Research on the use of information geometry (IG) in modern physics has witnessed significant advances recently. In this review article, we report on the utilization of IG methods to define measures of complexity in both classical and, whenever available, quantum physical settings. A paradigmatic example of a dramatic change in complexity is given by phase transitions (PTs). Hence, we review both global and local aspects of PTs described in terms of the scalar curvature of the parameter manifold and the components of the metric tensor, respectively. We also report on the behavior of geodesic paths on the parameter manifold used to gain insight into the dynamics of PTs. Going further, we survey measures of complexity arising in the geometric ...
In a previous paper (C. Cafaro et al., 2012), we compared an uncorrelated 3 D Gaussian statistical m...
Information geometry provides the mathematical sciences with a new framework of analysis. It has eme...
Interdependencies of stochastically interacting units are usually quantified by the Kullback-Leibler...
Research on the use of information geometry (IG) in modern physics has witnessed significant advance...
Motivated by the presence of deep connections among dynamical equations, experimental data, physical...
A central issue in the science of complex systems is the quantitative characterization of complexity...
Abstract: A novel information-geometrodynamical approach to chaotic dynamics (IGAC) on curved statis...
The book provides a comprehensive introduction and a novel mathematical foundation of the field of i...
We evaluate the information geometric complexity of entropic motion on low-dimensional Gaussian stat...
International audienceWe consider a Gaussian statistical model whose parameter space is given by the...
We consider a Gaussian statistical model whose parameter space is given by the variances of random v...
We study the information geometry and the entropic dynamics of a three- dimensional Gaussian stati...
The main motivation for this book lies in the breadth of applications in which a statistical model i...
In this work, using information geometric (IG) techniques, we investigate the effects of micro-corre...
This volume will be useful to practising scientists and students working in the application of stati...
In a previous paper (C. Cafaro et al., 2012), we compared an uncorrelated 3 D Gaussian statistical m...
Information geometry provides the mathematical sciences with a new framework of analysis. It has eme...
Interdependencies of stochastically interacting units are usually quantified by the Kullback-Leibler...
Research on the use of information geometry (IG) in modern physics has witnessed significant advance...
Motivated by the presence of deep connections among dynamical equations, experimental data, physical...
A central issue in the science of complex systems is the quantitative characterization of complexity...
Abstract: A novel information-geometrodynamical approach to chaotic dynamics (IGAC) on curved statis...
The book provides a comprehensive introduction and a novel mathematical foundation of the field of i...
We evaluate the information geometric complexity of entropic motion on low-dimensional Gaussian stat...
International audienceWe consider a Gaussian statistical model whose parameter space is given by the...
We consider a Gaussian statistical model whose parameter space is given by the variances of random v...
We study the information geometry and the entropic dynamics of a three- dimensional Gaussian stati...
The main motivation for this book lies in the breadth of applications in which a statistical model i...
In this work, using information geometric (IG) techniques, we investigate the effects of micro-corre...
This volume will be useful to practising scientists and students working in the application of stati...
In a previous paper (C. Cafaro et al., 2012), we compared an uncorrelated 3 D Gaussian statistical m...
Information geometry provides the mathematical sciences with a new framework of analysis. It has eme...
Interdependencies of stochastically interacting units are usually quantified by the Kullback-Leibler...