Finitely generated modules over quasi-Euclidean rings
Abstract
Let R be a unital commutative ring and let be an -module that is generated by elements but not less. Let be the subgroup of generated by the elementary matrices. In this paper we study the action of by matrix multiplication on the set of unimodular rows of of length . Assuming is moreover Noetherian and quasi-Euclidean, e.g., is a direct sum of finitely many Euclidean rings, we show that this action is transitive if . We also prove that is equipotent with the unit group of where is the first invariant factor of . These results encompass the well-known classification of Nielsen non-equivalent generating tuples in finitely generated Abelian groups.
Cite
@article{arxiv.1604.07813,
title = {Finitely generated modules over quasi-Euclidean rings},
author = {Luc Guyot},
journal= {arXiv preprint arXiv:1604.07813},
year = {2017}
}
Comments
7 pages, no figure. Results and proofs are unchanged. The modifications are the following: - one new reference - correction of a very confusing typo in Corollary C (the author thanks W. van der Kallen) - correction of two typos on page 6 (the author thanks D. Oancea)