An Integrable Road to a Perturbative Plateau

As has been known since the 90s, there is an integrable structure underlying two-dimensional gravity theories. Recently, two-dimensional gravity theories have regained an enormous amount of attention, but now in relation with quantum chaos - superficially nothing like integrability. In this talk I will return to the roots and exploit the integrable structure underlying dilaton gravity theories to study a late time, large $e^{S_\text{BH}}$ double scaled limit of the spectral form factor. In this limit, a novel cancellation due to the integrable structure ensures that at each genus $g$ the spectral form factor grows like $T^{2g+1}$, and that the sum over genera converges, realising a perturbative approach to the late-time plateau. Along the way, I will clarify various aspects of this integrable structure. In particular, I will explain the central role played by ribbon graphs, discuss intersection theory, and if time permits, explain what the relations with dilaton gravity and matrix models are from a more modern holographic perspective.