Recursion relations and BPS-expansions in the HOMFLY-PT skein of the solid torus

Abstract

Inspired by the skein valued open Gromov-Witten theory of Ekholm and Shende and the Gopakumar-Vafa formula, we associate to each pair of non-negative integers (g,l) a formal power series with values in the HOMFLY-PT skein of a disjoint union of l solid tori. The formal power series can be thought of as open BPS-states of genus g with l boundary components and reduces to the contribution of a single BPS state of genus g for l=0. Using skein theoretic methods we show that the formal power series satisfy gluing identities and multi-cover skein relations corresponding to an elliptic boundary node of the underlying curves. For (g,l)=(0,1) we prove a crossing formula which is the multi-cover skein relation corresponding to a hyperbolic boundary node, also known as the pentagon identity.