Generalized Bott-Cattaneo-Rossi invariants in terms of Alexander polynomials

Abstract

The Bott-Cattaneo-Rossi invariant (Zk)k∈ N\0,1\ is an invariant of long knots Rn Rn+2 for odd n, which reads as a combination of integrals over configuration spaces. In this article, we compute such integrals and prove explicit formulas for (generalized) Zk in terms of Alexander polynomials, or in terms of linking numbers of some cycles of a hypersurface bounded by the knot. Our formulas, which hold for all null-homologous long knots in homology Rn+2 at least when n 1 4, conversely express the Reidemeister torsion of the knot complement in terms of (Zk)k∈ N\0,1\. Our formula extends to the even-dimensional case, where Zk will be proved to be well-defined in an upcoming article.