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List of contents
Preface 1 Non-Atomic Unique Factorization in Integral Domains 2 Divisibility Properties in Graded Integral Domains 3 Extensions of Half-Factorial Domains: A Survey 4 C-Monoids and Congruence Monoids in Krull Domains 5 Monotone Chains of Factorizations in C-Monoids 6 Transfer Principles in the Theory of Non-unique Factorizations 7 Cale Monoids, Cale Domains, and Cale Varieties 8 Weakly Krull Inside Factorial Domains 9 The m-Complement of a Multiplicative Set 10 Some Remarks on Infinite Products 11 Rings with Prime Nilradical 12 On the Ideal Generated by the Values of a Polynomial 13 Using Factorizations to Prove a Partition Identity 14 On Inside Factorial Integral Domains 15 Polynomial Separation of Points in Algebras 16 k-Factorized Elements in Telescopic Numerical Semigroups 17 Prufer Conditions in Rings with Zero-Divisors 18 Unmixedness and the Generalized Principal Ideal Theorem 19 A Note on Sets of Lengths of Powers of Elements of Finitely Generated Monoids 20 UMV-Domains 21 On Local Half-Factorial Orders 22 On Factorization in Krull Domains with Divisor Class Group Z2k 23 Integral Morphisms 24 A Special Type of Invertible Ideal 25 Factorization into Radical Ideals 26 Strongly Primary Ideals
About the author
Scott T. Chapman, Trinity University, San Antonio, Texas, U.S.A
Summary
Contains chapters that demonstrate the diversity of approaches taken in studying nonunique factorizations and serve both as an introduction to factorization theory and as a survey of trends and results. This book also provides chapters that show research motivated by arithmetical properties of commutative rings and monoids.
