From quantum curves to topological string partition functions.

This paper describes the reconstruction of the topological string partition function for certain local Calabi-Yau (CY) manifolds from the quantum curve, an ordinary differential equation obtained by quantising their defining equations. Quantum curves are characterised as solutions to a Riemann-Hilbert problem. The isomonodromic tau-functions associated to these Riemann-Hilbert problems admit a family of natural normalisations labelled by topological types of the Fenchel-Nielsen networks used in the Abelianisation of flat connections. To each chamber in the extended K\"ahler moduli space of the local CY under consideration there corresponds a unique topological type. The corresponding isomonodromic tau-functions admit a series expansion of generalised theta series type from which one can extract the topological string partition functions for each chamber.