Table of Contents
Fetching ...

On strongly multiplicative sets

Suat Koç

Abstract

A multiplicative subset $S$ of a ring $R$ is called \textit{strongly multiplicative} if $(\bigcap_{i\inΔ}s_iR)\cap S \neq \emptyset$ for each family $(s_i)_{i\inΔ}$ of elements in $S$. In this paper, we investigate how these sets help stabilize localization and ideal operations. We show that localization and arbitrary intersections commute, meaning $S^{-1}(\bigcap I_α) = \bigcap S^{-1}I_α$ for any family of ideals, if and only if $S$ is strongly multiplicative. Furthermore, we characterize some important classes of rings, such as total quotient rings and strongly zero-dimensional rings, in terms of strongly multiplicative sets. We also answer an open question by Hamed and Malek about whether this condition is needed for the existence of $S$-minimal primes. Furthermore, we demonstrate that if $S$ is a strongly multiplicative set and $S \not\subseteq U(R)$, then $S$-minimal primes are not classical prime ideals, and we provide an algorithmic approach to constructing such ideals. Finally, we prove a Strong Krull's Separation Lemma, which guarantees a maximal ideal disjoint from $S$. As an application of Strong Krull's Separation Lemma, we establish a one-to-one correspondence between the maximal ideals of $S^{-1}R$ and the maximal ideals of $R$ disjoint from a strongly multiplicative set $S$ of $R$.

On strongly multiplicative sets

Abstract

A multiplicative subset of a ring is called \textit{strongly multiplicative} if for each family of elements in . In this paper, we investigate how these sets help stabilize localization and ideal operations. We show that localization and arbitrary intersections commute, meaning for any family of ideals, if and only if is strongly multiplicative. Furthermore, we characterize some important classes of rings, such as total quotient rings and strongly zero-dimensional rings, in terms of strongly multiplicative sets. We also answer an open question by Hamed and Malek about whether this condition is needed for the existence of -minimal primes. Furthermore, we demonstrate that if is a strongly multiplicative set and , then -minimal primes are not classical prime ideals, and we provide an algorithmic approach to constructing such ideals. Finally, we prove a Strong Krull's Separation Lemma, which guarantees a maximal ideal disjoint from . As an application of Strong Krull's Separation Lemma, we establish a one-to-one correspondence between the maximal ideals of and the maximal ideals of disjoint from a strongly multiplicative set of .
Paper Structure (5 sections, 22 theorems, 1 algorithm)

This paper contains 5 sections, 22 theorems, 1 algorithm.

Key Result

Proposition 2.3

Let $R$ be a ring and $S$ be a multiplicative set of $R$. Then $S$ is a strongly multiplicative set if and only if $S$ satisfies maximal multiple condition.

Theorems & Definitions (58)

  • Definition 2.1
  • Example 2.2
  • Proposition 2.3
  • proof
  • Lemma 2.4
  • proof
  • Proposition 2.5
  • proof
  • Corollary 2.6
  • proof
  • ...and 48 more