Gassner and Burau representations over Zp-modules
Abstract
We study two classical representations of Artin's braid group and their modulo p reductions. We use topological methods to show that the Gassner representation τn: Bnn(Z[t1 1, …, tn 1]) is faithful for all n, and furthermore that it is faithful modulo p for all integers p>1. We then give a novel proof that the Burau representation of B3 is faithful modulo p for all p>1, and suggest applications to the modulo p Burau representation for higher braid groups.
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