Sunsetting skim matrices: A trajectory-mining approach to derive travel time skim matrix in dynamic traffic assignment for activity-base model integration

The travel impedance skim matrix is one of the most essential intermediate products within transportation forecasting models and is a fundamental input for activity-based transportation forecasting models. It reflects interzonal travel time, travel time reliability, travel costs, etc. by time of day. The traditional method to obtain skim matrices is to execute multiple times of time-dependent, shortest-path calculations. However, the computational and memory use burden can easily increase to an intractable level when dealing with mega-scale networks, such as those with thousands of traffic-analysis zones. This research proposes two new approaches to extract the interzonal travel impedance information from the already existing vehicle trajectory data. Vehicle trajectories store travel impedance information in a more compact format when compared to time-dependent link performance profiles. The numerical experiments highlight huge potential advantages of the proposed approaches in terms of saving both memory and CPU time.

[1]  Wendell Bell,et al.  Location and Space-Economy. , 1957 .

[2]  Athanasios K. Ziliaskopoulos,et al.  Foundations of Dynamic Traffic Assignment: The Past, the Present and the Future , 2001 .

[3]  Hani S. Mahmassani,et al.  Dynasmart-IP: Dynamic Traffic Assignment Meso-Simulator for Intermodal Networks , 2002 .

[4]  William H. K. Lam,et al.  An activity-based time-dependent traffic assignment model , 2001 .

[5]  Mark Bradley,et al.  Activity-Based Travel Demand Models: A Primer , 2014 .

[6]  Joel Freedman,et al.  Synthesis of first practices and operational research approaches in activity-based travel demand modeling , 2007 .

[8]  Michel Bierlaire,et al.  DynaMIT: a simulation-based system for traffic prediction and guidance generation , 1998 .

[9]  D. Wallace,et al.  Urban Traffic, A Function of Land Use. , 1956 .

[10]  Jon Bottom,et al.  Dynamic Traffic Assignment: A Primer , 2011 .

[11]  Ye Tian,et al.  Generating a Spatiotemporal Dynamic Map for Traffic Analysis Using Macroscopic Fundamental Diagram , 2019, Journal of Advanced Transportation.

[12]  Brian Gardner,et al.  Incorporating Feedback in Travel Forecasting , 1997 .

[13]  David E. Boyce,et al.  INTRODUCING "FEEDBACK" INTO FOUR-STEP TRAVEL FORECASTING PROCEDURE VERSUS EQUILIBRIUM SOLUTION OF COMBINED MODEL , 1994 .

[14]  Xuesong Zhou,et al.  DTALite: A queue-based mesoscopic traffic simulator for fast model evaluation and calibration , 2014 .

[15]  Yi-Chang Chiu,et al.  A Variable Time-Discretization Strategies-Based, Time-Dependent Shortest Path Algorithm for Dynamic Traffic Assignment , 2014, J. Intell. Transp. Syst..

[16]  David M Levinson,et al.  A Multi-Modal Trip Distribution Model , 2008 .

[17]  Mark Bradley,et al.  Development and Application of the SACSIM Activity-Based Model System , 2007 .

[18]  Eric J. Miller,et al.  Integrating an Activity-Based Travel Demand Model with Dynamic Traffic Assignment and Emission Models , 2010 .

[19]  Walter Isard,et al.  Location and Space-Economy , 1956 .

[20]  Yi-Chang Chiu,et al.  Understanding behavioral effects of tradable mobility credit scheme: An experimental economics approach , 2019, Transport Policy.

[21]  David E. Boyce,et al.  Solving the Sequential Travel Forecasting Procedure with Feedback , 2008 .

[22]  Dung-Ying Lin,et al.  Integration of Activity-Based Modeling and Dynamic Traffic Assignment , 2008 .

[23]  Peter Vovsha,et al.  CT-RAMP Family of Activity-Based Models , 2010 .