Controlling distribution of prime sequences in discretely ordered principal ideal subrings of Q[x]

Abstract

We show how to construct discretely ordered principal ideal subrings of Q[x] with various types of prime behaviour. Given any set D consisting of finite strictly increasing sequences (d1,d2,…, dl) of positive integers such that, for each prime integer p, the set \p Z, d1+p Z,…, dl+p Z\ does not contain all the cosets modulo p, we can stipulate to have, for each (d1,…, dl)∈ D, a cofinal set of progressions (f, f+d1, …, f+dl) of prime elements in our principal ideal domain Rτ. Moreover, we can simultaneously guarantee that each positive prime g∈ Rτ N is either in a prescribed progression as above or there is no other prime h in Rτ such that g-h∈ Z. Finally, all the principal ideal domains we thus construct are non-Euclidean and isomorphic to subrings of the ring Z of profinite integers.