BPS relations from spectral problems and blowup equations

Abstract

Recently an exact duality between topological string and the spectral theory of operators constructed from mirror curves to toric Calabi-Yau threefolds has been proposed. At the same time an exact quantization condition for the cluster integrable systems associated to these geometries has been conjectured. The consistency between the two approaches leads to an infinite set of constraints for the refined BPS invariants of the toric Calabi-Yau threefolds. We prove these constraints for the YN,m geometries using the K-theoretic blowup equations for SU(N) SYM with generic Chern-Simons invariant m.