A strong characterization of the entries of the Burau matrices of 4-braids: The Burau representation of the braid group B4 is faithful almost everywhere

Abstract

We establish strong constraints on the kernel of the (reduced) Burau representation β4:B4 GL3(Z[q 1]) of the braid group B4. We develop a theory to explicitly determine the entries of the Burau matrices of braids in B4, and this is an important step toward demonstrating that β4 is faithful (a longstanding question posed in the 1930s). The theory is based on a novel combinatorial interpretation of β4(g), in terms of the Garside normal form of g∈ B4 and a new product decomposition of positive braids. We develop cancellation results for words in matrix groups to show that if σ is a generic positive braid in B4 and if t≠ 2 is a prime number, then the leading coefficients in at least one row of the matrix β4(σ) are non-zero modulo t. We exploit these cancellation results to deduce that the Burau representation of B4 is faithful almost everywhere.