dilworth number and the Sperner number of certain rings. Local rings Ideals (Algebra) Generators Pascal's triangle Rings (Algebra) Binomial coefficients Binomial coefficients Ideals (Algebra) Generators Local rings Pascal's triangle Rings (Algebra) Mathematics
28	Containment Relations Between Classes of Regular Ideals in a Ring with Few Zero Divisors Race, Denise T. (Denise Tatsch) 05 1900 (has links) This dissertation focuses on the significance of containment relations between the above mentioned classes of ideals. The main problem considered in Chapter II is determining conditions which lead a ring to be a P-ring, D-ring, or AM-ring when every regular ideal is a P-ideal, D-ideal, or AM-ideal, respectively. We also consider containment relations between classes of regular ideals which guarantee that the ring is a quasi-valuation ring. We continue this study into the third chapter; in particular, we look at the conditions in a quasi-valuation ring which lead to a = Jr, sr - f, and a = v. Furthermore we give necessary and sufficient conditions that a ring be a discrete rank one quasi-valuation ring. For example, if R is Noetherian, then ft = J if and only if R is a discrete rank one quasi-valuation ring. commutative rings quasi-valuation rings containment relations Ideals (Algebra) Rings (Algebra)
29	Properties of Some Classical Integral Domains Crawford, Timothy B. 05 1900 (has links) Greatest common divisor domains, Bezout domains, valuation rings, and Prüfer domains are studied. Chapter One gives a brief introduction, statements of definitions, and statements of theorems without proof. In Chapter Two theorems about greatest common divisor domains and characterizations of Bezout domains, valuation rings, and Prüfer domains are proved. Also included are characterizations of a flat overring. Some of the results are that an integral domain is a Prüfer domain if and only if every overring is flat and that every overring of a Prüfer domain is a Prüfer domain. greatest common divisor domains Bezout domains valuation rings Prüfer domains Commutative rings. Ideals (Algebra)
30	Rings of integer-valued polynomials and derivatives Unknown Date (has links) For D an integral domain with field of fractions K and E a subset of K, the ring Int (E,D) = {f e K[X]lf (E) C D} of integer-valued polynomials on E has been well studies. In particulare, when E is a finite subset of D, Chapman, Loper, and Smith, as well as Boynton and Klingler, obtained a bound on the number of elements needed to generate a finitely generated ideal of Ing (E, D) in terms of the corresponding bound for D. We obtain analogous results for Int (r) (E, D) - {f e K [X]lf(k) (E) c D for all 0 < k < r} , for finite E and fixed integer r > 1. These results rely on the work of Skolem [23] and Brizolis [7], who found ways to characterize ideals of Int (E, D) from the values of their polynomials at points in D. We obtain similar results for E = D in case D is local, Noetherian, one-dimensional, analytically irreducible, with finite residue field. / by Yuri Villanueva. / Thesis (Ph.D.)--Florida Atlantic University, 2012. / Includes bibliography. / Mode of access: World Wide Web. / System requirements: Adobe Reader. Rings of integers Ideals (Algebra) Polynomials Arithmetic algebraic geometry Categories (Mathematics) Commutative algebra

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