Computing J-ideals of a matrix over a principal ideal domain

Abstract

Given a square matrix B over a principal ideal domain D and an ideal J of D, the J-ideal of B consists of the polynomials f∈ D[X] such that all entries of f(B) are in J. It has been shown that in order to determine all J-ideals of B it suffices to compute a generating set of the (pt)-ideal of B for finitely many prime powers pt. Moreover, it is known that (pt)-ideals are generated by polynomials of the form pt-ss where s is a monic polynomial of minimal degree in the (ps)-ideal of B for some s t. However, except for the case of diagonal matrices, it was not known how to determine these polynomials explicitly. We present an algorithm which allows to compute the polynomials s for general square matrices. Exploiting one of McCoy's theorems we first compute some set of generators of the (ps)-ideal of B which then can be used to determine s. This algorithmic computation significantly extends our understanding of the J-ideals of B.