Instantons to the people: the power of one-form symmetries

Abstract

We show that the non-perturbative dynamics of N=2 super Yang-Mills theories in a self-dual -background and with an arbitrary simple gauge group is fully determined by studying renormalization group equations of vevs of surface operators generating one-form symmetries. The corresponding system of equations is a non-autonomous Toda chain, the time being the RG scale. We obtain new recurrence relations which provide a systematic algorithm computing multi-instanton corrections from the tree-level one-loop prepotential as the asymptotic boundary condition of the RGE. We exemplify by computing the E6 and G2 cases up to two-instantons.