Quantum equations for knots

Abstract

This paper contains linear systems of equations which can distinguish knots without knot invariants. Let Mn be the topological moduli space of all n-component string links and such that a fixed projection into the plane is an immersion. If a string link is the product of some string link diagram T and the parallel n-cable of a framed long knot diagram D, then there is a canonical arc push in Mn, defined by pushing T through the n-cable of D. In this paper we apply the combinatorial 1-cocycles from the HOMFLYPT and Kauffman polynomials in Mn with values in the corresponding skein modules to this canonical arc in Mn. Some of the 1-cocycles lead to linear systems of equations in the skein modules, for each couple of diagrams D and D'. If the system has no solution in the Laurent polynomials then D and D' represent different knots. We give first examples where we distinguish knots without any knot invariants. In particular, we distinguish the knot 942 from its mirror image with equations coming from the HOMFLYPT polynomial. Notice that the knot 942 and its mirror image share the same HOMFLYPT polynomial. On the other hand, each solution of the system gives rather fine information about any regular isotopy which connects D with D'.