The ring of polynomials integral-valued over a finite set of integral elements

Abstract

Let D be an integral domain with quotient field K and a finite subset of D. McQuillan proved that the ring Int(,D) of polynomials in K[X] which are integer-valued over , that is, f∈ K[X] such that f()⊂ D, is a Pr\"ufer domain if and only if D is Pr\"ufer. Under the further assumption that D is integrally closed, we generalize his result by considering a finite set S of a D-algebra A which is finitely generated and torsion-free as a D-module, and the ring IntK(S,A) of integer-valued polynomials over S, that is, polynomials over K whose image over S is contained in A. We show that the integral closure of IntK(S,A) is equal to the contraction to K[X] of Int(S,DF), for some finite subset S of integral elements over D contained in an algebraic closure K of K, where DF is the integral closure of D in F=K(S). Moreover, the integral closure of IntK(S,A) is Pr\"ufer if and only if D is Pr\"ufer. The result is obtained by means of the study of pullbacks of the form D[X]+p(X)K[X], where p(X) is a monic non-constant polynomial over D: we prove that the integral closure of such a pullback is equal to the ring of polynomials over K which are integral-valued over the set of roots p of p(X) in K.