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Displaying similar documents to “Centralizers of gap groups”

Finite-finitary, polycyclic-finitary and Chernikov-finitary automorphism groups

B. A. F. Wehrfritz (2015)

Colloquium Mathematicae

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If X is a property or a class of groups, an automorphism ϕ of a group G is X-finitary if there is a normal subgroup N of G centralized by ϕ such that G/N is an X-group. Groups of such automorphisms for G a module over some ring have been very extensively studied over many years. However, for groups in general almost nothing seems to have been done. In 2009 V. V. Belyaev and D. A. Shved considered the general case for X the class of finite groups. Here we look further at the finite case...

A generalization of cohomotopy groups

Jerzy Dydak (1975)

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Introduction to sporadic groups.

Boya, Luis J. (2011)

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A remark on right groups

S. Lajos (1964)

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Some remarks on monothetic groups

S. Rolewicz (1964)

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Generalized Shubnikov space groups.

Yablan, Slavik (1986)

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Associate and pseudoassociate sets in LCA groups

Colin C. Graham (1977)

Colloquium Mathematicae

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Simple and multiple antisymmetry point groups

S. V. Jablan (1987)

Matematički Vesnik

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The groups of order at most 2000.

Besche, Hans Ulrich, Eick, Bettina, O'Brien, E.A. (2001)

Electronic Research Announcements of the American Mathematical Society [electronic only]

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Dependence in groups

R.C. Lyndon (1966)

Colloquium Mathematicae

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Computation of five- and six-dimensional Bieberbach groups.

Cid, Carlos, Schulz, Tilman (2001)

Experimental Mathematics

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Associate and pseudoassociate sets in LCA groups, II

Colin C. Graham (1978)

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A $P L Y$ inequality for Kleinian groups.

Petersen, Carsten Lunde (1993)

Annales Academiae Scientiarum Fennicae. Series A I. Mathematica

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Simple modules over CC-groups and monolithic just non-CC-groups

L. A. Kurdachenko, J. Otal (2001)

Bollettino dell'Unione Matematica Italiana

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In questo lavoro studiamo i non CC-gruppi $G$ monolitici con tutti i quozienti propri CC-gruppi, che hanno sottogruppi abeliani normali non banali.