1. Diagram Complexes, Formality, and Configuration Space Integrals for Spaces of Braids.
- Author
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Komendarczyk, Rafal, Koytcheff, Robin, and Volić, Ismar
- Subjects
CONFIGURATION space ,ITERATED integrals ,DIFFERENTIAL algebra ,BRAID ,BRAID group (Knot theory) ,CHARTS, diagrams, etc. - Abstract
We use rational formality of configuration spaces and the bar construction to study the cohomology of the space of braids in dimension four or greater. We provide a diagram complex for braids and a quasi-isomorphism to the de Rham cochains on the space of braids. The quasi-isomorphism is given by a configuration space integral followed by Chen's iterated integrals. This extends results of Kohno and of Cohen and Gitler on the cohomology of the space of braids to a commutative differential graded algebra suitable for integration. We show that this integration is compatible with Bott–Taubes configuration space integrals for long links via a map between two diagram complexes. As a corollary, we get a surjection in cohomology from the space of long links to the space of braids. We also discuss to what extent our results apply to the case of classical braids. [ABSTRACT FROM AUTHOR]
- Published
- 2020
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