On $\star $-Power Conductor domains

TL;DR

This paper introduces and characterizes $ ext{star}$-power conductor domains ($ ext{star}$-PCDs), generalizing properties of Pr"ufer and Krull domains, and explores their relation to integral closure and specific domain classes.

Contribution

It defines $ ext{star}$-PCDs, characterizes them via root closed domains, and links them to well-known classes like Pr"ufer and Krull domains, providing new insights and characterizations.

Findings

Pr"ufer domains are $d$-PCDs.

Krull domains are $v$-PCDs.

Noetherian domains are Krull if and only if they are $w$-PCDs.

Abstract

Let $D$ be an integral domain and $\star $ a star operation defined on $D$. We say that $D$ is a $\star $-power conductor domain ($\star $-PCD) if for each pair $a,b\in D\backslash (0)$ and for each positive integer $n$ we have $Da^{n}\cap Db^{n}=((Da\cap Db)^{n})^{\ast }.$ We study $\star $-PCDs and characterize them as root closed domains satisfying $ ((a,b)^{n})^{-1}=(((a,b)^{-1})^{n})^{\star }$ for all nonzero $a,b$ and all natural numbers $n\geq 1$. From this it follows easily that Pr\"{u}fer domains are $d$-PCDs (where $d$ denotes the trivial star operation), and $v$ -domains (e.g., Krull domains) are $v$-PCDs, thereby establishing that a $v$ -domain (e.g., a Prufer or Krull domain) is a $\star $ -PCD. We also consider when a $\star $-PCD is completely integrally closed, and this leads to new characterizations of Krulll domains. In particular, we show that a Noetherian domain is a Krull domain if and only if it is a $w$ -PCD.