The \(M\)-principal graph of a commutative ring (Q397091): Difference between revisions
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| Property / review text | |||
In the present paper, the authors introduce the \(M\)-principal graph of \(R\), denoted by \(M - \mathrm{PG}(R)\), where \(M\) is an \(R\)-module of a commutative ring \(R\). It is the graph whose vertex set is \(R\setminus\{0\}\), and two distinct vertices \(x\) and \(y\) are adjacent if and only if \(x M = y M\). They study properties of \(\mathrm{PG}(R)\) and some relations between \(\mathrm{PG}(R)\), when \(R=M\), and \(M - \mathrm{PG}(R)\) are established. In particular, the authors consider the graph \(\mathrm{PG}(\mathbb{Z}_n)\) for each positive integer \(n > 1\). | |||
| Property / review text: In the present paper, the authors introduce the \(M\)-principal graph of \(R\), denoted by \(M - \mathrm{PG}(R)\), where \(M\) is an \(R\)-module of a commutative ring \(R\). It is the graph whose vertex set is \(R\setminus\{0\}\), and two distinct vertices \(x\) and \(y\) are adjacent if and only if \(x M = y M\). They study properties of \(\mathrm{PG}(R)\) and some relations between \(\mathrm{PG}(R)\), when \(R=M\), and \(M - \mathrm{PG}(R)\) are established. In particular, the authors consider the graph \(\mathrm{PG}(\mathbb{Z}_n)\) for each positive integer \(n > 1\). / rank | |||
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| Property / reviewed by | |||
| Property / reviewed by: Vilmar Trevisan / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 05C25 / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 05C69 / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 13A99 / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 13C99 / rank | |||
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| Property / zbMATH DE Number | |||
| Property / zbMATH DE Number: 6330550 / rank | |||
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| Property / zbMATH Keywords | |||
\(M\)-principal graph | |||
| Property / zbMATH Keywords: \(M\)-principal graph / rank | |||
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| Property / zbMATH Keywords | |||
commutative ring | |||
| Property / zbMATH Keywords: commutative ring / rank | |||
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| Property / zbMATH Keywords | |||
module | |||
| Property / zbMATH Keywords: module / rank | |||
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| Property / zbMATH Keywords | |||
clique number | |||
| Property / zbMATH Keywords: clique number / rank | |||
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| Property / zbMATH Keywords | |||
independence number | |||
| Property / zbMATH Keywords: independence number / rank | |||
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Revision as of 15:32, 29 June 2023
scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The \(M\)-principal graph of a commutative ring |
scientific article |
Statements
The \(M\)-principal graph of a commutative ring (English)
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14 August 2014
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In the present paper, the authors introduce the \(M\)-principal graph of \(R\), denoted by \(M - \mathrm{PG}(R)\), where \(M\) is an \(R\)-module of a commutative ring \(R\). It is the graph whose vertex set is \(R\setminus\{0\}\), and two distinct vertices \(x\) and \(y\) are adjacent if and only if \(x M = y M\). They study properties of \(\mathrm{PG}(R)\) and some relations between \(\mathrm{PG}(R)\), when \(R=M\), and \(M - \mathrm{PG}(R)\) are established. In particular, the authors consider the graph \(\mathrm{PG}(\mathbb{Z}_n)\) for each positive integer \(n > 1\).
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\(M\)-principal graph
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commutative ring
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module
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clique number
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independence number
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