Ideal Systems: An Introduction to Multiplicative Ideal Theory

Part 1 General ideal theory: monoids and monoid homomorphisms arithmetic of ideal systems finitary and noetherian ideal systems monoids of quotients comparison and mappings of ideal systems prime and primary ideals quotients of primary ideals and primary decompositions strictly noetherian ideal systems the intersection theorem and the principal ideal theorem. Part 2 Multiplicative ideal theory: abstract elementary number theory fractional divisorial ideals invertible ideals and class groups arithmetic of invertible and cancellative ideals integrative closures valuation monoids and primary monoids ideal theory of valuation monoids Prufer and Bezout monoids essential homomorphisms, GCD-homomorphisms and valuations Lorenzen monoids quasi divisor theories defining systems Krull monoids and generalizations (almost) Dedekind and Krull monoids t-noetherian monoids approximation theorems divisorial defining systems and class groups arithmetical properties of overmonoids solutions of exercises a guide to results on special integral domains.