Random walks and the symplectic representation of the braid group

Abstract

We consider the symplectic representation n of a braid group B(n) in Sp(2l,Z), for l=[n-12]. If P is a polynomial on the 4l2 coefficients of the matrices in Sp(2l,Z), we show that the set \β∈ B(n): P(n(β))=0\ is transient for non degenerate random walks on B(n). We derive that the n-braids β which close into a loop β with 0<|det(β)|≤ C for some constant C form a transient set. And given a prime number p, we show that the probability for a given braid to close in a p-colorable loop is greater than 1p. We also derive that for a random 3-braid, the quasipositive links (βσiβ-1σj)p have zero signature for every integer p and 1≤ i,j≤ 2. \\ As an example of such braids, we investigate the signature of the Lissajous toric knots 3-braids.