Invariants of the Colored Braid Groupoid
Abstract
In this paper, a braid is regarded as a dynamical system of points in the plane. The states of this dynamical system are given by Delaunay triangulations. This construction makes it possible to define an abstract groupoid abcG4n+3, which gives a representation of the colored braid groupoid ColB(n). We define homomorphisms fn+3:abcG4n+3 →GL2n+1(Q) and f'n+3:abcG4n+3 →GL2n+1(C), and describe an algorithm for computing the resulting invariants.
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