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Centralisers of finite subgroups in soluble groups of type FPn
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Dessislava H. Kochloukova
,
Conchita Martínez-Pérez
Published/Copyright:
April 13, 2010
Abstract
We show that for soluble groups of type FPn, centralisers of finite subgroups need not be of type FPn.
Keywords.: Bredon cohomology; cohomological finiteness conditions; proper classifying space; centralisers of finite subgroups
Received: 2008-01-04
Published Online: 2010-04-13
Published in Print: 2011-January
© de Gruyter 2011
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Articles in the same Issue
- Semi-classical limits of the first eigenfunction and concentration on the recurrent sets of a dynamical system
- Ree geometries
- Centralisers of finite subgroups in soluble groups of type FPn
- Visibility and diameter maximization of convex bodies
- The Bergman kernel and mass equidistribution on the Siegel modular variety
- Lp boundedness for parabolic Schrödinger type operators with certain nonnegative potentials
- Weighted Strichartz estimates with angular regularity and their applications
- Classification of (1, 2)-Grassmann secant defective threefolds
Keywords for this article
Bredon cohomology;
cohomological finiteness conditions;
proper classifying space;
centralisers of finite subgroups
Articles in the same Issue
- Semi-classical limits of the first eigenfunction and concentration on the recurrent sets of a dynamical system
- Ree geometries
- Centralisers of finite subgroups in soluble groups of type FPn
- Visibility and diameter maximization of convex bodies
- The Bergman kernel and mass equidistribution on the Siegel modular variety
- Lp boundedness for parabolic Schrödinger type operators with certain nonnegative potentials
- Weighted Strichartz estimates with angular regularity and their applications
- Classification of (1, 2)-Grassmann secant defective threefolds
