On super v-domains

Abstract

An integral domain D, with quotient field K, is a v-domain if for each nonzero finitely generated ideal A of D we have (AA-1)-1=D. It is well known that if D is a v-domain, then some quotient ring DS of D may not be a v-domain. Calling D a super v-domain if every quotient ring of D is a v-domain we characterize super v-domains as locally v-domains. Using techniques from factorization theory we show that D is a super v-domain if and only if D[X] is a super v-domain if and only if D+XK[X] is a super v-domain and give new examples of super v -domains that are strictly between v-domains and P-domains that were studied in [Manuscripta Math. 35(1981)1-26]