Geometric configuration of integrally closed Noetherian domains

Abstract

In this paper, we completely describe the family of integrally closed Noetherian domains between Z[X] and Q[X]. We accomplish this result by classifying the Krull domains between these two polynomial rings. To this end, we first describe the DVRs of Q(X) lying over Z(p) for some prime p ∈ Z, by distinguishing them according to whether the extension of the residue fields is algebraic or transcendental. We unify the known descriptions of such valuations by considering ultrametric balls in Cp, the completion of the algebraic closure of the field Qp of p-adic numbers. We then study when the intersection R of such DVRs with Q[X] is of finite character, so that R is a Krull domain, and we finally compute the divisor class group of R. It turns out that such a ring is formed by those polynomials which simultaneously map a finite union of ultrametric balls of Cp to its valuation domain Op, as p∈Z ranges through the set of primes. By a result of Heinzer, the Krull domains of this class are precisely the integrally closed Noetherian domains between Z[X] and Q[X]. This novel approach provides a geometric understanding of this class of integrally closed domains. Furthermore, we also describe the UFDs between Z[X] and Q[X].