Based on the saddle point approximation in G-L theory of the critical phenomena we construct two-dimensional Poincare maps which describe the symmetry breaking (SB) and the tricritical crossover phenomenon in Physics. The phase space diagrams of these maps are in agreement with the theoretical predictions. A correction in these maps close to the critical point for small values of the order parameter is attempted. Finally we demonstrate that numerical experiments verify the correctness of these maps.
k-core (bootstrap) percolation on complex networks: Critical phenomena and nonlocal effects
Level density of a Bose gas: beyond the saddle point approximation
Critical Phenomena and Diffusion in Complex Systems
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