Modelling the Dynamics of Social Protests: Mean-Field Gamesand Inverse Problems Full article
| Journal |
Differential Equations
ISSN: 0012-2661 , E-ISSN: 1608-3083 |
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| Output data | Year: 2025, Volume: 61, Number: 6, Pages: 917-936 Pages count : 20 DOI: 10.1134/s0012266125060096 | ||||
| Tags | mean-field game, social protest, coefficient inverse problem | ||||
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| Affiliations |
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Funding (1)
| 1 | Russian Science Foundation | 24-41-04004 |
Abstract:
In recent years, there has been an increase in social tension all over the world, which manifests itself in the form of social protests. Understanding the dynamics of street protests and studying the factors that can influence their occurrence, duration, and intensity is crucial for the stable and sustainable development of society. One approach to constructing various scenarios of social dynamics is to use the theory of mean-field games. A combined mathematical model of social protests based on the approach of mean-field games and dynamical systems is proposed. Numerical results of solving the inverse problem based on statistical data of the social movement in France in 2018–2019 are presented.
Cite:
Glukhov A.I.
, Shishlenin M.A.
, Trusov N.V.
Modelling the Dynamics of Social Protests: Mean-Field Gamesand Inverse Problems
Differential Equations. 2025. V.61. N6. P.917-936. DOI: 10.1134/s0012266125060096 OpenAlex
Modelling the Dynamics of Social Protests: Mean-Field Gamesand Inverse Problems
Differential Equations. 2025. V.61. N6. P.917-936. DOI: 10.1134/s0012266125060096 OpenAlex
Dates:
| Published online: | Oct 27, 2025 |
Identifiers:
| OpenAlex: | W4415589371 |
Citing:
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