Intersection homology Poincaré spaces and the characteristic variety theorem (Q919672)
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scientific article; zbMATH DE number 4161698
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Intersection homology Poincaré spaces and the characteristic variety theorem |
scientific article; zbMATH DE number 4161698 |
Statements
Intersection homology Poincaré spaces and the characteristic variety theorem (English)
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1990
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This paper affirms the conjecture of Goresky and Siegel that the L-groups \(L^*(Z)\) of Mishchenko and Ranicki are geometrically realized as bordism groups \(\Omega_*^{IP}\) of pseudomanifolds whose intersection homology groups satisfy Poincaré duality. The paper also formulates a characteristic variety theorem as proposed by Sullivan. Specifically [X,G/TOP] is given by \({\tilde \Omega}{}^ o_{IP}(X)per\), a related 4- fold periodic cohomology theory.
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geometrically realized as bordism groups of pseudomanifolds
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L-groups
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intersection homology groups
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Poincaré duality
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characteristic variety theorem
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0.9305949
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0.92642784
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0.92630064
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0.92411554
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0.92129207
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0.9199047
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0.91756105
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0.91711104
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