Phase transitions in complex systems

Abstract

Even though this book is focused on learning, we thought it might be useful to widen its scope to include a brief overview of the emergence of ensemble phenomena (typically phase transitions) in complex networks. Beside their intrinsic interest as systems amenable to be studied via statistical physics methods, complex networks may well impact relational learning because both examples and formulas can be represented as networks of tuples, as we have seen in previous chapters. The same can be said for the constraint graph in CSP and the factor graph in SAT. In ensemble phenomena, emerging from a network of “microscopic” interactions, it is likely that the underlying graph structure has an impact on the observed macroscopic properties; thus cross-fertilization might be of mutual benefit. Complex networks are complex systems , meaning systems composed of a large number of mutually interacting components. Even though in such systems it is impossible to describe the behavior of the individual components, the patterns of interactions among them allows macroscopic properties to emerge which would be missed by a reductionist approach. Thus, the science of complexity aims to discover the nature of these emerging behaviors and to link them to the system's microscopic level description. Complex systems From its very definition, it is clear that the science of complexity naturally derives from statistical physics. Thus, the emergence of phase transitions and the behavior of complex systems have strong links.