![Homotopy theory / Knot theory / Geometric topology / Algebraic topology / Topology / Braid theory / Configuration space / Braid group / Mapping class group / Spectrum / Manifold / Fundamental group Homotopy theory / Knot theory / Geometric topology / Algebraic topology / Topology / Braid theory / Configuration space / Braid group / Mapping class group / Spectrum / Manifold / Fundamental group](https://www.pdfsearch.io/img/5a725dbbe14a7089465d1c4ff6b19e0f.jpg) Date: 2011-02-14 06:36:05Homotopy theory Knot theory Geometric topology Algebraic topology Topology Braid theory Configuration space Braid group Mapping class group Spectrum Manifold Fundamental group | | Configuration Spaces The n-th ordered configuration space C˜ n (M ) of a space M is the space of all n-tupels (ζ1 , . . . , ζn ) of distinct points in M ; and the quotient C n (M ) = C˜ n (M )/Sn by the free action oAdd to Reading ListSource URL: www.math.uni-bonn.deDownload Document from Source Website File Size: 54,92 KBShare Document on Facebook
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