A discrete Hughes' model for pedestrian flow on graphs

In this paper, we introduce a discrete time-finite state model for pedestrian flow on a graph in the spirit of the Hughes dynamic continuum model. The pedestrians, represented by a density function, move on the graph choosing a route to minimize the instantaneous travel cost to the destination. The...

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Veröffentlicht in:	arXiv.org 2016-04
Hauptverfasser:	Camilli, Fabio, Festa, Adriano, Tozza, Silvia
Format:	Artikel
Sprache:	eng
Schlagworte:	Continuum modeling Density Eikonal equation Graphical representations Mathematical models Pedestrian traffic flow Pedestrians
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creator	Camilli, Fabio Festa, Adriano Tozza, Silvia
description	In this paper, we introduce a discrete time-finite state model for pedestrian flow on a graph in the spirit of the Hughes dynamic continuum model. The pedestrians, represented by a density function, move on the graph choosing a route to minimize the instantaneous travel cost to the destination. The density is governed by a conservation law while the minimization principle is described by a graph eikonal equation. We show that the model is well posed and we implement some numerical examples to demonstrate the validity of the proposed model.
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subjects	Continuum modeling Density Eikonal equation Graphical representations Mathematical models Pedestrian traffic flow Pedestrians
title	A discrete Hughes' model for pedestrian flow on graphs
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