Injective Modules and Injective Quotient Rings: Lecture Notes in Pure and Applied Mathematics
Autor Carl Faithen Limba Engleză Paperback – 29 ian 1982
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Specificații
ISBN-13: 9780824716325
ISBN-10: 0824716329
Pagini: 120
Dimensiuni: 178 x 254 x 9 mm
Greutate: 0.23 kg
Ediția:1
Editura: CRC Press
Colecția CRC Press
Seria Lecture Notes in Pure and Applied Mathematics
ISBN-10: 0824716329
Pagini: 120
Dimensiuni: 178 x 254 x 9 mm
Greutate: 0.23 kg
Ediția:1
Editura: CRC Press
Colecția CRC Press
Seria Lecture Notes in Pure and Applied Mathematics
Public țintă
ProfessionalCuprins
PREFACE -- PART I INJECTIVE MODULES OVER LEVITZKI RINGS -- Abstract -- 1. Introduction -- 2. Annihilators and the Galois Connection -- 3. Levitzki Modules -- 4. Finite Annihilators -- 5. Sigma Quasi-injective Modules -- Appendix -- 6. Lemmas from Fitting-Krull-Schmidt -- 7. The Teply-Miller Theorem -- 8. A-Injective Modules -- 9. Kasch Rings -- 10. A-Rings -- Appendix -- 11. Injective Modules Over Nonnoetherian Commutative Rings -- 11.1 Introduction -- 11.2 Preliminaries -- 11.3 Proof of Beck’s Theorem -- 11.4 Commutative Sigma and Delta Rings -- 11.5 Artinian (Noetherian) Injectives Are Sigma (Delta) Injective -- 11.6 A-Polynomial Rings Are Polynomials Over A-Rings -- Problems -- Notes -- Acknowledgments -- References -- PART II INJECTIVE QUOTIENT RINGS OF COMMUTATIVE RINGS -- Abstract -- 1. Introduction -- 2. Survey of Relevant Background -- 3. Lemmas -- 4. Proof of Theorem B -- 5. Quotient-injective Pre-FPF Rings Are FPF -- 6. CFPF = FSI -- 7. FPF Rings with Semilocal Quotient Rings -- 8. FPF Rings with PF Quotient Rings -- 9. Note on the Genus of a Module and Generic Families of Rings -- 10. FP2F and CFP2F Rings and the "Big" Genus -- Problems -- References -- Abbreviations – INDEX.
Descriere
Part I, studies an injective module E and chain conditions on the set A^(E,R) of right ideals annihilated by subsets of E. Part II is on the subject of (F)PF, or (finitely) pseudo-Frobenius, rings [i.e., all (finitely generated) faithful modules generate the category mod-R of all R-modules].