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Minimal fatal shocks in multistable complex networks

Lukas Halekotte, Ulrike Feudel

2020Scientific Reports58 citationsDOIOpen Access PDF

Abstract

Multistability is a common phenomenon which naturally occurs in complex networks. Often one of the coexisting stable states can be identified as being the desired one for a particular application. We present here a global approach to identify the minimal perturbation which will instantaneously kick the system out of the basin of attraction of its desired state and hence induce a critical or fatal transition we call shock-tipping. The corresponding Minimal Fatal Shock is a vector whose length can be used as a global stability measure and whose direction in state space allows us to draw conclusions on weaknesses of the network corresponding to critical network motifs. We demonstrate this approach in plant-pollinator networks and the power grid of Great Britain. In both system classes, tree-like substructures appear to be the most vulnerable with respect to the minimal shock perturbation.

Topics & Concepts

MultistabilityPerturbation (astronomy)Computer scienceShock (circulatory)Complex networkPower gridAlternative stable stateTopology (electrical circuits)Statistical physicsMathematicsBiologyPhysicsPower (physics)EcologyMedicineNonlinear systemInternal medicineWorld Wide WebCombinatoricsQuantum mechanicsEcosystemEcosystem dynamics and resilienceNonlinear Dynamics and Pattern FormationPlant and animal studies
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