Simplicity on accessible and \((-1,1)\) rings (Q2853467)
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scientific article; zbMATH DE number 6217785
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Simplicity on accessible and \((-1,1)\) rings |
scientific article; zbMATH DE number 6217785 |
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22 October 2013
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non-associative ring
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accessible ring
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\((-1,1)\)-ring
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Simplicity on accessible and \((-1,1)\) rings (English)
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A nonassociative ring \(R\) is called a \((-1,1)\)-ring if \(R\) satisfies the following identities: NEWLINE\[NEWLINE(x,y,z)+(x,z,y)=0,\;(x,y,z)+(y,z,x)+(z,x,y)=0,NEWLINE\]NEWLINE where \((x,y,z)=(xy)z-x(yz)\) is the associator. A nonassociative ring \(R\) is accessible if the following identities NEWLINE\[NEWLINE(x,y,z)+(z,x,y)-(x,z,y)=0,\;(wx,y,z)=0NEWLINE\]NEWLINE are satisfied. In this paper, the following theorem is proved: Let \(R\) be a simple \((-1,1)\)-ring of characteristic \(\neq 2,3\). If \(R\) is neither associative nor commutative then \(R\) is a simple accessible ring.
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