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11	Towards a Reinterpretation of the Radical Theory of Associative Rings Using Base Radical and Base Semisimple Class Constructions Chin, Melanie Soo, m.chin@cqu.edu.au January 2004 (has links) This research aims to refresh and reinterpret the radical theory of associative rings using the base radical and base semisimple class constructions. It also endeavours to generalise some results about ideals of rings in terms of accessible subrings. A characterisation of accessible subrings is included. By applying the base radical and base semisimple class constructions to many of the known results in established radical theory a number of gaps are uncovered and closed, with the goal of making the theory more accessible to advanced undergraduate and graduate students and mathematicians in related fields, and to open up new areas of investigation. After a literature review and brief reminder of algebra rudiments, the useful properties of accessible subrings and the U and S operators independent from radical class connections are described. The section on accessible subrings illustrates that replacing ideals with accessible subrings is indeed possible for a number of results and demonstrates its usefulness. The traditional radical and semisimple class definitions are included and it is shown that the base radical and base semisimple class constructions are equivalent. Diagrams illustrating the constructions support the definitions. From then on, all radical and semisimple classes mentioned are understood to have the base radical and base semisimple class form. Subject to the constraints of this work, many known results of traditional radical theory are reinterpreted with new proofs, illustrating the potential to simplify the understanding of radical theory using the base radical and base semisimple class constructions. Along with reinterpreting known results, new results emerge giving further insight to radical theory and its intricacies. Accessible subrings and the U and S operators are integrated into the development. The duality between the base radical and base semisimple class constructions is demonstrated in earnest. With a measure of the theory presented, the new constructions are applied to examples and concrete radicals. Context is supported by establishing the relationship between some well-known rings and the radical and related classes of interest. The title of the thesis, Towards a Reinterpretation of the Radical Theory of Associative Rings Using Base Radical and Base Semisimple Class Constructions, reflects the understanding that reinterpreting the entirety of radical theory is beyond the scope of this work. The conclusion includes an outlook listing further research that time did not allow. mathematics radical radical theory ring ring theory associative rings base radical base semisimple accessible subrings
12	On rings with commuting ideals Davis, Jonathan Michael 29 November 2012 (has links) This report is a summarization and extension of previous work done by Dr. Efraim Armendariz, University of Texas at Austin, and Dr. Henry E. Heatherly, University of Lousiana Lafayette, on the topic of rings with commuting ideals. Some of these authors’ results are extended to one-sided ideals instead of two-sided ideals. Topics discussed include homomorphic images of rings with commuting left ideals, finite direct products of rings with commuting left ideals, rings of n x n matrices over a ring with commuting left ideals, constructing rings with commuting ideals using an idempotent, and simple rings with commuting ideals over polynomials in X. Examples are given to illustrate some properties of rings with commuting ideals. A short a discussion regarding the inclusion of ring theory in the secondary mathematics classroom is also included. / text Ring theory Rings Ideals Commuting ideals One-sided ideals Simple rings
13	A(infinity)-structures, generalized Koszul properties, and combinatorial topology Conner, Andrew Brondos, 1981- 06 1900 (has links) x, 68 p. : ill. (some col.) / Motivated by the Adams spectral sequence for computing stable homotopy groups, Priddy defined a class of algebras called Koszul algebras with nice homological properties. Many important algebras arising naturally in mathematics are Koszul, and the Koszul property is often tied to important structure in the settings which produced the algebras. However, the strong defining conditions for a Koszul algebra imply that such algebras must be quadratic. A very natural generalization of Koszul algebras called K 2 algebras was recently introduced by Cassidy and Shelton. Unlike other generalizations of the Koszul property, the class of K 2 algebras is closed under many standard operations in ring theory. The class of K 2 algebras includes Artin-Schelter regular algebras of global dimension 4 on three linear generators as well as graded complete intersections. Our work comprises two distinct projects. Each project was motivated by an aspect of the theory of Koszul algebras which we regard as sufficiently powerful or fundamental to warrant an interpretation for K 2 algebras. A very useful theorem due to Backelin and Fröberg states that if A is a Koszul algebra and I is a quadratic ideal of A which is Koszul as a left A -module, then the factor algebra A/I is a Koszul algebra. We prove that if A is Koszul algebra and A I is a K 2 module, then A/I is a K 2 algebra provided A/I acts trivially on Ext A ( A/I,k ). As an application of our theorem, we show that the class of sequentially Cohen-Macaulay Stanley-Reisner rings are K 2 algebras and we give examples that suggest the class of K 2 Stanley-Reisner rings is actually much larger. Another important recent development in ring theory is the use of A ∞ -algebras. One can characterize Koszul algebras as those graded algebras whose Yoneda algebra admits only trivial A ∞ -structure. We show that, in contrast to the situation for Koszul algebras, vanishing of higher A ∞ -structure on the Yoneda algebra of a K 2 algebra need not be determined in any obvious way by the degrees of defining relations. We also demonstrate that obvious patterns of vanishing among higher multiplications cannot detect the K 2 property. This dissertation includes previously unpublished co-authored material. / Committee in charge: Dr. Brad Shelton, Chair; Dr. Victor Ostrik, Member; Dr. Nicholas Proudfoot, Member; Dr. Arkady Vaintrob, Member; Dr. David Boush, Outside Member A-infinity Face ring K2 Koszul algebras Stanley-Reisner Yoneda algebra Ring theory Mathematics
14	Injetividade e Módulos Pobres / Injectivity and Poor Modules Helen Samara Dos Santos 29 November 2012 (has links) O objetivo deste trabalho é estudar algumas classes de anéis. Para isso, introduzimos o conceito de módulo pobre e provamos algumas propriedades básicas destes módulos. Além disso, estudamos quais hipóteses sobre um anel R fazem com que alguma família da classe dos R-módulos seja uma família destituída (famílias tais que todo R-módulo é pobre), uma família sem classe média (famílias tais que todo R-módulo ou é pobre ou é injetivo) ou uma família que é uma utopia (famílias tais que todo R-módulo não é pobre). / The goal of this dissertation is to study certain classes of rings. To this end, we introduce the definition of a poor module and prove some basic properties of these modules. Furthermore, we study which hypotheses on a ring R turn some classes of R-modules into a destitute family (families such that every R-module is poor), a family with no middle class (families such that every R-module is either poor or injective) or a family that is an utopia (families such that every R-module is not poor) módulo injetivo módulo pobre teoria de anéis injective module poor module ring theory
15	Analysis of symmetric function ideals: towards a combinatorial description of the cohomology ring of Hessenberg varieties Mbirika, Abukuse, III 01 July 2010 (has links) Symmetric functions arise in many areas of mathematics including combinatorics, topology and algebraic geometry. Using ideals of symmetric functions, we tie these three branches together. This thesis generalizes work of Garsia and Procesi in 1992 that gave a quotient ring presentation for the cohomology ring of Springer varieties. Let R be the polynomial ring Ζ[x1,…,xn]. We present two different ideals in R. Both are parametrized by a Hessenberg function h, namely a nondecreasing function that satisfies h(i) ≥ i for all i. The first ideal, which we call Ih, is generated by modified elementary symmetric functions. The ideal I_h generalizes the work of Tanisaki who gave a combinatorial description of the ideal used in Garsia and Procesi's quotient ring. Like the Tanisaki ideal, the generating set for Ih is redundant. We give a minimal generating set for this ideal. The second ideal, which we call Jh, is generated by modified complete symmetric functions. The generators of this ideal form a Gröbner basis, which is a useful property. Using the Gröbner basis for Jh, we identify a basis for the quotient R/Jh. We introduce a partial ordering on the Hessenberg functions, and in turn we discover nice nesting properties in both families of ideals. When h>h', we have Ih ⊂ Ih' and Jh ⊂ Jh'. We prove that Ih equals Jh when h is maximal. Since Ih is the ideal generated by the elementary symmetric functions when h is maximal, the generating set for Jh forms a Gröbner basis for the elementary symmetric functions. Moreover, the quotient R/Jh gives another description of the cohomology ring of the full flag variety. The generators of the ring R/Jh are in bijective correspondence with the Betti numbers of certain Hessenberg varieties. These varieties are a two-parameter generalization of Springer varieties, parametrized by a nilpotent operator X and a Hessenberg function h. These varieties were introduced in 1992 by De Mari, Procesi and Shayman. We provide evidence that as h varies, the quotient R/Jh may be a presentation for the cohomology ring of a subclass of Hessenberg varieties called regular nilpotent varieties. algebraic geometry cohomology combinatorics commutative ring theory Grobner basis symmetric functions Mathematics
16	Nonstandard solutions of linear preserver problems Julius, Hayden 12 July 2021 (has links) No description available. Mathematics linear preserver problems preservers linear algebra matrix theory operator theory ring theory
17	A Study of CS and Σ-CS Rings and Modules Al-Hazmi, Husain S. January 2005 (has links) No description available. Mathematics Mathematics Ring Theory Prime Ring Module Theory CS Module Extending Module Semiperfect Module
18	The cohomology rings of classical Brauer tree algebras Chasen, Lee A. 07 June 2006 (has links) In this dissertation a simple algorithm is given for calculating minimal projective resolutions of nonprojective indecomposable modules over Brauer tree algebras. Those calculated resolutions lead to an algorithm for calculating a minimal set of generators for the cohomology ring of a Brauer tree algebra. / Ph. D. mathematics algebra ring theory module theory homological algebra LD5655.V856 1995.C436
19	Baer and quasi-baer modules Roman, Cosmin Stefan 29 September 2004 (has links) No description available. Mathematics Ring Theory Modules Theory Baer Rings, Modules Quasi-Baer Rings, Modules Extending Modules FI-extending Modules Endomorphisms, Idempotents, Annihilators
20	Extending the Skolem Property Steward, Michael 02 August 2017 (has links) No description available. Mathematics algebra commutative algebra Skolem property factorization multiplicative ideal theory semistar operation star operation evaluation polynomial rational function ring ring theory

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