2020
DOI: 10.1016/j.jcp.2019.109181
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Instantaneous control of interacting particle systems in the mean-field limit

Abstract: Controlling large particle systems in collective dynamics by a few agents is a subject of high practical importance, e.g., in evacuation dynamics. In this paper we study an instantaneous control approach to steer an interacting particle system into a certain spatial region by repulsive forces from a few external agents, which might be interpreted as shepherd dogs leading sheep to their home. We introduce an appropriate mathematical model and the corresponding optimization problem. In particular, we are interes… Show more

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Cited by 48 publications
(47 citation statements)
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“…We recall an isotropic interaction model to clarify the starting point of the modifications. Following Newton's Second Law, isotropic interaction models are second order ODE systems [2,13,17,47,58], given by…”
Section: Collision Avoidance By Anisotropymentioning
confidence: 99%
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“…We recall an isotropic interaction model to clarify the starting point of the modifications. Following Newton's Second Law, isotropic interaction models are second order ODE systems [2,13,17,47,58], given by…”
Section: Collision Avoidance By Anisotropymentioning
confidence: 99%
“…Up to the author's knowledge the community widely agrees that isotropic interaction models that are used for the modelling of swarms of birds, schools of fish, sheep-dog interactions or opinion dynamics [2,13,15,50,47] are inappropriate for a detailed and realistic description of pedestrian dynamics [4]. This lack of details is unfortunate since these models allow for formulations on the microscopic, mesoscopic and macroscopic scale and even the limiting procedures are well understood, see [2,14,17,26,27,35,43,58] for an overview.…”
mentioning
confidence: 99%
“…To do so we define a time dependent reference stateZ : [0, T] → R D . Similar to the approach in [8], we measure the spread of the crowd aroundZ. In particular, due to the stochastic behaviour of the state system we use the expected paths E[X].…”
Section: The Cost Functionalmentioning
confidence: 99%
“…from f 0 (x, v), it is well-known that f (t, x, v) assigns the probability of finding a particle at time t at position x with velocity v. Hence, one could use the deterministic mean-field problem for f as coarse model for a space-mapping in order to control the stochastic limit for many particles. Note that a similar deterministic optimization problem was solved in [8].…”
Section: Nmentioning
confidence: 99%
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