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CONFIGURATION SPACE INTEGRALS AND THE COHOMOLOGY OF THE SPACE OF HOMOTOPY STRING LINKS

ROBIN KOYTCHEFF

Mathematics and Statistics, University of Victoria, PO Box 3060, STN CSC, Victoria, B. C., V8W 3R4, Canada

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BRIAN A. MUNSON

Department of Mathematics, U.S. Naval Academy, 572C Holloway Road, Chauvenet Hall, Annapolis, MD 21402-5002, USA

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, and

ISMAR VOLIĆ

Department of Mathematics, Wellesley College, 106 Central Street, Wellesley, MA 02481, USA

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https://doi.org/10.1142/S0218216513500612Cited by:11 (Source: Crossref)

Abstract

Configuration space integrals have been used in recent years for studying the cohomology of spaces of (string) knots and links in ℝⁿ for n > 3 since they provide a map from a certain differential graded algebra of diagrams to the deRham complex of differential forms on the spaces of knots and links. We refine this construction so that it now applies to the space of homotopy string links — the space of smooth maps of some number of copies of ℝ in ℝⁿ with fixed behavior outside a compact set and such that the images of the copies of ℝ are disjoint — even for n = 3. We further study the case n = 3 in degree zero and show that our integrals represent a universal finite type invariant of the space of classical homotopy string links. As a consequence, we deduce that Milnor invariants of string links can be written in terms of configuration space integrals.

Keywords:

AMSC: Primary: 57Q45, Secondary: 57M27, Secondary: 81Q30, Secondary: 57R40

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