Convergence of Nekrasov instanton sum with adjoint matter

Abstract

The Nekrasov instanton partition function of the 4d N=2* U(N) gauge theory (a mass deformation of 4d N=4 super-Yang-Mills theory), which is a generating series of equivariant integrals over instanton moduli spaces, is given by a sum over colored partitions weighted by a counting parameter q. This note proves convergence of the series in the unit disk |q|<1 for generic parameters. Specifically, the absolute convergence radius of this sum is determined, assuming that mass and Coulomb branch parameters avoid some lattice. If the ratio b2=ε1/ε2 of equivariant parameters is in C[0,+∞), the radius is 1, as expected. If b2 is non-negative, three cases arise: the radius is finite if b2 has finite exponential type (a generalization of Brjuno numbers), namely there exists C>0 such that |b2-p/q|>(-Cq) for all integers p,q≠ 0; the series diverges if b2 is super-exponentially well approximable by rationals; and if b2 is rational some terms are singular. The AGT correspondence translates these results to convergence of torus one-point conformal blocks of the Virasoro and WN algebras with non-real b, within the unit disk. For the Virasoro algebra this corresponds to a central charge in C[25,+∞).