Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Colombo, R.M
and
Groli, A
2004.
Minimising stop and go waves to optimise traffic flow.
Applied Mathematics Letters,
Vol. 17,
Issue. 6,
p.
697.
Chanut, Stéphane
2005.
Transportation and Traffic Theory.
p.
323.
2005.
Hyberbolic Conservation Laws in Continuum Physics.
Vol. 325,
Issue. ,
p.
511.
Colombo, R.M.
2005.
Traffic and Granular Flow ’03.
p.
229.
Garavello, Mauro
and
Piccoli, Benedetto
2006.
Traffic Flow on a Road Network Using the Aw–Rascle Model.
Communications in Partial Differential Equations,
Vol. 31,
Issue. 2,
p.
243.
Benzoni-Gavage, Sylvie
Colombo, Rinaldo M
and
Gwiazda, Piotr
2006.
Measure valued solutions to conservation laws motivated by traffic modelling.
Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences,
Vol. 462,
Issue. 2070,
p.
1791.
Bürger, Raimund
and
Kozakevicius, Alice
2007.
Adaptive multiresolution WENO schemes for multi-species kinematic flow models.
Journal of Computational Physics,
Vol. 224,
Issue. 2,
p.
1190.
Berres, S.
and
Bürger, R.
2007.
On Riemann problems and front tracking for a model of sedimentation of polydisperse suspensions.
ZAMM - Journal of Applied Mathematics and Mechanics / Zeitschrift für Angewandte Mathematik und Mechanik,
Vol. 87,
Issue. 10,
p.
665.
Bürger, R.
García, A.
Karlsen, K. H.
and
Towers, J. D.
2008.
A family of numerical schemes for kinematic flows with discontinuous flux.
Journal of Engineering Mathematics,
Vol. 60,
Issue. 3-4,
p.
387.
Logghe, S.
and
Immers, L.H.
2008.
Multi-class kinematic wave theory of traffic flow.
Transportation Research Part B: Methodological,
Vol. 42,
Issue. 6,
p.
523.
BÜRGER, RAIMUND
GARCIA, ANTONIO
and
KUNIK, MATTHIAS
2008.
A GENERALIZED KINETIC MODEL OF SEDIMENTATION OF POLYDISPERSE SUSPENSIONS WITH A CONTINUOUS PARTICLE SIZE DISTRIBUTION.
Mathematical Models and Methods in Applied Sciences,
Vol. 18,
Issue. 10,
p.
1741.
Zhang, Peng
Wong, S.C.
and
Xu, Zhenli
2008.
A hybrid scheme for solving a multi-class traffic flow model with complex wave breaking.
Computer Methods in Applied Mechanics and Engineering,
Vol. 197,
Issue. 45-48,
p.
3816.
Donat, Rosa
and
Mulet, Pep
2008.
Characteristic-Based Schemes for Multi-Class Lighthill-Whitham-Richards Traffic Models.
Journal of Scientific Computing,
Vol. 37,
Issue. 3,
p.
233.
D'APICE, CIRO
and
PICCOLI, BENEDETTO
2008.
VERTEX FLOW MODELS FOR VEHICULAR TRAFFIC ON NETWORKS.
Mathematical Models and Methods in Applied Sciences,
Vol. 18,
Issue. supp01,
p.
1299.
Zhang, Peng
Wong, S. C.
and
Dai, Shi‐Qiang
2009.
A note on the weighted essentially non‐oscillatory numerical scheme for a multi‐class Lighthill–Whitham–Richards traffic flow model.
Communications in Numerical Methods in Engineering,
Vol. 25,
Issue. 11,
p.
1120.
Deo, Puspita
De Schutter, Bart
and
Hegyi, Andreas
2009.
Model Predictive Control for Multi-Class Traffic Flows.
IFAC Proceedings Volumes,
Vol. 42,
Issue. 15,
p.
25.
Tang, T.Q.
Huang, H.J.
Zhao, S.G.
and
Shang, H.Y.
2009.
A new dynamic model for heterogeneous traffic flow.
Physics Letters A,
Vol. 373,
Issue. 29,
p.
2461.
Leclercq, Ludovic
and
Laval, Jorge A.
2009.
Traffic and Granular Flow ’07.
p.
151.
Basson, David K.
Berres, Stefan
and
Bürger, Raimund
2009.
On models of polydisperse sedimentation with particle-size-specific hindered-settling factors.
Applied Mathematical Modelling,
Vol. 33,
Issue. 4,
p.
1815.
Mercier, Magali
2009.
Traffic flow modelling with junctions.
Journal of Mathematical Analysis and Applications,
Vol. 350,
Issue. 1,
p.
369.