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On symmetric commutator subgroups, braids, links and homotopy groups

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arxiv 1002.0429 v1 pith:HO3W3OHC submitted 2010-02-02 math.AT math.GRmath.GT

On symmetric commutator subgroups, braids, links and homotopy groups

classification math.AT math.GRmath.GT
keywords groupssubgroupshomotopycommutatorlinkssomesymmetricapplications
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In this paper, we investigate some applications of commutator subgroups to homotopy groups and geometric groups. In particular, we show that the intersection subgroups of some canonical subgroups in certain link groups modulo their symmetric commutator subgroups are isomorphic to the (higher) homotopy groups. This gives a connection between links and homotopy groups. Similar results hold for braid and surface groups.

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