To the cusp and back: resurgent analysis for modular graph functions

Modular graph functions arise in the calculation of the low-energy expansion of closed-string scattering amplitudes. For toroidal world-sheets, they are SL(2, Z)-invariant functions of the torus complex structure that have to be integrated over the moduli space of inequivalent tori. We use methods from resurgent analysis to construct the non-perturbative corrections arising for two-loop modular graph functions when the argument of the function approaches the cusp on this moduli space. SL(2, Z)-invariance will in turn strongly constrain the behaviour of the non-perturbative sector when expanded at the origin of the moduli space.

Automated summary

Modular graph functions are important in calculating the low-energy expansion of closed-string scattering amplitudes. In this study, we investigate their properties on toroidal world-sheets and use methods from resurgent analysis to construct non-perturbative corrections for two-loop modular graph functions approaching the cusp on the moduli space. The SL(2, Z)-invariance strongly constrains the behavior of the non-perturbative sector when expanded at the origin of the moduli space.