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100   $a20120611d2012      uy             0
101 0 $aeng
135   $aur|n|---|||||
181   $ctxt
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200 10$aContemporary Ring Theory 2011$b[electronic resource] $eproceedings Of the sixth China-Japan-Korea International Conference on ring theory /$feditors, Jin Yong Kim ... [et al.]
210   $aToh Tuck Link, Singapore $cWorld Scientific$d2012
215   $a1 online resource (258 p.)
300   $aDescription based upon print version of record.
311   $a981-4397-67-9 
320   $aIncludes bibliographical references.
327   $aPreface; Organizing Committees; Participants; Program; CONTENTS; Invited Lectures; RINGS OVER WHICH POLYNOMIAL RINGS ARE NI Juncheol Han, Yang Lee, and Sung Pil Yang; 1. Ring Theory; 2. Basic Properties of Polynomial-NI Rings; References; THE GALOIS MAP AND ITS INDUCED MAPS George Szeto and Lianyong Xue; 1. Introduction; 2. Basic Definitions and Notations; 3. Maps Induced by the Galois Map; 4. The Galois Map; References; NOTES ON WEAKLY d-KOSZUL MODULES Jiafeng Lu and Xiaolan Yu; 1. Introduction; 2. The Proofs of Theorems 1.1 and 1.2; 3. The Proof of Theorem 1.3; References
327   $aAN EXTENSION OF RINGS AND HOCHSCHILD 2-COCYCLES M. Tamer Kosan, Tsiu-Kwen Lee, and Yiqiang Zhou1. The ring Hn (R;   ); 2. Reversible and symmetric rings; 3. Armendariz rings; 4. Abelian rings and uniquely clean rings; References; WHEN DO THE DIRECT SUMS OF MODULES INHERIT CERTAIN PROPERTIES? Gangyong Lee, S. Tariq Rizvi, and Cosmin Roman; 1. Introduction; 2. Injectivity and some of its generalizations; 3. Baer, quasi-Baer, and Rickart modules; 4. Direct sums of Baer and quasi-Baer modules; 5. Direct sums of Rickart modules; 6. Free Rickart and free Baer modules; References
327   $aNOTES ON SIMPLE-BAER MODULES AND RINGS Lixin Mao1. Introduction; 2. Main results; References; A NOTE ON QUASI-JOHNS RINGS Liang Shen; 1. Introduction; 2. Results; References; VON NEUMANN REGULAR RINGS SATISFYING GENERALIZED ALMOST COMPARABILITY Mamoru Kutami; 1. Introduction; 2. Notations and definitions; 3. Generalized almost comparability; References; A NEW PSEUDORANDOM NUMBER GENERATOR AST Huiling Song; 1. Introduction; 2. Construction using Artin-Schreier towers; 2.1. Recursive structures for p = 3 using an Artin-Schreier tower; 2.2. Multiplication algorithm for p = 3
327   $a3. Linear recurrence equations on finite fields4. Pseudorandom number generators for p = 2; 4.1. TGFSR; 4.2. MT; 4.3. AST for p = 2; 5. AST for p = 3; 6. Concluding remarks; References; A NOTE ON PRIME RINGS WITH LEFT DERIVATIONS Nadeem ur Rehman; 1. Introduction; 2. Main results; References; ON RINGS IN WHICH EVERY IDEAL IS PRIME Hisaya Tsutsui; 1. Introduction; 2. Four basic theorems on fully prime rings (from Blair-Tsutsui [1]); 3. Right Noetherian fully prime rings; References
327   $aSOME COMMUTATIVITY THEOREMS CONCERNING ADDITIVE MAPPINGS AND DERIVATIONS ON SEMIPRIME RINGS Shakir Ali, Basudeb Dhara, and Ajda Fosner1. Introduction; 2. Preliminaries; 3. The Results; References; STUDY ON THE ALGEBRAIC STRUCTURES IN TERMS OF GEOMETRY AND DEFORMATION THEORY Fumiya Suenobu and Fujio Kubo; 1. Introduction; 2. Closest associative algebra structures; 2.1. The set of structure constants of associative algebras; 2.2. Expression of C We parameterize C in the case of n = 2; 2.3. Definition of the distance between the multiplications; 2.4. The closest associative structure
327   $a2.5. Example of the closest associative algebra structure
330   $aThe study of noncommutative rings is a major area in modern algebra. The structure theory of noncommutative rings was originally concerned with three parts: The study of semi-simple rings; the study of radical rings; and the construction of rings with given radical and semi-simple factor rings. Recently, this has extended to many new parts: The zero-divisor theory, containing the study of coefficients of zero-dividing polynomials and the study of annihilators over noncommutative rings, that is related to the Ko?the's conjecture; the study of nil rings and Jacobson rings; the study of applying r
606   $aRings (Algebra)$vCongresses
608   $aElectronic books.
615  0$aRings (Algebra)
676   $a510
676   $a512.4
701   $aKim$b Jin Yong$0987359
712 12$aKorea-China-Japan International Symposium on Ring Theory
801  0$bMiAaPQ
801  1$bMiAaPQ
801  2$bMiAaPQ
906   $aBOOK
912   $a9910451811403321
996   $aContemporary Ring Theory 2011$92256681
997   $aUNINA