Hilbert Schemes of Points in the Plane and Quasi-Lisse Vertex Algebras with N=4 Symmetry

Abstract

To each complex reflection group one can attach a canonical symplectic singularity M arXiv:math/9903070. Motivated by the 4D/2D duality arXiv:1312.5344, arXiv:1707.07679, Bonetti, Meneghelli and Rastelli arXiv:1810.03612 conjectured the existence of a supersymmetric vertex operator superalgebra W whose associated variety is isomorphic to M. We prove this conjecture when the complex reflection group is the symmetric group SN by constructing a sheaf of -adic vertex operator superalgebras on the Hilbert scheme of N points in the plane. For that case, we also show the free-field realisation of W in terms of rk() many βγ bc-systems proposed in arXiv:1810.03612, and identify the character of W as a certain quasimodular form of mixed weight and multiple q-zeta value. In physical terms, the vertex operator superalgebra WSN constructed in this article corresponds via the 4D/2D duality arXiv:1312.5344 to the four-dimensional N=4 supersymmetric Yang-Mills theory with gauge group SLN.