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Information Geometric Theory in the Prediction of Abrupt Changes in System Dynamics

Adrián-Josué Guel-Cortez, Eun‐jin Kim

2021Entropy26 citationsDOIOpen Access PDF

Abstract

Detection and measurement of abrupt changes in a process can provide us with important tools for decision making in systems management. In particular, it can be utilised to predict the onset of a sudden event such as a rare, extreme event which causes the abrupt dynamical change in the system. Here, we investigate the prediction capability of information theory by focusing on how sensitive information-geometric theory (information length diagnostics) and entropy-based information theoretical method (information flow) are to abrupt changes. To this end, we utilise a non-autonomous Kramer equation by including a sudden perturbation to the system to mimic the onset of a sudden event and calculate time-dependent probability density functions (PDFs) and various statistical quantities with the help of numerical simulations. We show that information length diagnostics predict the onset of a sudden event better than the information flow. Furthermore, it is explicitly shown that the information flow like any other entropy-based measures has limitations in measuring perturbations which do not affect entropy.

Topics & Concepts

Transfer entropyStatistical physicsEntropy (arrow of time)Information theoryComputer sciencePerturbation (astronomy)Information geometryPrinciple of maximum entropyData miningMathematicsPhysicsStatisticsArtificial intelligenceCurvatureQuantum mechanicsScalar curvatureGeometryEcosystem dynamics and resilienceStatistical Mechanics and EntropyComplex Systems and Decision Making