Elasticity in polynomial-type extensions
Commutative Algebra
2013-02-21 v1
Abstract
The elasticity of an atomic integral domain is, in some sense, a measure of how far the domain is from being a unique factorization domain (or, more properly, a half-factorial domain). We consider the relationship between the elasticity of a domain, R, and the elasticity of its polynomial ring R[x]. For example, if R has at least one atom, a sufficient condition for the polynomial ring R[x] to have elasticity 1 is that every nonconstant irreducible polynomial f in R[x] be irreducible in K[x]. We will determine the integral domains R whose polynomial rings satisfy this condition.
Keywords
Cite
@article{arxiv.1302.4766,
title = {Elasticity in polynomial-type extensions},
author = {Mark Batell and Jim Coykendall},
journal= {arXiv preprint arXiv:1302.4766},
year = {2013}
}
Comments
9 pages