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The Jordan-Hölder theorem and prefrattini subgroups of finite groups
Published online by Cambridge University Press: 18 May 2009
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All groups considered are finite. In recent years a number of generalizations of the classic Jordan-Hölder Theorem have been obtained (see [7], Theorem A.9.13): in a finite group G a one-to-one correspondence as in the Jordan-Holder Theorem can be defined preserving not only G-isomorphic chief factors but even their property of being Frattini or non-Frattini chief factors. In [2] and [13] a new direction of generalization is presented: the above correspondence can be defined in such a way that the corresponding non-Frattini chief factors have the same complement (supplement).
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- Copyright © Glasgow Mathematical Journal Trust 1995
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