The Entropy Solutions for the Lighthill-Whitham-Richards Traffic Flow Model with a Discontinuous Flow-Density Relationship

Lu, Yue; Wong, S. C.; Zhang, Mengping; Shu, Chi‐Wang

doi:10.21236/ada468108

Cited by 11 publications

(19 citation statements)

References 18 publications

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“…The entropy condition (EC) for the TFs was presented in [7,8]. The ECs for the LWR model of the TFs with the discontinuity [9] and the quadratic flow [10] were discussed. The ECs for the hydrodynamic model of the TFs were reported in [11].…”

Section: Introductionmentioning

confidence: 99%

On the local fractional LWR model in fractal traffic flows in the entropy condition

Guo

Zhao

Zhou

et al. 2015

Math Methods in App Sciences

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Section: Introductionmentioning

confidence: 99%

On the local fractional LWR model in fractal traffic flows in the entropy condition

Guo

Zhao

Zhou

et al. 2015

Math Methods in App Sciences

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“…Lighthill, Whitham [3] and Richards [4] proposed a simple continuum macroscopic traffic flow model based on the hydrodynamic theory of fluids to describe the traffic characteristics which is popularly called as LWR model. It involves a non-linear, first-order hyperbolic partial differential equation (PDE) in space and time which can be solved either by analytical [5,6] or numerical methods [7,8]. With high performance computing facilities now-a-days, numerical solution of the PDE has been reported in many studies [7,8].…”

Section: Introductionmentioning

confidence: 99%

Finite Difference Formulation of Lighthill Whitham Richards Macroscopic Model for Traffic Flow Prediction

Omkar¹,

Kumar²

2018

Int. J. of Appl. Math.

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Mathematical modelling of traffic flow for accurate prediction of future traffic conditions plays a vital role in real time traffic control systems. Modelling of traffic at macroscopic level using Lighthill Whitham Richards (LWR) model is computationally less intensive than microscopic car following models. With advanced computing facilities, numerical solution of the LWR model is preferred than traditional analytical approaches. In the present study, an attempt has been made to solve numerically the LWR model using "Forward-Time Backward-Space (FTBS)" finite difference scheme. Actual traffic flow data collected from a roadway in Vellore were used to frame the initial and boundary conditions and for corroboration of the results. The results were promising as the predicted flow values by the FTBS scheme were matched closely with the actuals with mean absolute percentage error (MAPE) of 12.854. This showed the suitability of the proposed numerical scheme for traffic flow prediction.

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“…In the literature, capacity drop is modeled by discontinuous fundamental diagrams (Lu et al, 2008(Lu et al, , 2009). However, empirical observations suggest that fundamental diagrams are still continuous in steady-state traffic flow (Cassidy, 1998), and theoretical analyses show that unrealistic, infinite characteristic wave speeds can arise from a discontinuous flow-density relation (Li and Zhang, 2013).…”

Section: Introductionmentioning

confidence: 99%

Control of a lane-drop bottleneck through variable speed limits

Huang

Jin

2015

Transportation Research Part C: Emerging Technologies

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Keywords:Capacity drop Variable speed limits Kinematic wave model Link queue model Proportional-integral-derivative controller Stability a b s t r a c tThe discharging flow-rate of a lane-drop bottleneck can drop when its upstream is congested, and such capacity drop leads to additional traffic congestion as well as safety threats. Even though many studies have demonstrated that variable speed limits (VSL) can effectively delay and even avoid the occurrence of capacity drop, there lacks a simple approach for analyzing the performance of a VSL control system. In this study, we formulate the VSL control problem for the traffic system in a zone upstream to a lane-drop bottleneck based on two traffic flow models: the Lighthill-Whitham-Richards (LWR) model, which is an infinite-dimensional partial differential equation, and the link queue model, which is an ordinary differential equation and approximates the LWR model. In both models, the discharging flow-rate is determined by a recently developed model of capacity drop, and the upstream in-flux is regulated by the speed limit in the VSL zone. We first analytically study the properties of the control system with the link queue model. For an open-loop control system with a constant speed limit, we prove that a constant speed limit can introduce an uncongested equilibrium state, in addition to a congested one with capacity drop, but the congested equilibrium state is always exponentially stable. Then we apply a feedback proportional-integral (PI) controller to form a closed-loop control system, in which the congested equilibrium state and, therefore, capacity drop can be removed by both I-and PI-controllers. Both analytical and numerical results show that, with appropriately chosen controller parameters, the closed-loop control system is stable, effect, and robust. Finally, we show that the VSL strategies based on I-and PI-controllers are also stable, effective, and robust for the LWR model. Since the properties of the control system are transferable between the two models, we establish a dual approach for studying the control problems of nonlinear traffic flow systems. We also confirm that the VSL strategy is effective only if capacity drop occurs. The obtained method and insights can be useful for future studies on other traffic control methods and implementations of VSL strategies in lane-drop bottlenecks, work zones, and incident areas.

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The Entropy Solutions for the Lighthill-Whitham-Richards Traffic Flow Model with a Discontinuous Flow-Density Relationship

Cited by 11 publications

References 18 publications

On the local fractional LWR model in fractal traffic flows in the entropy condition

On the local fractional LWR model in fractal traffic flows in the entropy condition

Finite Difference Formulation of Lighthill Whitham Richards Macroscopic Model for Traffic Flow Prediction

Control of a lane-drop bottleneck through variable speed limits

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