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Lie Algebras, 2-Graphs and Permutation Groups

✍ Scribed by Liebeck, M. W.

Book ID
120093118
Publisher
Oxford University Press
Year
1980
Tongue
English
Weight
111 KB
Volume
12
Category
Article
ISSN
0024-6093

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Kaplansky introduced several classes of central simple Lie algebras in characteristic 2. We view these algebras in terms of graphs, and we classify them using a theorem of Shult characterizing graphs with the "cotriangle condition"; there is also a connection with Fischer's theorem on groups generat

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We show that each Mal'cev splittable -Lie algebra (i.e., each -Lie algebra where ad is splittable) with char = 0 may be realized as a splittable subalgebra of a gl V , where V is a finite-dimensional vector space over , and that each Mal'cev splittable analytic subgroup of a GL n , i.e., each subgro