Effectively bounded idempotent generation of certain 2 × 2 singular matrices by idempotent matrices over real quadratic number rings

Abstract

Let k = Q(α) be a real quadratic number field, where α is a positive square-free integer. Let Ok be the ring of integers of k. In this paper, we prove that a certain set of 2 × 2 singular matrices with entries in Ok can be written as a product of a bounded number of idempotent matrices. Our main theorem can be viewed as a generalization of the recent result by Cossu and Zanardo, which studies finite generation of certain singular matrices by idempotent matrices over Ok instead of bounded generation of certain singular matrices by idempotent matrices over Ok as considered in this paper.