On the structure of groups, possessing Carter subgroups of odd order
Abstract
In the note we prove that all composition factors of a finite group possessing a Carter subgroup of odd order either are abelain, or are isomorphic to L2(32n+1).
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In the note we prove that all composition factors of a finite group possessing a Carter subgroup of odd order either are abelain, or are isomorphic to L2(32n+1).