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O-minimal cohomology: Finiteness and invariance results
Journal of Mathematical Logic 9 (2):167-182 (2009)
Abstract
The topology of definable sets in an o-minimal expansion of a group is not fully understood due to the lack of a triangulation theorem. Despite the general validity of the cell decomposition theorem, we do not know whether any definably compact set is a definable CW-complex. Moreover the closure of an o-minimal cell can have arbitrarily high Betti numbers. Nevertheless we prove that the cohomology groups of a definably compact set over an o-minimal expansion of a group are finitely generated and invariant under elementary extensions and expansions of the language.Other Versions
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Berarducci, A. and Fornasiero, A., o-Minimal Cohomology: Finiteness and Invariance Results 2 (2009) 167 Burdges, J. and Cherlin, G., Semisimple Torsion in Groups of Finite Morley Rank 2 (2009) 183. [REVIEW]S. R. Buss & A. Beckmann - 2009 - Journal of Mathematical Logic 9 (2):285.
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2010-08-30
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Citations of this work
Cohomology of groups in o-minimal structures: acyclicity of the infinitesimal subgroup.Alessandro Berarducci - 2009 - Journal of Symbolic Logic 74 (3):891-900.
References found in this work
Sheaf cohomology in o-minimal structures.Mário J. Edmundo, Gareth O. Jones & Nicholas J. Peatfield - 2006 - Journal of Mathematical Logic 6 (2):163-179.
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