Burau representation of B4 and quantization of the rational projective plane
Abstract
The braid group B4 naturally acts on the rational projective plane P2(Q), this action corresponds to the classical integral reduced Burau representation of B4. The first result of this paper is a classification of the orbits of this action. The Burau representation then defines an action of B4 on P2(Z(q)), where q is a formal parameter and Z(q) is the field of rational functions in q with integer coefficients. We study orbits of the B4-action on P2(Z(q)), and show existence of embeddings of the q-deformed projective line P1(Z(q)) that precisely correspond to the notion of q-rationals due to Morier-Genoud and Ovsienko.
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