Taxonomy of coupled minimal models from finite groups

Abstract

Fixed points of N coupled Virasoro minimal models have recently been argued to provide large classes of compact unitary CFTs with c>1 and only Virasoro chiral symmetry. In this paper, we vastly increase the set of such potential irrational fixed points by considering couplings that break the maximal G=SN symmetry into various subgroups H⊂ G. We rigorously classify all the fixed points with N=4,5 and do an extensive search for solutions of the beta function equations with N≥6. In particular, we find non-trivial fixed points with H=ZN-1 Z2, \, SM× SN-M and rigorously prove that real fixed points with H=(SN/2× SN/2) Z2 exist for all even N≥6. We also identify fixed points with finite Lie-type symmetry H=PSL2(N)⊂ SN where N=7,11,13 and uncover a non-unitary fixed point with H=M22⊂ S22, a sporadic Mathieu group. Along the way, we encounter conformal manifolds at leading order in perturbation theory which we resolve at sub-leading order.

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