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Main Authors: Andreianov, Boris, Fagioli, Simone, Rosini, Massimiliano D., Stivaletta, Graziano
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2503.11200
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author Andreianov, Boris
Fagioli, Simone
Rosini, Massimiliano D.
Stivaletta, Graziano
author_facet Andreianov, Boris
Fagioli, Simone
Rosini, Massimiliano D.
Stivaletta, Graziano
contents We investigate stability issues for the one-dimensional variant of the celebrated Hughes model for pedestrian evacuation. The cost function is assumed to be affine, which is a setting where existence of solutions with BV loc in space regularity, away from the so-called turning curve, was recently established. We provide a uniqueness result for solutions having the special property that agents never cross the turning curve (which implies that they are BV globally). In the same setting, continuous dependence of solutions on the cost parameter is highlighted. On the other hand, numerical simulations using the manyparticle approximation of the model, with more general initial conditions that allow the support of the solutions to intersect the turning curve, demonstrate the strong sensitivity of the evacuation time to the same cost parameter; this instability arises from interactions between agents and the turning curve.
format Preprint
id arxiv_https___arxiv_org_abs_2503_11200
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On stability of one-dimensional Hughes' dynamics with affine costs
Andreianov, Boris
Fagioli, Simone
Rosini, Massimiliano D.
Stivaletta, Graziano
Analysis of PDEs
We investigate stability issues for the one-dimensional variant of the celebrated Hughes model for pedestrian evacuation. The cost function is assumed to be affine, which is a setting where existence of solutions with BV loc in space regularity, away from the so-called turning curve, was recently established. We provide a uniqueness result for solutions having the special property that agents never cross the turning curve (which implies that they are BV globally). In the same setting, continuous dependence of solutions on the cost parameter is highlighted. On the other hand, numerical simulations using the manyparticle approximation of the model, with more general initial conditions that allow the support of the solutions to intersect the turning curve, demonstrate the strong sensitivity of the evacuation time to the same cost parameter; this instability arises from interactions between agents and the turning curve.
title On stability of one-dimensional Hughes' dynamics with affine costs
topic Analysis of PDEs
url https://arxiv.org/abs/2503.11200