Ginzburg-Landau description for multicritical Yang-Lee models

Abstract

We revisit and extend Fisher's argument for a Ginzburg-Landau description of multicritical Yang-Lee models in terms of a single boson Lagrangian with potential 2 (i )n. We explicitly study the cases of n=1,2 by a Truncated Hamiltonian Approach based on the free massive boson perturbed by P T symmetric deformations, providing clear evidence of the spontaneous breaking of P T symmetry. For n=1, the symmetric and the broken phases are separated by the critical point corresponding to the minimal model M(2,5), while for n=2, they are separated by a critical manifold corresponding to the minimal model M(2,5) with M(2,7) on its boundary. Our numerical analysis strongly supports our Ginzburg-Landau descriptions for multicritical Yang-Lee models.

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