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

Zaituni Kansiime, Sholastica Luambano, Sarah Nakato, Hadijah Nalule, Yvette Ndayikunda

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 $M$, $\text{Int}(M, D) = \{f \in K[x] ~ \vert ~ f(M) \subseteq D\}$. For every multiset of integers $1 < z_1 \leq z_2 \leq \cdots \leq z_n$, we explicitly construct an element of $\text{Int}(M, D)$ with exactly $n$ essentially different factorizations into irreducible elements of $\text{Int}(M, D)$ whose lengths are $z_1, z_2, \ldots, z_n$. Furthermore, we show that $\text{Int}(M, D)$ is not a transfer Krull domain. These results spark off the study of sets of lengths in the rings $\text{Int}(S, D) \neq \text{Int}(D)$, where $S$ is an infinite subset of $D$.

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

Abstract

Let be a principal ideal domain with infinite spectrum such that for every nonzero prime ideal of , the residue field is finite. Let be the quotient field of . We investigate sets of lengths in the ring of integer-valued polynomials on , . For every multiset of integers , we explicitly construct an element of with exactly essentially different factorizations into irreducible elements of whose lengths are . Furthermore, we show that is not a transfer Krull domain. These results spark off the study of sets of lengths in the rings , where is an infinite subset of .
Paper Structure (7 sections, 7 theorems, 26 equations)

This paper contains 7 sections, 7 theorems, 26 equations.

Key Result

Lemma 2.4

GeHa2006:NonUnifacts Let $G$ be an additively written Abelian group and $G^{\bullet} = G \setminus \{0\}$. Let $U, V$ be irreducible elements of $\mathcal{B}(G^{\bullet})$.

Theorems & Definitions (19)

  • Definition 2.1
  • Definition 2.2
  • Definition 2.3
  • Lemma 2.4
  • Definition 2.5
  • Remark 2.6
  • Definition 2.7
  • Definition 2.8
  • Remark 2.10
  • Theorem 2.11
  • ...and 9 more