On Restricted Leibniz Algebras |
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| Authors: | Ioannis Dokas Jean-Louis Loday |
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| Affiliation: | 1. Institute of Advanced Mathematics Research, Louis Pasteur University , Strasbourg, France dokas@math.u-strasbg.fr;3. Institute of Advanced Mathematics Research, Louis Pasteur University , Strasbourg, France |
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| Abstract: | ABSTRACT The role played by fields in relation to Galois Rings corresponds to semifields if the associativity is dropped, that is, if we consider Generalized Galois Rings instead of (associative) Galois rings. If S is a Galois ring and pS is the set of zero divisors in S, S* = S pS is known to be a finite {multiplicative} Abelian group that is cyclic if, and only if, S is a finite field, or S = ?/n? with n = 4 or n = p r for some odd prime p. Without associativity, S* is not a group, but a loop. The question of when this loop can be generated by a single element is addressed in this article. |
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| Keywords: | Diassociative algebra Leibniz algebra Pre-Lie algebra Restricted Leibniz algebra Restricted Lie algebra Zinbiel algebra |
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