Racah matrices and hidden integrability in evolution of knots

Abstract

We construct a general procedure to extract the exclusive Racah matrices S and S from the inclusive 3-strand mixing matrices by the evolution method and apply it to the first simple representations R =[1], [2], [3] and [2,2]. The matrices S and S relate respectively the maps (R R) R R with R (R R) R and (R R) R R with R ( R R) R. They are building blocks for the colored HOMFLY polynomials of arbitrary arborescent (double fat) knots. Remarkably, the calculation realizes an unexpected integrability property underlying the evolution matrices.