Link invariants from L2-Burau maps of braids

Abstract

A previous work of A. Conway and the author introduced L2-Burau maps of braids, which are generalizations of the Burau representation whose coefficients live in a more general group ring than the one of Laurent polynomials. This same work established that the L2-Burau map of a braid at the group of the braid closure yields the L2-Alexander torsion of the braid closure in question, as a variant of the well-known Burau-Alexander formula. In the present paper, we generalize the previous result to L2-Burau maps defined over all quotients of the group of the braid closure. The link invariants we obtain are twisted L2-Alexander torsions of the braid closure, and recover more topological information, such as the hyperbolic volumes of Dehn fillings. The proof needs us to first generalize several fundamental formulas for L2-torsions, which have their own independent interest. We then discuss how likely we are to generalize this process to yet more groups. In particular, a detailed study of the influence of Markov moves on L2-Burau maps and two explicit counter-examples to Markov invariance suggest that twisted L2-Alexander torsions of links are the only link invariants we can hope to build from L2-Burau maps with the present approach.

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