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Computer Research and Modeling, 2018, Volume 10, Issue 3, Pages 335–345
DOI: https://doi.org/10.20537/2076-7633-2018-10-3-335-345
(Mi crm256)
 

This article is cited in 3 scientific papers (total in 3 papers)

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Searching stochastic equilibria in transport networks by universal primal-dual gradient method

A. V. Gasnikovab, M. B. Kubentayevab

a The Institute for Information Transmission Problems RAS, 19 Bolshoy Karetny per., build. 1, Moscow, 127051, Russia
b Moscow Institute of Physics and Technology, 9 Institutskiy per., Dolgoprudny, Moscow Region, 141701, Russia
Full-text PDF (209 kB) Citations (3)
References:
Abstract: We consider one of the problems of transport modelling — searching the equilibrium distribution of traffic flows in the network. We use the classic Beckman's model to describe time costs and flow distribution in the network represented by directed graph. Meanwhile agents' behavior is not completely rational, what is described by the introduction of Markov logit dynamics: any driver selects a route randomly according to the Gibbs' distribution taking into account current time costs on the edges of the graph. Thus, the problem is reduced to searching of the stationary distribution for this dynamics which is a stochastic Nash–Wardrope equilibrium in the corresponding population congestion game in the transport network. Since the game is potential, this problem is equivalent to the problem of minimization of some functional over flows distribution. The stochasticity is reflected in the appearance of the entropy regularization, in contrast to non-stochastic case. The dual problem is constructed to obtain a solution of the optimization problem. The universal primal-dual gradient method is applied. A major specificity of this method lies in an adaptive adjustment to the local smoothness of the problem, what is most important in case of the complex structure of the objective function and an in ability to obtain a prior smoothness bound with acceptable accuracy. Such a situation occurs in the considered problem since the properties of the function strongly depend on the transport graph, on which we do not impose strong restrictions. The article describes the algorithm including the numerical differentiation for calculation of the objective function value and gradient. In addition, the paper represents a theoretical estimate of time complexity of the algorithm and the results of numerical experiments conducted on a small American town.
Keywords: Beckman's model, Nash–Wardrop equilibrium, universal similar triangles method, convex optimization.
Funding agency Grant number
Grant of the President of the Russian Federation for State Support of Young Russian Scientists — Candidates of Science МК-1806.2017.9
Совет по грантам Президента Российской Федерации, государственная поддержка научных исследований молодых российских ученых-докторов наук МД-1320.2018.1
This work was supported by grants MK-1806.2017.9, МD-1320.2018.1.
Received: 28.02.2018
Revised: 18.05.2018
Accepted: 24.05.2018
Document Type: Article
UDC: 519.8
Language: Russian
Citation: A. V. Gasnikov, M. B. Kubentayeva, “Searching stochastic equilibria in transport networks by universal primal-dual gradient method”, Computer Research and Modeling, 10:3 (2018), 335–345
Citation in format AMSBIB
\Bibitem{GasKub18}
\by A.~V.~Gasnikov, M.~B.~Kubentayeva
\paper Searching stochastic equilibria in transport networks by universal primal-dual gradient method
\jour Computer Research and Modeling
\yr 2018
\vol 10
\issue 3
\pages 335--345
\mathnet{http://mi.mathnet.ru/crm256}
\crossref{https://doi.org/10.20537/2076-7633-2018-10-3-335-345}
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  • This publication is cited in the following 3 articles:
    Citing articles in Google Scholar: Russian citations, English citations
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