On units in loop algebra \(F[M(\mathrm{Dih}(C_p^2),2)]\) (Q1702745)
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scientific article; zbMATH DE number 6845415
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On units in loop algebra \(F[M(\mathrm{Dih}(C_p^2),2)]\) |
scientific article; zbMATH DE number 6845415 |
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On units in loop algebra \(F[M(\mathrm{Dih}(C_p^2),2)]\) (English)
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28 February 2018
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Let \(L=M(G,2)\) be a Moufang loop, \(F[L]\) be its loop algebra over a field \(F\) and \(J(F[L])\) be the Jacobson radical of \(F[L]\). The author described the unit loop of \(F[L]/J(F[L])\) and the structure of \(1+J(F[L])\), where \(L=M(G,2)\) is obtained from the generalized dihedral group \(G=\mathrm{Dih}(C_p^2)\), \(p>2\) is prime and \(F\) is a finite field of characteristic \(2\) containing a primitive \(p\)th root of unity.
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loop algebra
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unit loop
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general linear loop
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Zorn's algebra
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