Seiberg-Witten Theory and Monstrous Moonshine

Abstract

We study the relation between the instanton expansion of the Seiberg-Witten prepotential for D=4, N=2 SU(2) SUSY gauge theory for Nf=0 and 1 and the monstrous moonshine. By utilizing a newly developed simple method to obtain the SW prepotential, it is shown that the coefficients of the expansion of q=e2π τ in terms of A2=216 a2 (Nf=0) or 216 2a2 (Nf=1) are all integer coefficient polynomials of the moonshine coefficients of the modular j-function. A relationship between the AGT c = 25 Liouville CFT and the c = 24 vertex operator algebra CFT of the moonshine module is also suggested.