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Morse homology with differential gra...

Barraud, Jean-François.

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Morse homology with differential graded coefficients

Record Type:	Electronic resources : Monograph/item
Title/Author:	Morse homology with differential graded coefficients/ by Jean-François Barraud ... [et al.].
other author:	Barraud, Jean-François.
Published:	Cham :Springer Nature Switzerland : : 2025.,
Description:	xi, 229 p. :ill. (chiefly color), digital ;24 cm.
[NT 15003449]:	Introduction and Main Results -- Morse vs DG Morse Homology Toolset -- Comparison of the Barraud-Cornea Cocycle and the Brown Cocycle -- Algebraic Properties of Twisted Complexes -- Morse Homology with DG-Coefficients: Construction -- Morse Homology with DG-Coefficients: Invariance -- Fibrations -- Functoriality: General Properties -- Functoriality: First Definition -- Functoriality: Second Definition. Cohomology and Poincaré Duality -- Shriek Maps and Poincaré Duality for Non-Orientable Manifolds -- Beyond the Case of Manifolds of Finite Dimension -- Appendix: Comparison of Geometry and Analytic Orientations in Morse Theory.
Contained By:	Springer Nature eBook
Subject:	Morse theory. -
Online resource:	https://doi.org/10.1007/978-3-031-88020-9
ISBN:	9783031880209

Morse homology with differential graded coefficients
Morse homology with differential graded coefficients[electronic resource] /by Jean-François Barraud ... [et al.]. - Cham :Springer Nature Switzerland :2025. - xi, 229 p. :ill. (chiefly color), digital ;24 cm. - Progress in mathematics,v. 3602296-505X ;. - Progress in mathematics ;v. 360..

Introduction and Main Results -- Morse vs DG Morse Homology Toolset -- Comparison of the Barraud-Cornea Cocycle and the Brown Cocycle -- Algebraic Properties of Twisted Complexes -- Morse Homology with DG-Coefficients: Construction -- Morse Homology with DG-Coefficients: Invariance -- Fibrations -- Functoriality: General Properties -- Functoriality: First Definition -- Functoriality: Second Definition. Cohomology and Poincaré Duality -- Shriek Maps and Poincaré Duality for Non-Orientable Manifolds -- Beyond the Case of Manifolds of Finite Dimension -- Appendix: Comparison of Geometry and Analytic Orientations in Morse Theory.

The key geometric objects underlying Morse homology are the moduli spaces of connecting gradient trajectories between critical points of a Morse function. The basic question in this context is the following: How much of the topology of the underlying manifold is visible using moduli spaces of connecting trajectories? The answer provided by "classical" Morse homology as developed over the last 35 years is that the moduli spaces of isolated connecting gradient trajectories recover the chain homotopy type of the singular chain complex. The purpose of this monograph is to extend this further: the fundamental classes of the compactified moduli spaces of connecting gradient trajectories allow the construction of a twisting cocycle akin to Brown's universal twisting cocycle. As a consequence, the authors define (and compute) Morse homology with coefficients in any differential graded (DG) local system. As particular cases of their construction, they retrieve the singular homology of the total space of Hurewicz fibrations and the usual (Morse) homology with local coefficients. A full theory of Morse homology with DG coefficients is developed, featuring continuation maps, invariance, functoriality, and duality. Beyond applications to topology, this is intended to serve as a blueprint for analogous constructions in Floer theory. The new material and methods presented in the text will be of interest to a broad range of researchers in topology and symplectic topology. At the same time, the authors are particularly careful to give gentle introductions to the main topics and have structured the text so that it can be easily read at various degrees of detail. As such, the book should already be accessible and of interest to graduate students with a general interest in algebra and topology.

ISBN: 9783031880209

Standard No.: 10.1007/978-3-031-88020-9doiSubjects--Topical Terms:

706169
Morse theory.

LC Class. No.: QA331

Dewey Class. No.: 514.23

Morse homology with differential graded coefficients
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245 0 0 $a Morse homology with differential graded coefficients $h [electronic resource] / $c by Jean-François Barraud ... [et al.].
260 $a Cham : $b Springer Nature Switzerland : $b Imprint: Birkhäuser, $c 2025.
300 $a xi, 229 p. : $b ill. (chiefly color), digital ; $c 24 cm.
490 1 $a Progress in mathematics, $x 2296-505X ; $v v. 360
505 0 $a Introduction and Main Results -- Morse vs DG Morse Homology Toolset -- Comparison of the Barraud-Cornea Cocycle and the Brown Cocycle -- Algebraic Properties of Twisted Complexes -- Morse Homology with DG-Coefficients: Construction -- Morse Homology with DG-Coefficients: Invariance -- Fibrations -- Functoriality: General Properties -- Functoriality: First Definition -- Functoriality: Second Definition. Cohomology and Poincaré Duality -- Shriek Maps and Poincaré Duality for Non-Orientable Manifolds -- Beyond the Case of Manifolds of Finite Dimension -- Appendix: Comparison of Geometry and Analytic Orientations in Morse Theory.
520 $a The key geometric objects underlying Morse homology are the moduli spaces of connecting gradient trajectories between critical points of a Morse function. The basic question in this context is the following: How much of the topology of the underlying manifold is visible using moduli spaces of connecting trajectories? The answer provided by "classical" Morse homology as developed over the last 35 years is that the moduli spaces of isolated connecting gradient trajectories recover the chain homotopy type of the singular chain complex. The purpose of this monograph is to extend this further: the fundamental classes of the compactified moduli spaces of connecting gradient trajectories allow the construction of a twisting cocycle akin to Brown's universal twisting cocycle. As a consequence, the authors define (and compute) Morse homology with coefficients in any differential graded (DG) local system. As particular cases of their construction, they retrieve the singular homology of the total space of Hurewicz fibrations and the usual (Morse) homology with local coefficients. A full theory of Morse homology with DG coefficients is developed, featuring continuation maps, invariance, functoriality, and duality. Beyond applications to topology, this is intended to serve as a blueprint for analogous constructions in Floer theory. The new material and methods presented in the text will be of interest to a broad range of researchers in topology and symplectic topology. At the same time, the authors are particularly careful to give gentle introductions to the main topics and have structured the text so that it can be easily read at various degrees of detail. As such, the book should already be accessible and of interest to graduate students with a general interest in algebra and topology.
650 0 $a Morse theory. $3 706169
650 0 $a Homology theory. $3 555733
650 1 4 $a Manifolds and Cell Complexes. $3 3538507
650 2 4 $a Algebraic Topology. $3 891269
700 1 $a Barraud, Jean-François. $3 3784338
710 2 $a SpringerLink (Online service) $3 836513
773 0 $t Springer Nature eBook
830 0 $a Progress in mathematics ; $v v. 360. $3 3784339
856 4 0 $u https://doi.org/10.1007/978-3-031-88020-9
950 $a Mathematics and Statistics (SpringerNature-11649)