Geodesic
Finite-finitary, polycyclic-finitary and Chernikov-finitary automorphism groups
B. A. F. Wehrfritz1
1 School of Mathematical Sciences Queen Mary University of London London E1 4NS, England
Colloquium Mathematicum, Tome 138 (2015) no. 1, pp. 1-22.

Voir la notice de l'article provenant de la source Institute of Mathematics Polish Academy of Sciences

If X is a property or a class of groups, an automorphism $\phi $ of a group $G$ is X-finitary if there is a normal subgroup $N$ of $G$ centralized by $\phi $ 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 but our main results concern the cases where X is either the class of polycyclic-by-finite groups or the class of Chernikov groups. The latter presents a new perspective on some work of Ya. D. Polovitskiĭ in the 1960s, which seems to have been at least partially overlooked in recent years. Our polycyclic cases present a different view of work of S. Franciosi, F. de Giovanni and M. J. Tomkinson from 1990. We describe the polycyclic cases in terms of matrix groups over the integers, and the Chernikov case in terms of matrix groups over the complex numbers.
DOI : 10.4064/cm138-1-1
Keywords: property class groups automorphism phi group finitary there normal subgroup centralized phi group groups automorphisms module ring have extensively studied many years however groups general almost nothing seems have done belyaev shved considered general class finite groups here look further finite main results concern cases where either class polycyclic by finite groups class chernikov groups latter presents perspective work nbsp polovitski which seems have least partially overlooked recent years polycyclic cases present different view work nbsp franciosi giovanni tomkinson describe polycyclic cases terms matrix groups integers chernikov terms matrix groups complex numbers

B. A. F. Wehrfritz 1

1 School of Mathematical Sciences Queen Mary University of London London E1 4NS, England 
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B. A. F. Wehrfritz. Finite-finitary, polycyclic-finitary and Chernikov-finitary automorphism groups. Colloquium Mathematicum, Tome 138 (2015) no. 1, pp. 1-22. doi : 10.4064/cm138-1-1. http://geodesic.mathdoc.fr/articles/10.4064/cm138-1-1/

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