Non-P\'olya bi-quadratic fields with an Euclidean ideal class

Abstract

For an integral domain R, the ring of integer-valued polynomials over R consists of all polynomials f(X) ∈ R[X] such that f(R) ⊂eq R. An interesting case to study is when R is a Dedekind domain, in particular when R is the ring of integers of an algebraic number field. An algebraic number field K with ring of integers OK is said to be a P\'olya field if the OK-module of integer-valued polynomials on K admits a regular basis. Associated to K is a subgroup Po(K) of the ideal class group ClK, known as the P\'olya group of K, that measures the failure of K from being a P\'olya field. In this paper, we prove the existence of three pairwise distinct totally real bi-quadratic fields, each having P\'olya group isomorphic to Z/2Z. This extends the previously known families of number fields considered by Heidaryan and Rajaei in rajaei-jnt and rajaei. Our results also establish that under mild assumptions, the possibly infinite families of bi-quadratic fields having a non-principal Euclidean ideal class, considered in self-jnt, fail to be P\'olya fields.