A Continuum Model for Cities Based on the Macroscopic Fundamental Diagram: a Semi-Lagrangian Solution Method

Aghamohammadi, Rafegh; Laval, Jorge A.

doi:10.1016/j.trpro.2019.05.021

Cited by 8 publications

(3 citation statements)

References 38 publications

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“…The drawback of this model is that the traffic density may become unbounded (it is not based on a fundamental diagram). There exist also other works [40,41] proposing 2D multi-layer models with bounded densities. However, they do not include mixing between different direction layers, i.e., vehicles can not change their direction of motion.…”

Section: Introductionmentioning

confidence: 99%

Multi-directional continuous traffic model for large-scale urban networks

Tumash

Canudas‐de‐Wit

Monache

2022

Transportation Research Part B: Methodological

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Section: Introductionmentioning

confidence: 99%

Multi-directional continuous traffic model for large-scale urban networks

Tumash

Canudas‐de‐Wit

Monache

2022

Transportation Research Part B: Methodological

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“…Following this approach, the use of FD as a way to study the capacity of collective systems was widely adopted and it started to be used in pedestrian dynamics. Nowadays, the FD is one of the most important macroscopic observables used in this field [6][7][8][9][10][11] allowing to establish comparisons between different experiments and validating numerical models. Furthermore, the FD has been applied in different scenarios and geometries, such as waiting rooms, stairs, sidewalks, or corridors with uni and bidirectional pedestrian flow [12].…”

Section: Introductionmentioning

confidence: 99%

Effect of physical distancing on the speed–density relation in pedestrian dynamics

Echeverría-Huarte¹,

Garcimartín²,

Parisi³

et al. 2021

J. Stat. Mech.

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We report experimental results of the speed–density relation emerging in pedestrian dynamics when individuals keep a prescribed safety distance among them. To this end, we characterize the movement of a group of people roaming inside an enclosure varying different experimental parameters: (i) global density, (ii) prescribed walking speed, and (iii) suggested safety distance. Then, by means of the Voronoi diagram we are able to compute the local density associated to each pedestrian, which is afterward correlated with its corresponding velocity at each time. In this way, we discover a strong dependence of the speed–density relation on the experimental conditions, especially with the (prescribed) free speed. We also observe that when pedestrians walk slowly, the speed–density relation depends on the global macroscopic density of the system, and not only on the local one. Finally, we demonstrate that for the same experiment, each pedestrian follows a distinct behavior, thus giving rise to multiple speed–density curves.

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“…Hänseler et al [10] developed a macroscopic model to describe the dynamic of congested, multidirectional and time-varying pedestrian flows, where the anisotropy was accurately considered in the macroscopic framework. A consistent continuum macroscopic fundamental diagram model was formulated and solved with a semi-Lagrangian scheme in [11], where Eulerian and Lagrangian representations were both used. The dynamic of two intersecting pedestrian flows was modelled in [12] by using nonlinear partial differential equation, and then was illustrated with macroscopic and microscopic simulations.…”

Section: Introductionmentioning

confidence: 99%

Unit Sliding Mode Control for Disturbed Crowd Dynamics System Based on Integral Barrier Lyapunov Function

Qin

2020

IEEE Access

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This paper presents a new tracking controller for a crowd dynamics system. The crowd dynamics are described by a continuum model in the macro-scale. An appropriate control variable is chosen to solve the problem of the multi-directionality of crowd movement. In order to stabilize the state density of the disturbed crowd dynamics system at a given reference density, a unit sliding mode controller based on the integral barrier Lyapunov function is designed, and the reaching law approach is used to avoid chattering. By ensuring the boundedness of the integral barrier Lyapunov function in the closed-loop, the global constraints of the system state variables are obtained. The design of the controller and the stability analysis of the closed-loop system are all done in the distributed parameter system. A numerical example illustrates the utility of the proposed controller. INDEX TERMS Integral barrier Lyapunov function, unit sliding mode control, tracking control, disturbed crowd dynamics system, distributed parameter system.

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A Continuum Model for Cities Based on the Macroscopic Fundamental Diagram: a Semi-Lagrangian Solution Method

Cited by 8 publications

References 38 publications

Multi-directional continuous traffic model for large-scale urban networks

Multi-directional continuous traffic model for large-scale urban networks

Effect of physical distancing on the speed–density relation in pedestrian dynamics

Unit Sliding Mode Control for Disturbed Crowd Dynamics System Based on Integral Barrier Lyapunov Function

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