Floer Homology via Twisted Loop Spaces

Floer Homology via Twisted Loop Spaces

This thesis proposes an improved notion of coefficient system for Lagrangian Floer Homology which allows one to produce nontrivial invariants away from characteristic 2, even when coherent orientations of moduli spaces of Floer trajectories do not exist. This explains a suggestion of Witten. The inv...

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Bibliographic Details
Main Author: Rezchikov, Semen
Language:English
Published: 2021
Subjects:
Mathematics
Floer homology
Homology theory
Loop spaces
Online Access:https://doi.org/10.7916/d8-b3fq-c310
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spelling ndltd-columbia.edu-oai-academiccommons.columbia.edu-10.7916-d8-b3fq-c3102021-06-17T05:03:10ZFloer Homology via Twisted Loop SpacesRezchikov, Semen2021ThesesMathematicsFloer homologyHomology theoryLoop spacesThis thesis proposes an improved notion of coefficient system for Lagrangian Floer Homology which allows one to produce nontrivial invariants away from characteristic 2, even when coherent orientations of moduli spaces of Floer trajectories do not exist. This explains a suggestion of Witten. The invariant can be computed in examples, and the method explained below should be extensible to other Floer-theoretic invariants. The basic idea is that the moduli spaces of curves admit fundamental classes in homology with coefficients in the orientation lines of the moduli spaces, and the usual construction of coherent orientations actually shows that these fundamental classes naturally map to spaces of paths twisted with appropriate coefficient systems. These twisted path spaces admit enough algebraic structure to make sense of Floer homology with coefficients in these path spaces.Englishhttps://doi.org/10.7916/d8-b3fq-c310
collection NDLTD
language English
sources NDLTD
topic Mathematics
Floer homology
Homology theory
Loop spaces
spellingShingle Mathematics
Floer homology
Homology theory
Loop spaces
Rezchikov, Semen
Floer Homology via Twisted Loop Spaces
description This thesis proposes an improved notion of coefficient system for Lagrangian Floer Homology which allows one to produce nontrivial invariants away from characteristic 2, even when coherent orientations of moduli spaces of Floer trajectories do not exist. This explains a suggestion of Witten. The invariant can be computed in examples, and the method explained below should be extensible to other Floer-theoretic invariants. The basic idea is that the moduli spaces of curves admit fundamental classes in homology with coefficients in the orientation lines of the moduli spaces, and the usual construction of coherent orientations actually shows that these fundamental classes naturally map to spaces of paths twisted with appropriate coefficient systems. These twisted path spaces admit enough algebraic structure to make sense of Floer homology with coefficients in these path spaces.
author Rezchikov, Semen
author_facet Rezchikov, Semen
author_sort Rezchikov, Semen
title Floer Homology via Twisted Loop Spaces
title_short Floer Homology via Twisted Loop Spaces
title_full Floer Homology via Twisted Loop Spaces
title_fullStr Floer Homology via Twisted Loop Spaces
title_full_unstemmed Floer Homology via Twisted Loop Spaces
title_sort floer homology via twisted loop spaces
publishDate 2021
url https://doi.org/10.7916/d8-b3fq-c310
work_keys_str_mv AT rezchikovsemen floerhomologyviatwistedloopspaces
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