The Low Level Modular Invariant Partition Functions of Rank-Two Algebras

Abstract

Using the self-dual lattice method, we make a systematic search for modular invariant partition functions of the affine algebras g\*(1) of g=A2, A1+A1, G2, and C2. Unlike previous computer searches, this method is necessarily complete. We succeed in finding all physical invariants for A2 at levels 32, for G2 at levels 31, for C2 at levels 26, and for A1+A1 at levels k1=k2 21. This work thus completes a recent A2 classification proof, where the levels k=3,5,6,9,12,15,21 had been left out. We also compute the dimension of the (Weyl-folded) commutant for these algebras and levels.

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