Krull Semigroups and Divisor Class Groups

Leo G. Chouinard II

doi:10.4153/CJM-1981-112-x

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R. Matsuda has shown that a group ring is a Krull domain if and only if the coefficient ring is a Krull domain and the group is a torsion-free abelian group satisfying the ascending chain condition (ace) on cyclic subgroups [6]. D. F. Anderson has used this to obtain a partial determination of when a semigroup ring is a Krull domain, and under certain circumstances to describe the divisor class group of such a ring ([1], [2]). Using some of Anderson's techniques, but taking a different approach, we arrive at a complete answer of a different nature to these questions. We call a semigroup satisfying the major new conditions arising a Krull semigroup, and define its divisor class group.

In particular, every abelian group is the divisor class group of such a ring, and it follows that every abelian group is the divisor class group of a quasi-local ring, which seems to be a new result.

References

1. Anderson, D. F., Graded Krull domains, Comm. in Alg. 7 (1979), 79–106.Google Scholar

2. Anderson, D. F., The divisor class group of a semigroup ring, Comm. in Alg. 8 (1980), 467–476.Google Scholar

3. Anderson, D. F. and Ohm, J., Valuations and semi-valuations of graded domains, preprint.Google Scholar

4. Bourbaki, N., Commutative algebra, (Addison-Wesley, Reading, Mass., 1972).Google Scholar

5. Claborn, L., Every abelian group is a class group, Pac. J. Math. 18 (1966), 219–222.Google Scholar

6. Matsuda, R., On algebraic properties of infinite group rings, Bull. Fac. Sci. Ibaraki Univ. 7 (1975), 29–37.Google Scholar

7. Samuel, P., Lecture on unique factorization domains, Tata Institute, Bombay (1964).Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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