Intersection Spaces, Spatial Homology Truncation, and String Theory

Intersection cohomology assigns groups which satisfy a generalized form of Poincaré duality over the rationals to a stratified singular space. The present monograph introduces a method that assigns to certain classes of stratified spaces cell complexes, called intersection spaces, whose ordinary rat...

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Λεπτομέρειες βιβλιογραφικής εγγραφής
Κύριος συγγραφέας:	Banagl, Markus (Συγγραφέας)
Συγγραφή απο Οργανισμό/Αρχή:	SpringerLink (Online service)
Μορφή:	Ηλεκτρονική πηγή Ηλ. βιβλίο
Γλώσσα:	English
Έκδοση:	Berlin, Heidelberg : Springer Berlin Heidelberg, 2010.
Σειρά:	Lecture Notes in Mathematics, 1997
Θέματα:	Mathematics. Algebraic geometry. Geometry. Topology. Algebraic topology. Manifolds (Mathematics). Complex manifolds. Quantum field theory. String theory. Algebraic Geometry. Algebraic Topology. Manifolds and Cell Complexes (incl. Diff.Topology). Quantum Field Theories, String Theory.
Διαθέσιμο Online:	Full Text via HEAL-Link


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245	1	0	\|a Intersection Spaces, Spatial Homology Truncation, and String Theory \|h [electronic resource] / \|c by Markus Banagl.
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490	1		\|a Lecture Notes in Mathematics, \|x 0075-8434 ; \|v 1997
520			\|a Intersection cohomology assigns groups which satisfy a generalized form of Poincaré duality over the rationals to a stratified singular space. The present monograph introduces a method that assigns to certain classes of stratified spaces cell complexes, called intersection spaces, whose ordinary rational homology satisfies generalized Poincaré duality. The cornerstone of the method is a process of spatial homology truncation, whose functoriality properties are analyzed in detail. The material on truncation is autonomous and may be of independent interest to homotopy theorists. The cohomology of intersection spaces is not isomorphic to intersection cohomology and possesses algebraic features such as perversity-internal cup-products and cohomology operations that are not generally available for intersection cohomology. A mirror-symmetric interpretation, as well as applications to string theory concerning massless D-branes arising in type IIB theory during a Calabi-Yau conifold transition, are discussed.
650		0	\|a Mathematics.
650		0	\|a Algebraic geometry.
650		0	\|a Geometry.
650		0	\|a Topology.
650		0	\|a Algebraic topology.
650		0	\|a Manifolds (Mathematics).
650		0	\|a Complex manifolds.
650		0	\|a Quantum field theory.
650		0	\|a String theory.
650	1	4	\|a Mathematics.
650	2	4	\|a Algebraic Geometry.
650	2	4	\|a Geometry.
650	2	4	\|a Algebraic Topology.
650	2	4	\|a Topology.
650	2	4	\|a Manifolds and Cell Complexes (incl. Diff.Topology).
650	2	4	\|a Quantum Field Theories, String Theory.
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776	0	8	\|i Printed edition: \|z 9783642125881
830		0	\|a Lecture Notes in Mathematics, \|x 0075-8434 ; \|v 1997
856	4	0	\|u http://dx.doi.org/10.1007/978-3-642-12589-8 \|z Full Text via HEAL-Link
912			\|a ZDB-2-SMA
912			\|a ZDB-2-LNM
950			\|a Mathematics and Statistics (Springer-11649)

Intersection Spaces, Spatial Homology Truncation, and String Theory

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