Traffic flow inspired analysis and boundary control for a class of 2×2 hyperbolic systems

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Title

Traffic flow inspired analysis and boundary control for a class of 2×2 hyperbolic systems (EN)

Creator

Μπεκιαρης-Λυμπερης Νικολαος (EL)

Παπαγεωργιου Μαρκος (EL)

Καραφυλλης Ιασων (EL)

Bekiaris-Liberis Nikolaos (EN)

Karafyllis Iason (EN)

Papageorgiou Markos (EN)

Type

full paper

conferenceItem

Conference item (EN)

Article
Scientific article (EN)

Issued

2018

Year

2018 (EN)

Description

The paper presents results for a class of 2x2 systems of nonlinear hyperbolic PDEs on a 1-D bounded domain, inspired by second-order traffic flow models. The model consists of two first-order hyperbolic PDEs with a dynamic boundary condition that involves the time derivative of the velocity. The developed model has features that are important from a traffic-theoretic point of view: is completely anisotropic and information travels forward exactly at the same speed as traffic. It is shown that, for all physically meaningful initial conditions, the model admits a globally defined, unique, classical solution that remains positive and bounded for all times. Furthermore, a nonlinear, explicit boundary feedback law is developed, which achieves global stabilization of arbitrary equilibria. The stabilizing feedback law depends only on the inlet velocity and consequently, the measurement requirements for the implementation of the proposed boundary feedback law are minimal. The efficiency of the proposed boundary feedback law is demonstrated by means of a numerical example. (EN)

Subject

PDE control (EN)

Traffic flow control (EN)

Hyperbolic systems (EN)

Language

English

Publisher

Institute of Electrical and Electronics Engineers (EN)

School / Department / Institute

Πολυτεχνείο Κρήτης (EL)

Technical University of Crete (EN)

Provider

Technical University of Crete

Repository / collection

Institutional Repository Technical University of Crete

Subcollections

School of Chemical and Environmental Engineering - Conference Publications

Traffic flow inspired analysis and boundary control for a class of 2×2 hyperbolic systems

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