employee
Krasnoyarsk, Krasnoyarsk, Russian Federation
UDK 53.043 физические
GRNTI 69.01 Общие вопросы рыбного хозяйства
OKSO 38.06.01 Экономика
BBK 472 Рыбное хозяйство
The paper considers a nonlinear phenomenon borrowed from the works of one of the world founders of the theory of catastrophes, Academician V.I. Arnold, which relates to the economic aspects of the fleet, where the features of transformations during the restructuring of the economic formation in Russia are thoroughly described. The correspondence of the one-product model of the restructuring of the economic formation in Russia is shown, which is not only a special case of the scientific, technical and socio –political world progress occurring in the form of waves of Kuznets and Kondratiev, but also the general cultural evolution of Mankind, as well as Russia's modern policy of restructuring its economy for import substitution and logistics chains, catastrophe multiple folds extending beyond 7 elemental catastrophes
instability, single-product mathematical model of economic formation transformation in Russia, import substitution, scientific– technical and socio–political world progress, Kuznets and Kondratiev waves, nonlinear phenomena, separatrix, above separatrix trajectory , Lagrangian and Hamiltonian of scientific – technical and socio –political world progress, logistics chains, cultural evolution Humanity, phase portrait, separatrix, catastrophes in the economy, catastrophe of the fold, catastrophe of the collection, catastrophe of the multiple fold
1. Arnold V.I. Mathematical methods of classical mechanics. - M.: Nauka, 1974. - 356 p.
2. Arnold V. I. Theory of catastrophes // Science and life. - 1989. - No. 10. - Pp. 12-20
3. Arnold V. I. Theory of catastrophes. 3rd ed., supplement - M.: Nauka, 1990. - 128 p.
4. Arnold V. I. What is mathematics? - M.: ICNMO, 2002. - 104 p.
5. Breker T. Differentiable sprouts and catastrophes / T. Breker, L. Lander - M.: Mir, 1977. - 244 p.
6. Gaidenok N.D. Determination of the drag coefficient of trawls by the hydraulic - mathematical method // Fisheries. - 2021a. - No. 2. - From 70-76. DOIhttps://doi.org/10.37663/0131-6184-2021-2-90-98
7. Gaidenok N.D. On the use of geometry and mechanical features in the algorithm for calculating the propellers of ship propellers // Fisheries. - 2021b. - No. 4. - Pp. 70-76.
8. Gaidenok N.D. Nonlinear physics in fleet practice - energy recovery at a standstill. Part 2. // Fisheries. - 2022a. - No. 2. - Pp. 70-76.
9. Gaidenok N.D. Nonlinear physics in fleet practice - energy recovery at standstill. Part 3. // Fisheries. - 2022b. - No. 3. - Pp. 106-110.
10. Gumilev L.N. Ethnogenesis and the biosphere of the Earth - M.: Nauka, 1977. - 540 p.
11. Zaslavsky G.M. Introduction to nonlinear physics: from the pendulum to turbulence and chaos / G.M. Zaslavsky, Sagdeev- M.: Nauka, 1988 - 308 p.
12. Ivanilov Yu.P. Mathematical models in economics / Yu.P. Ivanilov, A.V. Lotov - M.: Nauka, 1979 - 304 p.
13. Poston G., Stewart I. The theory of catastrophes and its applications // Persian from English / G. Po-ston, I. Stewart - M.: Mir, 1980 - 608 p.
14. Ebeling V., Engel A., Feistel R. Physics of evolution processes// trans. from German / V. Ebeling, A. Engel, R. Feistel - M.: Editorial URSS, 2001. - 328 p.
15. Wilson H. R., Cowan J. D. Excitatory and inhibitory interactions in localized populations of model neurons. - Biophysical Journal, 1972. - 12. - p. 1.
