Parafermionizing the Monster

Abstract

We study the parafermionization of the Monster CFT with respect to its ZpA subgroups, with p an odd prime. Under certain assumptions, we show that the parafermionization is equal to a non-invertible gauging of P(p) × P(p), where P(p) is the theory of Zp-parafermions and P(p) is an appropriate dual theory, with global symmetry characterized by the centralizer of ZpA. By tracking the symmetries of P(p) × P(p) through the non-invertible gauging, we argue that the diagonal Monster CFT has Rep(so(3)p) Rep(so(3)p)op symmetry, and hence that the holomorphic Monster theory has symmetry Rep(so(3)p). We then compute the defect McKay-Thompson series associated to these symmetries, and prove that their invariance subgroups are 1(p+2).