On the Burau Representation of B4 modulo p
Abstract
The problem of faithfulness of the (reduced) Burau representation for n =4 is known to be equivalent to the problem of whether certain two matrices A and B generate a free group of rank two. It is known that A3 and B3 generate a free group of rank two 9, 10, 4. We prove that they also generate a free group when considered as matrices over the Zp[t,t-1] for any integer p > 1.
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