Towards a Quintic Ginzburg-Landau Description of the (2,7) Minimal Model
Abstract
We discuss dimensional continuation of the massless scalar field theory with the iφ5 interaction term. It preserves the so-called PT symmetry, which acts by φ→ -φ accompanied by i→ -i. Below its upper critical dimension 10/3, this theory has interacting infrared fixed points. We argue that the fixed point in d=2 describes the non-unitary minimal conformal model M(2,7). We identify the operators φ and φ2 with the Virasoro primaries φ1,2 and φ1,3, respectively, and iφ3 with a quasi-primary operator, which is a Virasoro descendant of φ1,3. Our identifications appear to be consistent with the operator product expansions and with considerations based on integrability. Using constrained Pad\'e extrapolations, we provide estimates of the critical exponents in d=3. We also comment on possible lattice descriptions of M(2,7) and discuss RG flows to and from this CFT. Finally, we conjecture that the minimal models M(2, 2n+1) are described by the massless scalar field theories with the iφ2n-1 interaction terms.
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