Uq(sl(2))-quantum invariants unified via intersections of embedded Lagrangians

Abstract

In this paper we prove a unified model for Uq(sl(2)) quantum invariants through intersections of embedded Lagrangians in configuration spaces. More specifically, we construct a state sum of Lagrangian intersections in the configuration space in the punctured disc, which is a polynomial in three variables. It recovers the coloured Jones polynomial and the coloured Alexander polynomial through specialisations of coefficients. This formula works for oriented links coloured with the same representation of the quantum group and can be evaluated at roots of unity. As a corollary, the Jones and Alexander polynomials come both as specialisations of an intersection pairing between embedded Lagrangians in configuration spaces, which is suitable for computations. In particular, we obtain the first intersection model for the Jones polynomial from intersections between submanifolds which are given by arcs and circles in the punctured disc.