A novel connection between integral binary quadratic forms and knot polynomials

Abstract

We establish a novel connection between algebraic number theory and knot theory. We show that the number of equivalence classes of integral binary quadratic forms of discriminant t2 - 4 (for t≠ 2) is equal to the number of isotopy classes of links in S3 with prescribed values (depending on t) of three classical link invariants. The equality arises from a natural algebraic correspondence between integral binary quadratic forms (of discriminant t2 - 4 for t≠ 2) and isotopy classes of links of braid index at most three. In particular, the class numbers of certain quadratic number fields precisely measure the failure of the Alexander/Jones polynomial to distinguish non-isotopic links of braid index at most three.