Infinitely many 4d N=2 SCFTs with a=c and beyond

Abstract

We study a set of four-dimensional N=2 superconformal field theories (SCFTs) (G) labeled by a pair of simply-laced Lie groups and G. They are constructed out of gauging a number of Dp(G) and (G, G) conformal matter SCFTs; therefore they do not have Lagrangian descriptions in general. For = D4, E6, E7, E8 and some special choices of G, the resulting theories have identical central charges (a=c) without taking any large N limit. Moreover, we find that the Schur indices for such theories can be written in terms of that of N=4 super Yang--Mills theory upon rescaling fugacities. Especially, we find that the Schur index of D4(SU(N)) theory for N odd is written in terms of MacMahon's generalized sum-of-divisor function, which is quasi-modular. For generic choices of and G, it can be regarded as a generalization of the affine quiver gauge theory obtained from D3-branes probing an ALE singularity of type . We also comment on a tantalizing connection regarding the theories labeled by in the Deligne--Cvitanovi\'c exceptional series.

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