Geometric structures and PSL2(C) representations of knot groups from knot diagrams

Abstract

We describe a new method of producing equations for the canonical component of representation variety of a knot group into PSL2(C). Unlike known methods, this one does not involve any polyhedral decomposition or triangulation of the knot complement, and uses only a knot diagram satisfying a few mild restrictions. This gives a simple algorithm that can often be performed by hand, and in many cases, for an infinite family of knots at once. The algorithm yields an explicit description for the hyperbolic structures (complete or incomplete) that correspond to geometric representations of a hyperbolic knot. As an illustration, we give the formulas for the equations for the variety of closed alternating braids (σ1(σ2)-1)n that depend only on n.