Standard
Study of the equilibrium of labor resources in differential games of supporting the projects' joint investment processes. / Malafeyev, Oleg; Zaitseva, Irina; Lovyannikov, Denis; Kostyukov, Konstantin; Svechinskaya, Tatiana.
Proceedings of the International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019. ред. / Theodore E. Simos; Theodore E. Simos; Theodore E. Simos; Zacharoula Kalogiratou; Theodore Monovasilis. American Institute of Physics, 2019. 170015 (AIP Conference Proceedings; Том 2186).
Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференций › статья в сборнике материалов конференции › научная › Рецензирование
Harvard
Malafeyev, O, Zaitseva, I, Lovyannikov, D, Kostyukov, K & Svechinskaya, T 2019,
Study of the equilibrium of labor resources in differential games of supporting the projects' joint investment processes. в TE Simos, TE Simos, TE Simos, Z Kalogiratou & T Monovasilis (ред.),
Proceedings of the International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019., 170015, AIP Conference Proceedings, Том. 2186, American Institute of Physics, International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019, Rhodes, Греция,
1/05/19.
https://doi.org/10.1063/1.5138094
APA
Malafeyev, O., Zaitseva, I., Lovyannikov, D., Kostyukov, K., & Svechinskaya, T. (2019).
Study of the equilibrium of labor resources in differential games of supporting the projects' joint investment processes. в T. E. Simos, T. E. Simos, T. E. Simos, Z. Kalogiratou, & T. Monovasilis (Ред.),
Proceedings of the International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019 [170015] (AIP Conference Proceedings; Том 2186). American Institute of Physics.
https://doi.org/10.1063/1.5138094
Vancouver
Malafeyev O, Zaitseva I, Lovyannikov D, Kostyukov K, Svechinskaya T.
Study of the equilibrium of labor resources in differential games of supporting the projects' joint investment processes. в Simos TE, Simos TE, Simos TE, Kalogiratou Z, Monovasilis T, Редакторы, Proceedings of the International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019. American Institute of Physics. 2019. 170015. (AIP Conference Proceedings).
https://doi.org/10.1063/1.5138094
Author
BibTeX
@inproceedings{839b952607934f3bb64a4a9819c21510,
title = "Study of the equilibrium of labor resources in differential games of supporting the projects' joint investment processes",
abstract = "The article presents a mathematical model for the study of the equilibrium of labor resources. The problem of finding a sufficient equilibrium condition in differential games with many participants is solved. The article deals with a differential game of X persons with terminal gain, and sufficient conditions are derived in the class of positional strategies. The task is to find a sufficient equilibrium condition. The results obtained are adjacent to the results of [1,2,5], in which sufficient optimality conditions for optimal control problems and antagonistic differential games are stated.",
author = "Oleg Malafeyev and Irina Zaitseva and Denis Lovyannikov and Konstantin Kostyukov and Tatiana Svechinskaya",
year = "2019",
month = dec,
day = "10",
doi = "10.1063/1.5138094",
language = "English",
series = "AIP Conference Proceedings",
publisher = "American Institute of Physics",
editor = "Simos, {Theodore E.} and Simos, {Theodore E.} and Simos, {Theodore E.} and Zacharoula Kalogiratou and Theodore Monovasilis",
booktitle = "Proceedings of the International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019",
address = "United States",
note = "International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019 ; Conference date: 01-05-2019 Through 05-05-2019",
}
RIS
TY - GEN
T1 - Study of the equilibrium of labor resources in differential games of supporting the projects' joint investment processes
AU - Malafeyev, Oleg
AU - Zaitseva, Irina
AU - Lovyannikov, Denis
AU - Kostyukov, Konstantin
AU - Svechinskaya, Tatiana
PY - 2019/12/10
Y1 - 2019/12/10
N2 - The article presents a mathematical model for the study of the equilibrium of labor resources. The problem of finding a sufficient equilibrium condition in differential games with many participants is solved. The article deals with a differential game of X persons with terminal gain, and sufficient conditions are derived in the class of positional strategies. The task is to find a sufficient equilibrium condition. The results obtained are adjacent to the results of [1,2,5], in which sufficient optimality conditions for optimal control problems and antagonistic differential games are stated.
AB - The article presents a mathematical model for the study of the equilibrium of labor resources. The problem of finding a sufficient equilibrium condition in differential games with many participants is solved. The article deals with a differential game of X persons with terminal gain, and sufficient conditions are derived in the class of positional strategies. The task is to find a sufficient equilibrium condition. The results obtained are adjacent to the results of [1,2,5], in which sufficient optimality conditions for optimal control problems and antagonistic differential games are stated.
UR - http://www.scopus.com/inward/record.url?scp=85076755148&partnerID=8YFLogxK
U2 - 10.1063/1.5138094
DO - 10.1063/1.5138094
M3 - Conference contribution
AN - SCOPUS:85076755148
T3 - AIP Conference Proceedings
BT - Proceedings of the International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019
A2 - Simos, Theodore E.
A2 - Simos, Theodore E.
A2 - Simos, Theodore E.
A2 - Kalogiratou, Zacharoula
A2 - Monovasilis, Theodore
PB - American Institute of Physics
T2 - International Conference of Computational Methods in Sciences and Engineering 2019, ICCMSE 2019
Y2 - 1 May 2019 through 5 May 2019
ER -
