groups whose proper subgroups of infinite rank have polycyclic-by-finite conjugacy classes
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abstract
a group g is said to be a (pf)c-group or to have polycyclic-by-finite conjugacy classes, if g/c_{g}(x^{g}) is a polycyclic-by-finite group for all xin g. this is a generalization of the familiar property of being an fc-group. de falco et al. (respectively, de giovanni and trombetti) studied groups whose proper subgroups of infinite rank have finite (respectively, polycyclic) conjugacy classes. here we consider groups whose proper subgroups of infinite rank are (pf)c-groups and we prove that if g is a group of infinite rank having a non-trivial finite or abelian factor group and if all proper subgroups of g of infinite rank are (pf)c-groups, then so is g. we prove also that if g is a locally soluble-by-finite group of infinite rank which has no simple homomorphic images of infinite rank and whose proper subgroups of infinite rank are (pf)c-groups, then so are all proper subgroups of g.
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Journal title:
international journal of group theoryPublisher: university of isfahan
ISSN 2251-7650
volume
issue Articles in Press 2015
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