1. Galaburda V. G. Sovershenstvovanie tekhnologii perevozok i uvelichenie propusknoj sposobnosti zheleznykh dorog. - M.: MIIT, 1983. 124 s.
2. Galaburda V. G. Optimal'noe planirovanie gruzopotokov. - M.: Transport, 1985. 256 s.
3. Aven O.I., Lovetskij S. E., Moiseenko G. E. Optimizatsiya transportnykh potokov. M.: Nauka, 1985. 166 s.
4. Vasil'eva E.M., Igudin R.V., Livshits V.N. Optimizatsiya planirovaniya i upravleniya
5. transportnymi sistemami. M.: Transport, 1987.
6. Blank M.L. Tochnyj analiz dinamicheskikh sistem, voznikayuschikh v modelyakh transportnykh potokov // UMN. 2000. T. 55(333), №3. S. 167–168.
7. Shvetsov V.I. Algoritmy raspredeleniya transportnykh potokov // Avtomatika i telemekhanika. 2009. №10. S. 148–157.
8. Sukhinova A. B., Trapeznikova M.A., Chetverushkin B.N., Chubarova N. G. Dvumernaya makroskopicheskaya model' transportnykh potokov // Matematicheskoe modelirovanie. 2009. T. 21, №2. S. 118–126.
9. Rubtsov A.O., Tarasov A.S. Modelirovanie zheleznodorozhnykh perevozok na territorii Rossii // Trudy Instituta sistemnogo analiza Rossijskoj akademii nauk. 2009. № 46. S. 274–278.
10. Levin D.Yu. Modelirovanie protsessov perevozki // Mir transporta. 2010. T. 8. № 5 (33). S. 48–55.
11. Kholodov Ya.A., Kholodov A.S., Gasnikov A.V., Morozov I.I., Tarasov V.N. Modelirovanie transportnykh potokov - aktual'nye problemy i puti ikh resheniya // Trudy MFTI (spetsial'nyj vypusk, posvyaschennyj matematicheskomu modelirovaniyu transportnykh potokov) / Pod red. akad. V.V. Kozlova. 2010. T. 2, №4(8). S. 152–162.
12. Leventhal T., Nemhauser G. L., Trotter L. Jr. A column generation algorithm for optimal traffic assignment // Transportation Science. 1973. №7. P. 168–176.
13. Daganzo C. F. Fundamentals of transportation and traffic operations. N.Y.: Elsevier Science Inc., 1997.
14. Kerner B. S. Congested Traffic Flow: Observations and Theory // Transportation Research Record. 1999. V. 1678. P. 160–167.
15. Kerner B. S. Theory of Congested Traffic Flow: Self-Organization without Bottlenecks // In: Transportation and Traffic Theory, edited by A. Ceder. London: Elsevier Science, 1999. P. 147–171.
16. Kerner B. S. Introduction to modern traffic flow theory and control. The long road to three-phase traffic theory. Springer, 2009.
17. Bar-Gera H. Origin-based algorithm for the traffic assignment problem // Transportation Science. 2002. V. 36, №4. P. 398–417.
18. Munoz J.C., Daganzo C. F. Traffic and Transportation Theory. Editor M. A. P. Taylor. Oxford: Pergamon, 2002. P. 441–462.
19. de Jong G., Gunn H.F., Walker W. National and international freight transport models: an overview and ideas for further development // Transport Reviews. 2004. Vol. 24. No. 1. P. 103-124.
20. Buslaev A. P., Gasnikov A. V., Yashina M. V. Selected mathematical problems of traffic flow theory // International Journal of Computer Mathematics. 2012. V. 89, №3. P. 409-432.
21. L.A. Beklaryan, N.K. Khachatryan. Traveling wave type solutions in dynamic transport models // Functional differential equations. 2006. V. 13, №12. P. 125-155.
22. Beklaryan L.A., N.K. Khachatryan. Ob odnom klasse dinamicheskikh modelej gruzoperevozok // Zhurnal vychislitel'noj matematiki i matematicheskoj fiziki. 2013. T.53, № 10. C. 1649-1667.
23. Khachatryan N.K, Akopov A.S. Model for organizing cargo transportation with an initial station of departure and a final station of cargo distribution // Business Informatics. 2017. No.1. P. 25-35.
24. Khachatryan N.K, Akopov A.S., Belousov F.A. About quasi-solutions of traveling wave type in models for organizing cargo transportation// Business Informatics, 2018, no. 1 (43), pp. 61–70.
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