Florian Schanzenbacher scite author profile

Florian Schanzenbacher

3Publications

47Citation Statements Received

49Citation Statements Given

How they've been cited

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Affiliations

Laboratoire Ville Mobilité Transport, Régie Autonome des Transports Parisiens (France), Université Gustave Eiffel

Publications

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A discrete event traffic model explaining the traffic phases of the train dynamics in a metro line system with a junction

Schanzenbacher

Farhi

Christoforou

et al. 2017

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This paper presents a mathematical model for the train dynamics in a mass-transit metro line system with one symmetrically operated junction. We distinguish three parts: a central part and two branches. The tracks are spatially discretized into segments (or blocks) and the train dynamics are described by a discrete event system where the variables are the k th departure times from each segment. The train dynamics are based on two main constraints: a travel time constraint modeling theoretic run and dwell times, and a safe separation constraint modeling the signaling system in case where the traffic gets very dense. The Max-plus algebra model allows to analytically derive the asymptotic average train frequency as a function of many parameters, including train travel times, minimum safety intervals, the total number of trains on the line and the number of trains on each branch. This derivation permits to understand the physics of traffic. In a further step, the results will be used for traffic control.

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A discrete event traffic model explaining the traffic phases of the train dynamics on a linear metro line with demand-dependent control

Schanzenbacher¹,

Farhi

Leurent

et al. 2018

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In this paper we present a mathematical model of the train dynamics in a linear metro line system with demanddependent run and dwell times. On every segment of the line, we consider two main constraints. The first constraint is on the travel time, which is the sum of run and dwell time. The second one is on the safe separation time, modeling the signaling system, so that only one train can occupy a segment at a time. The dwell and the run times are modeled dynamically, with two control laws. The one on the dwell time makes sure that all the passengers can debark from and embark into the train. The one on the run time ensures train time-headway regularity in the case where perturbations do not exceed a run time margin.We use a Max-plus algebra approach which allows to derive analytic formulas for the train time-headway and frequency depending on the number of trains and on the passenger demand. The analytic formulas, illustrated by 3D figures, permit to understand the phases of the train dynamics of a linear metro line being operated as a transport on demand system.

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Feedback Control for Metro Lines With a Junction

Schanzenbacher

Farhi

Leurent

et al. 2021

IEEE Trans. Intell. Transport. Syst.

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