Super Topological Recursion and Gaiotto Vectors For Superconformal Blocks

Abstract

We investigate a relation between the super topological recursion and Gaiotto vectors for N=1 superconformal blocks. Concretely, we introduce the notion of the untwisted and μ-twisted super topological recursion, and construct a dual algebraic description in terms of super Airy structures. We then show that the partition function of an appropriate super Airy structure coincides with the Gaiotto vector for N=1 superconformal blocks in the Neveu-Schwarz or Ramond sector. Equivalently, the Gaiotto vector can be computed by the untwisted or μ-twisted super topological recursion. This implies that the framework of the super topological recursion -- equivalently super Airy structures -- can be applied to compute the Nekrasov partition function of N=2 pure U(2) supersymmetric gauge theory on C2/Z2 via a conjectural extension of the Alday-Gaiotto-Tachikawa correspondence.