Results 41 to 50 of about 2,416,536 (63)
Cohomology of nilpotent groups of class 2
We compute the cohomology rings of a number of nilpotent groups of class 2 for appropriate coefficients, and we do some more sample calculations of various cohomology groups.
Huebschmann, Johannes
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Chernikov p-groups and integral p-adic representations of finite groups
Изучается связь между p-группами Черникова и целочисленными р-адическими представле ниями конечных р-групп. Приводится описание с точностью до изоморфизма некоторых классов р-групп Черникова.The connection is studied between Chernikov p-groups and ...
Ващук, Ф.Г. +2 more
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Free centre-by-nilpotent-by-abelian groups
We prove that the free centre-by-(nilpotent-of-class-(c - 1))-by-abelian groups F/[γc(F′), F] are torsion-free for c = 6. This is in startling contrast to the cases when c is a prime and when c = 4, where these relatively free groups contain non-trivial ...
Johnson, Marianne +2 more
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Nilpotent groups and their automorphisms
The fact that nilpotent groups are close to being commutative means that it is possible to apply linear methods to their study. In this volume, based on a special course given by the author at Novosibirsk University, Russia in 1988-1990, linear methods ...
Evgeny Khukhro (17161393)
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Combing nilpotent and polycyclic groups
The notable exclusions from the family of automatic groups are those nilpotent groups which are not virtually abelian, and the fundamental groups of compact 3-manifolds based on the Nil or Sol geometries.
Rees S; Gilman RH; Holt DF
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On the Nilpotent Representation Theory of Groups
In this article, we establish results concerning the nilpotent representation theory of groups. In particular, we utilize a theorem of Stallings to provide a general method that constructs pairs of groups that have isomorphic universal nilpotent ...
Milana D Golich (18423324)
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The Jacobson topology of Prim* L¹(G) for exponential Lie groups
Ungermann O. The Jacobson topology of Prim* L¹(G) for exponential Lie groups.
Ungermann, Oliver
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We develop a general theory for asymptotically CAT(0) groups; these are groups acting geometrically on a geodesic space, all of whose asymptotic cones are CAT(0)
Kar, Aditi
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Combing nilpotent and polycyclic groups
The notable exclusions from the family of automatic groups are those nilpotent groups which are not virtually abelian, and the fundamental groups of compact 3-manifolds based on the Nil or Sol geometries.
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