Sets of Lengths of Integer-Valued Polynomials on Prime Ideals of Principal Ideal Domains

Abstract

Let D be a principal ideal domain with infinite spectrum such that for every nonzero prime ideal M of D, the residue field D/M is finite. Let K be the quotient field of D. We investigate sets of lengths in the ring of integer-valued polynomials on M, Int(M, D) = \f ∈ K[x] ~ ~ f(M) ⊂eq D\. For every multiset of integers 1 < z1 ≤ z2 ≤ ·s ≤ zn, we explicitly construct an element of Int(M, D) with exactly n essentially different factorizations into irreducible elements of Int(M, D) whose lengths are z1, z2, …, zn. Furthermore, we show that Int(M, D) is not a transfer Krull domain. These results spark off the study of sets of lengths in the rings Int(S, D) ≠ Int(D), where S is an infinite subset of D.