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Chief factors covered by projectors of soluble Leibniz algebras
Published 10 Oct 2011 in math.RA | (1110.1932v1)
Abstract: Let F be a saturated formation of soluble Leibniz algebras. Let K be an F-projector and A/B a chief factor of the soluble Leibniz algebra L. It is well-known that if A/B is F-central, then K covers A/B. I prove the converse: if K covers A/B, then A/B is F-central.
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