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Moment-Driven Predictive Control of Mean-Field Collective Dynamics

Giacomo Albi, Michaël Herty, Dante Kalise, Chiara Segala

2022SIAM Journal on Control and Optimization18 citationsDOIOpen Access PDF

Abstract

The synthesis of control laws for interacting agent-based dynamics and their mean-field limit is studied. A linearization-based approach is used for the computation of suboptimal feedback laws obtained from the solution of differential matrix Riccati equations. Quantification of dynamic performance of such control laws leads to theoretical estimates on suitable linearization points of the nonlinear dynamics. Subsequently, the feedback laws are embedded into a nonlinear model predictive control framework where the control is updated adaptively in time according to dynamic information on moments of linear mean-field dynamics. The performance and robustness of the proposed methodology is assessed through different numerical experiments in collective dynamics.

Topics & Concepts

MathematicsControl theory (sociology)LinearizationNonlinear systemRobustness (evolution)Model predictive controlFeedback linearizationComputationMoment (physics)Field (mathematics)Optimal controlApplied mathematicsMathematical optimizationControl (management)Computer scienceAlgorithmClassical mechanicsPhysicsArtificial intelligencePure mathematicsBiochemistryChemistryGeneQuantum mechanicsDistributed Control Multi-Agent SystemsNonlinear Dynamics and Pattern FormationNeural Networks Stability and Synchronization