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arxiv: math/0612591 · v2 · submitted 2006-12-20 · 🧮 math.AT · math.GT

Associahedron, cyclohedron, and permutohedron as compactifications of configuration spaces

classification 🧮 math.AT math.GT
keywords cyclohedronassociahedronpermutohedroncompactificationconfigurationpointprojectionspaces
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As in the case of the associahedron and cyclohedron, the permutohedron can also be defined as an appropriate compactification of a configuration space of points on an interval or on a circle. The construction of the compactification endows the permutohedron with a projection to the cyclohedron, and the cyclohedron with a projection to the associahedron. We show that the preimages of any point via these projections might not be homeomorphic to (a cell decomposition of) a disk, but are still contractible. We briefly explain an application of this result to the study of knot spaces from the point of view of the Goodwillie-Weiss manifold calculus.

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