Another Prüfer Ring of Integer-Valued Polynomials

Let D be a domain with quotient field K. We consider the ring Int D [ f g w x Ž . x K X ; f D : D of integer-valued polynomial rings over D. We completely Ž . characterize the domains D for which Int D is a Prufer ¨-multiplication domain. ᮊ

Let D be the ring of integers of a number field K and let E be an infinite subset of D. The D-module Int(E, D) of integer-valued polynomials on E is isomorphic to n=0 I n g n where g n is a monic polynomial in D[X] of degree n and I n is a fractional ideal of D. For each maximal ideal m of D, let v

Let R be a domain and K its quotient-field. For a subset S of K, let F R (S) be the set of polynomials f # K[x] with f (S ) R and define the R-closure of S as the set of those t # K for which f (t) # R for all f # F R (S ). The concept of R-closure was introduced by McQuillan (J. Number Theory 39 (1

Conditions for a finite rank module over an almost maximal valuation domain to be a direct sum of uniserials are developed.