Related references
Note: Only part of the references are listed.Nonlinear analysis of the optimal velocity difference model with reaction-time delay
Jie Zhou et al.
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2014)
The theoretical analysis of the anticipation lattice models for traffic flow
Rong-Jun Cheng et al.
NONLINEAR DYNAMICS (2014)
TDGL equation in lattice hydrodynamic model considering driver's physical delay
Hong-Xia Ge et al.
NONLINEAR DYNAMICS (2014)
A new lattice hydrodynamic model for two-lane traffic with the consideration of density difference effect
Tao Wang et al.
NONLINEAR DYNAMICS (2014)
Analyses of the driver's anticipation effect in a new lattice hydrodynamic traffic flow model with passing
Arvind Kumar Gupta et al.
NONLINEAR DYNAMICS (2014)
Phase transitions in the two-lane density difference lattice hydrodynamic model of traffic flow
Tao Wang et al.
NONLINEAR DYNAMICS (2014)
Using Fourier differential quadrature method to analyze transverse nonlinear vibrations of an axially accelerating viscoelastic beam
W. Zhang et al.
NONLINEAR DYNAMICS (2014)
A new car-following model with two delays
Lei Yu et al.
PHYSICS LETTERS A (2014)
A new lattice model of two-lane traffic flow with the consideration of optimal current difference
Guanghan Peng
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2013)
A new lattice model of the traffic flow with the consideration of the driver anticipation effect in a two-lane system
Guanghan Peng
NONLINEAR DYNAMICS (2013)
Friction coefficient and radius of curvature effects upon traffic flow on a curved Road
Wen-Xing Zhu et al.
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2012)
Cellular automata simulation of traffic including cars and bicycles
Jelena Vasic et al.
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2012)
A driver's memory lattice model of traffic flow and its numerical simulation
Guanghan Peng et al.
NONLINEAR DYNAMICS (2012)
A new car-following model accounting for varying road condition
Tieqiao Tang et al.
NONLINEAR DYNAMICS (2012)
Nonlinear analysis of lattice model with consideration of optimal current difference
Chuan Tian et al.
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2011)
The influence of nonmonotonic synchronized flow branch in a cellular automaton traffic flow model
Cheng-Jie Jin et al.
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2011)
Optimal velocity difference model for a car-following theory
G. H. Peng et al.
PHYSICS LETTERS A (2011)
Non-lane-based lattice hydrodynamic model of traffic flow considering the lateral effects of the lane width
G. H. Peng et al.
PHYSICS LETTERS A (2011)
The theoretical analysis of the lattice hydrodynamic models for traffic flow theory
H. X. Ge et al.
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2010)
Effect of the optimal velocity function on traffic phase transitions in lattice hydrodynamic models
Xingli Li et al.
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2009)
The Korteweg-de Vries soliton in the lattice hydrodynamic model
H. X. Ge
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2009)
A Backward-Looking Optimal Current Lattice Model
Zhu Wen-Xing
COMMUNICATIONS IN THEORETICAL PHYSICS (2008)
Stabilization analysis and modified KdV equation of lattice models with consideration of relative current
Zhipeng Li et al.
INTERNATIONAL JOURNAL OF MODERN PHYSICS C (2008)
The backward looking effect in the lattice hydrodynamic model
Ge Hong-Xia et al.
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2008)
The stability analysis of the full velocity and acceleration velocity model
Zhao Xiaomei et al.
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2007)
Cellular automata models of road traffic
S Maerivoet et al.
PHYSICS REPORTS-REVIEW SECTION OF PHYSICS LETTERS (2005)
Traffic behavior near an off ramp in the cellular automaton traffic model
B Jia et al.
PHYSICAL REVIEW E (2004)
Anisotropic property revisited - does it hold in multi-lane traffic?
HM Zhang
TRANSPORTATION RESEARCH PART B-METHODOLOGICAL (2003)
Continuum traffic model with the consideration of two delay time scales
Y Xue et al.
PHYSICAL REVIEW E (2003)
A new continuum model for traffic flow and numerical tests
R Jiang et al.
TRANSPORTATION RESEARCH PART B-METHODOLOGICAL (2002)
Full velocity difference model for a car-following theory
R Jiang et al.
PHYSICAL REVIEW E (2001)
Share Paper
