English

Subintegrality, Invertible Modules and Laurent Polynomial Extensions

Commutative Algebra 2014-11-03 v2

Abstract

Let ABA\subseteq B be a commutative ring extension. Let I(A,B)\mathcal I(A, B) be the multiplicative group of invertible AA-submodules of BB. In this article, we extend a result of Sadhu and Singh by finding a necessary and sufficient condition on an integral birational extension ABA\subseteq B of integral domains with dimA1\dim A\leq 1, so that the natural map I(A,B)I(A[X,X1],B[X,X1])\mathcal I(A,B) \rightarrow \mathcal I (A [X, X^{-1}],B [X, X^{-1}]) is an isomorphism. In the same situation, we show that if dimA2\dim A\geq 2 then the condition is necessary but not sufficient. We also discuss some properties of the cokernel of the natural map I(A,B)I(A[X,X1],B[X,X1])\mathcal I(A,B) \rightarrow \mathcal I (A [X, X^{-1}],B [X, X^{-1}]) in the general case.

Keywords

Cite

@article{arxiv.1404.6498,
  title  = {Subintegrality, Invertible Modules and Laurent Polynomial Extensions},
  author = {Vivek Sadhu},
  journal= {arXiv preprint arXiv:1404.6498},
  year   = {2014}
}

Comments

13 pages, Some changes made due to referee report, To appear in Proc. Indian Acad. Sci. (Math. Sci)

R2 v1 2026-06-22T03:58:52.210Z