Development of a mathematical model of conflict between the parties in the implementation of the offset transaction
DOI:
https://doi.org/10.15587/2706-5448.2020.201260Keywords:
humanism, agreement compensation, stochastic system, conflict theory, offset policy, managed process, Markov process.Abstract
The object of research of this work is the conflict of interests of the parties in the implementation of offset agreements. One of the most problematic places when implementing offset agreements is that a wide variety of sudden events, force majeure circumstances, etc. can take place – phenomena that can’t be described in detail and predicted with acceptable accuracy in full. In addition, the offset contract is a conflict of interest between the seller and the buyer. During the study, the methods of the humanitarian and natural-scientific approach are used, thanks to which the conflict was given a new interpretation. It is considered as a way of interaction of complex systems. It is shown that the conflict is not a synonym for confrontation, but a way to overcome contradictions and limitations, a way of interaction of complex systems is an inevitable, normal phenomenon. Of course, conflict involves struggle, but, above all, conflict involves interaction. It is shown that the conflict can’t be considered as an optimization task, since with equal resources of the parties, the conflict will be terminated due to the complete depletion of both sides, and with unequal resources, the defeat of the weaker side with a probability of one. Also, the conflict can’t be resolved within the framework of the theory of adaptation. A brief comparative analysis of the possibilities of using varieties of Markov processes and the degree of their adequacy to the real processes of supporting offset transactions at different stages is carried out. A mathematical model of the conflict between the parties is proposed. In the model, the process of conflict development is a branched semi-Markov process, the transitional and final probabilities of which depend on the ratio of resources of the parties. In addition, the conflict represents a sequence of concerted actions of the parties and, in fact, is a controllable quasiperiodic process with elements of stochasticity. The resulting winnings of the parties to the conflict are investigated with varieties of their cooperation and rivalry. The proposed model can be used to model the processes of development and implementation of offset programs and the wins of the parties.
References
- Chepkov, I. B., Zubariev, V. V., Smirnov, V. O. et. al. (2017). Teoriia ozbroiennia. Naukovo-tekhnichni problemy ta zavdannia. Vol. 5. Voienno-tekhnichna polityka Ukrainy: formuvannia, stan ta shliakhy udoskonalennia. Kyiv: V. D. Dmytra Buraho, 448.
- Behma, V. M., Mokliak, S. P., Sverhunov, O. O., Tolochnyi, Yu. V.; Behma, V. M. (Ed.) (2011). Ofsetna polityka derzhav v umovakh hlobalizatsii. Otsinky ta prohnozy. Kyiv: NISD, 352.
- Smith, A. (2011). The Theory of Moral Sentiments. Reprint of 1790 London Edition Gutenberg Publishers, 538.
- Kubiv, S., Balanyuk, Y. (2020). Research of the influence of humanomics on the economic effect of compensation agreements. Technology Audit and Production Reserves, 1 (4 (51)), 51–54. doi: http://doi.org/10.15587/2312-8372.2020.197023
- Shemaiev, V. M. (2014). Ofsetna polityka u sferi mizhnarodnoho voienno-ekonomichnoho spivrobitnytstva Ukrainy. Fynansi, uchet, banky, 1 (20), 277–284.
- Maslov, O. (2008). Mirovoi krizis v svete fenomenov novoi real'nosti i global'nye protivorechiya, trebuyushchie razresheniya. Available at: http://www.polit.nnov.ru/2008/04/21/newrealgate
- Saaty, T. L. (1968). Mathematical Models of Arms Control and Disarmament: Applications of Mathematical Structures in Politics. New York: John Wiley & Sons, Inc., 190.
- Druzhinin, V. V., Kontorov, D. S. (1983). Osnovy voennoi sistemotekhniki. Moscow: Izd. Voisk protivovozdushnoi oborony, 416.
- Wentzel, E. S. (1983). Operations Research: a Methodological Approach. Moscow: Mir Publishers, 264.
- El'sgol'ts, L. E., Norkin, S. B. (1973). Introduction to the Theory and Application of Differential Equations with Deviating Arguments, Vol. 105. Academic Press, 356.
- Kazakov, I. E. (1977). Statisticheskaya dinamika sistem s peremennoi strukturoi. Moscow: Nauka, 416.
- Afifi, A. A., Azen, S. P. (1979). Statistical Analysis, Second Edition: A Computer Oriented Approach 2nd Edition. Academic Press, 442.
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