Ginzburg-Landau Description and Emergent Supersymmetry of the (3,8) Minimal Model

Abstract

A pair of the 2D non-unitary minimal models M(2,5) is known to be equivalent to a variant of the M(3,10) minimal model. We discuss the RG flow from this model to another non-unitary minimal model, M(3,8). This provides new evidence for its previously proposed Ginzburg-Landau description, which is a Z2 symmetric theory of two scalar fields with cubic interactions. We also point out that M(3,8) is equivalent to the (2,8) superconformal minimal model with the diagonal modular invariant. Using the 5-loop results for theories of scalar fields with cubic interactions, we exhibit the 6-ε expansions of the dimensions of various operators. Their extrapolations are in quite good agreement with the exact results in 2D. We also use them to approximate the scaling dimensions in d=3,4,5 for the theories in the M(3,8) universality class.

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