Ginzburg-Landau description of a class of non-unitary minimal models

Abstract

It has been proposed that the Ginzburg-Landau description of the non-unitary conformal minimal model M(3,8) is provided by the Euclidean theory of two real scalar fields with third-order interactions that have imaginary coefficients. The same lagrangian describes the non-unitary model M(3,10), which is a product of two Yang-Lee theories M(2,5), and the Renormalization Group flow from it to M(3,8). This proposal has recently passed an important consistency check, due to Y. Nakayama and T. Tanaka, based on the anomaly matching for non-invertible topological lines. In this paper, we elaborate the earlier proposal and argue that the two-field theory describes the D series modular invariants of both M(3,8) and M(3,10). We further propose the Ginzburg-Landau descriptions of the entire class of D series minimal models M(q, 3q-1) and M(q, 3q+1), with odd integer q. They involve PT symmetric theories of two scalar fields with interactions of order q multiplied by imaginary coupling constants.

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