Dynamics of the Fisher Information Metric
arXiv:cond-mat/0410452 · doi:10.1103/PhysRevE.71.056109
Abstract
We present a method to generate probability distributions that correspond to metrics obeying partial differential equations generated by extremizing a functional $J[g^{μν}(θ^i)]$, where $g^{μν}(θ^i)$ is the Fisher metric. We postulate that this functional of the dynamical variable $g^{μν}(θ^i)$ is stationary with respect to small variations of these variables. Our approach enables a dynamical approach to Fisher information metric. It allows to impose symmetries on a statistical system in a systematic way. This work is mainly motivated by the entropy approach to nonmonotonic reasoning.
11 pages