The Fundamental Group of SO(n) Via Quotients of Braid Groups
Abstract
We describe an algebraic proof of the well-known topological fact that π1(SO(n)) Z/2Z. The fundamental group of SO(n) appears in our approach as the center of a certain finite group defined by generators and relations. The latter is a factor group of the braid group Bn, obtained by imposing one additional relation and turns out to be a nontrivial central extension by Z/2Z of the corresponding group of rotational symmetries of the hyperoctahedron in dimension n.
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