DERIVATION OF SECOND ORDER TRAFFIC FLOW MODELS WITH TIME DELAYS

被引:7
|
作者
Burger, Michael [1 ]
Goettlich, Simone [2 ]
Jung, Thomas [1 ]
机构
[1] Fraunhofer Inst ITWM, D-67663 Kaiserslautern, Germany
[2] Univ Mannheim, Dept Math, D-68131 Mannheim, Germany
来源
NETWORKS AND HETEROGENEOUS MEDIA | 2019年 / 14卷 / 02期
关键词
Traffic flow models; hyperbolic delay partial differential equation; numerical simulations; microscopic to macroscopic; data fitting; SCHEMES;
D O I
10.3934/nhm.2019011
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
Starting from microscopic follow-the-leader models, we develop hyperbolic delay partial differential equations to govern the density and velocity of vehicular traffic. The proposed models can be seen as an extension of the classical Aw-Rascle-Zhang model, where the reaction time of drivers appears as an additional term in the velocity equation. We propose numerical methods based on first principles and present a numerical study, where we focus on the impact of time delays in comparison to undelayed models.
引用
收藏
页码:265 / 288
页数:24
相关论文
共 50 条
  • [31] Numerical homogenization of a second order discrete model for traffic flow
    Salazar, W.
    COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2016, 71 (01) : 29 - 45
  • [32] HOMOGENIZATION OF SECOND ORDER DISCRETE MODEL AND APPLICATION TO TRAFFIC FLOW
    Forcadel, N.
    Salazar, W.
    DIFFERENTIAL AND INTEGRAL EQUATIONS, 2015, 28 (11-12) : 1039 - 1068
  • [33] Requiem for second-order fluid approximations of traffic flow
    Daganzo, CF
    TRANSPORTATION RESEARCH PART B-METHODOLOGICAL, 1995, 29 (04) : 277 - 286
  • [34] Distributed proportion-integration-derivation formation control for second-order multi-agent systems with communication time delays
    Qin, Liguo
    He, Xiao
    Zhou, Donghua
    NEUROCOMPUTING, 2017, 267 : 271 - 282
  • [35] STABILITY OF A CONSENSUS PROTOCOL FOR SECOND ORDER AGENTS WITH MULTIPLE TIME DELAYS
    Cepeda-Gomez, Rudy
    Olgac, Nejat
    PROCEEDINGS OF THE ASME DYNAMIC SYSTEMS AND CONTROL CONFERENCE AND BATH/ASME SYMPOSIUM ON FLUID POWER AND MOTION CONTROL (DSCC 2011), VOL 1, 2012, : 305 - 312
  • [36] Stability analysis of second order Hopfield neural networks with time delays
    Pei, JA
    Xu, DY
    Yang, ZC
    Zhu, W
    ADVANCES IN NEURAL NETWORKS - ISNN 2005, PT 1, PROCEEDINGS, 2005, 3496 : 241 - 246
  • [37] Forced second-order consensus in directed networks with time delays
    Rong, Lina
    Xu, Shengyuan
    Xie, Duosi
    Zou, Yun
    IMA JOURNAL OF MATHEMATICAL CONTROL AND INFORMATION, 2013, 30 (03) : 329 - 343
  • [38] Stability analysis of second order Hopfield neural networks with time delays
    Xi Tong Gong Cheng Yu Dian Zi Ji Shu/Systems Engineering and Electronics, 2002, 24 (07):
  • [39] REDUCED-ORDER, MULTIVARIABLE MODELS WITH PURE TIME DELAYS
    IWAI, Z
    FISHER, DG
    SEBORG, DE
    AICHE JOURNAL, 1985, 31 (02) : 229 - 236
  • [40] High-resolution central-upwind scheme for second-order macroscopic traffic flow models
    Chen, Jianzhong
    Liu, Ronghui
    Hu, Yanmei
    INTERNATIONAL JOURNAL OF MODERN PHYSICS C, 2020, 31 (07):
12345