Departure Time Choice with Parametric Heterogeneity: Equilibrium and Instability
Published Online:27 May 2026https://doi.org/10.1287/trsc.2025.0109
References
- (2021) A new look at departure time choice equilibrium models with heterogeneous users. Transportation Res. Part B Methodological 148:152–182.Crossref, Google Scholar
- (1988) Schedule delay and departure time decisions with heterogeneous commuters. Transportation Res. Rec. 1197:56–67.Google Scholar
- (1994) The welfare effects of congestion tolls with heterogeneous commuters. J. Transport Econom. Policy 28(2):148–160.Google Scholar
- (2017) A statistical method for estimating predictable differences between daily traffic flow profiles. Transportation Res. Part B 95:196–213.Crossref, Google Scholar
- (1985) The uniqueness of a time-dependent equilibrium distribution of arrivals at a single bottleneck. Transportation Sci. 19(1):29–37.Link, Google Scholar
- (2021) Exploration of maximum-to-minimum shifts in generic methods for departure time choice models. Transportation Res. Rec. 2675(10):907–915.Crossref, Google Scholar
- (2000) Solution and stability for a simple dynamic bottleneck model. Filar AJ, Gatisgory V, Mizukami K, eds. Advances in Dynamic Games and Applications (Springer, Berlin), 405–425.Crossref, Google Scholar
- (2018) Are we really solving the dynamic traffic equilibrium problem with a departure time choice? Transportation Sci. 52(3):603–620.Link, Google Scholar
- (2018) Day-to-day departure time choice under bounded rationality in the bottleneck model. Transportation Res. Part B Methodological 117:832–849.Crossref, Google Scholar
- (1981) Schedule delay and departure time decisions in a deterministic model. Transportation Sci. 15(1):62–77.Link, Google Scholar
- (2008) An analysis of instability in a departure time choice problem. J. Adv. Transportation 42(3):333–356.Crossref, Google Scholar
- (2019) Instability of departure time choice problem: A case with replicator dynamics. Transportation Res. Part B 126:353–364.Crossref, Google Scholar
- (2021) Stable local dynamics for day-to-day departure time choice. Transportation Res. Part B Methodological 149:463–479.Crossref, Google Scholar
- (2021) Monotonicity in the trip scheduling problem. Transportation Res. Part B 146:14–25.Crossref, Google Scholar
- (2020) Fifty years of the bottleneck model: A bibliometric review and future research directions. Transportation Res. Part B 139:311–342.Crossref, Google Scholar
- (1996) Potential games. Games Econom. Behav. 14(1):124–143.Crossref, Google Scholar
- (1987) The morning commute for nonidentical travelers. Transportation Sci. 21(2):63–129.Link, Google Scholar
- (1995) Statistical analysis of day-to-day variations in real-time traffic flow data. Transportation Res. Rec. 1510:26–34.Google Scholar
- (2024) Stochastic approximation of symmetric Nash equilibria in queueing games. Oper. Res. 72(6):2698–2725.Link, Google Scholar
- (2010) Population Games and Evolutionary Dynamics (MIT Press, Cambridge, MA).Google Scholar
- (1984) The stability of a dynamic model of traffic assignment—An application of a method of Lyapunov. Transportation Sci. 18(3):245–252.Link, Google Scholar
- (1969) Congestion theory and transport investment. Amer. Econom. Rev. 59(2):251–261.Google Scholar
- (2015) Predictability of road traffic and congestion in urban areas. PLoS One 10(4):e0121825.Google Scholar
- (2005) Analyzing highway flow patterns using cluster analysis. Proc. Eighth Internat. IEEE Conf. Intelligent Transportation Systems (IEEE, Piscataway, NJ), 308–313.Google Scholar
- (2019) Day-to-day evolution of departure time choice in stochastic capacity bottleneck models with bounded rationality and various information perceptions. Transportation Res. Part E Logist. Transportation Rev. 131:168–192.Crossref, Google Scholar
