A dequantized metaplectic knot invariant

Abstract

Let K⊂ S3 be a knot, X:= S3 K its complement, and T the circle group identified with R/Z. To any oriented long knot diagram of K, we associate a quadratic polynomial in variables bijectively associated with the bridges of the diagram such that, when the variables projected to T satisfy the linear equations characterizing the first homology group H1(X2) of the double cyclic covering of X, the polynomial projects down to a well defined T-valued function on T1(X2,T) (the dual of the torsion part T1 of H1). This function is sensitive to knot chirality, for example, it seems to confirm chirality of the knot 1071. It also distinguishes the knots 74 and 92 known to have identical Alexander polynomials and the knots 92 and K11n13 known to have identical Jones polynomials but does not distinguish 74 and K11n13.