Necessary and sufficient conditions for Z2-symmetry-breaking phase transitions

Abstract

In a recent paper a toy model (hypercubic model) undergoing a first-order Z2-symmetry-breaking phase transition (Z2-SBPT) was introduced. The hypercubic model was inspired by the topological hypothesis, according to which a phase transition may be entailed by suitable topological changes of the equipotential surfaces (v's) of configuration space. In this paper we show that at the origin of a Z2-SBPT there is a geometric property of the v's, i.e., dumbbell-shaped v's suitably defined, which includes a topological change as a limiting case. This property is necessary and sufficient condition to entail a Z2-SBPT. This new approach has been applied to three models: a modified version introduced here of the hypercubic model, a model introduced in a recent paper with a continuous Z2-SBPT belonging to several universality classes, and finally to a physical models, i.e., the mean-field φ4 model and a simplified version of it.