In this paper we present the study of the topology of the equipotential hypersurfaces of configuration space of the mean-field ?4 model with a Z2 symmetry. Our purpose is discovering, if any, the relation between the second-order Z2-symmetry-breaking phase transition and the geometric entities mentioned above. The mean-field interaction allows us to solve analytically either the thermodynamic in the canonical ensemble or the topology by means of Morse theory. We have analyzed the results in the light of two theorems on sufficiency conditions for symmetry-breaking phase transitions recently proven. This study is part of a research line based on the general framework of geometric-topological approach to Hamiltonian chaos and critical phenomena.
Topology of configuration space of the mean-field ?4 model by Morse theory
F Baroni
2019
Abstract
In this paper we present the study of the topology of the equipotential hypersurfaces of configuration space of the mean-field ?4 model with a Z2 symmetry. Our purpose is discovering, if any, the relation between the second-order Z2-symmetry-breaking phase transition and the geometric entities mentioned above. The mean-field interaction allows us to solve analytically either the thermodynamic in the canonical ensemble or the topology by means of Morse theory. We have analyzed the results in the light of two theorems on sufficiency conditions for symmetry-breaking phase transitions recently proven. This study is part of a research line based on the general framework of geometric-topological approach to Hamiltonian chaos and critical phenomena.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
