Lyapunov exponents for temporal networks
Annalisa Caligiuri, Victor M. Eguı́luz, Leonardo Di Gaetano, Tobias Galla, Lucas Lacasa
Abstract
By interpreting a temporal network as a trajectory of a latent graph dynamical system, we introduce the concept of dynamical instability of a temporal network and construct a measure to estimate the network maximum Lyapunov exponent (nMLE) of a temporal network trajectory. Extending conventional algorithmic methods from nonlinear time-series analysis to networks, we show how to quantify sensitive dependence on initial conditions and estimate the nMLE directly from a single network trajectory. We validate our method for a range of synthetic generative network models displaying low- and high-dimensional chaos and finally discuss potential applications.
Topics & Concepts
Lyapunov exponentTrajectoryNonlinear systemComputer scienceGraphDynamical systems theoryInstabilityMeasure (data warehouse)Statistical physicsComplex networkRange (aeronautics)Lyapunov functionApplied mathematicsPhysicsMathematicsTheoretical computer scienceChaoticArtificial intelligenceData miningWorld Wide WebAstronomyComposite materialQuantum mechanicsMaterials scienceMechanicsNonlinear Dynamics and Pattern FormationOpinion Dynamics and Social InfluenceEcosystem dynamics and resilience