On the centralizer of an I-matrix in M2(R/I), I a principal ideal and R a UFD

Abstract

The concept of an I-matrix in the full 2× 2 matrix ring M2(R/I), where R is an arbitrary UFD and I is a nonzero ideal in R, was introduced in mar. Moreover a concrete description of the centralizer of an I-matrix B in M2(R/I) as the sum of two subrings S1 and S2 of M2(R/I) was also given, where S1 is the image (under the natural epimorphism from M2(R) to M2(R/I)) of the centralizer in M2(R) of a pre-image of B, and where the entries in S2 are intersections of certain annihilators of elements arising from the entries of B. In the present paper, we obtain results for the case when I is a principal ideal <k>, k∈ R a nonzero nonunit. Mainly we solve two problems. Firstly we find necessary and sufficient conditions for when S1⊂eq S2, for when S2⊂eq S1 and for when S1= S2. Secondly we provide a formula for the number of elements in the centralizer of B for the case when R/<k> is finite.