OPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT
Hree variants of the dynamic model of a duopoly are considered. Here’s one of the stationary points is the Cournot point. We study the movement around these points and the optimal investment control in a linear approximation. The equations of dynamics of variables for equilibrium, developing and cri...
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Publishing House of the State University of Management
2018
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oai:doaj.org-article:0ba133089e2c4e32b92ab39f4cceb74c2021-12-03T07:43:26ZOPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT1816-42772686-841510.26425/1816-4277-2018-8-99-105https://doaj.org/article/0ba133089e2c4e32b92ab39f4cceb74c2018-08-01T00:00:00Zhttps://vestnik.guu.ru/jour/article/view/1121https://doaj.org/toc/1816-4277https://doaj.org/toc/2686-8415Hree variants of the dynamic model of a duopoly are considered. Here’s one of the stationary points is the Cournot point. We study the movement around these points and the optimal investment control in a linear approximation. The equations of dynamics of variables for equilibrium, developing and crisis markets in a linear approximation are obtained. A quasi-optimal Pareto maximization strategy for the vector prot criterion, using a linear convolution of the criteria along with the linearization of the dierential dynamics equations in the vicinity of the stationary points, is proposed.Y. AganinPublishing House of the State University of Managementarticleduopolydynamic modellinear approximationinvestmentoptimal controlSociology (General)HM401-1281Economics as a scienceHB71-74RUВестник университета, Vol 0, Iss 8, Pp 99-105 (2018) |
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DOAJ |
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DOAJ |
| language |
RU |
| topic |
duopoly dynamic model linear approximation investment optimal control Sociology (General) HM401-1281 Economics as a science HB71-74 |
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duopoly dynamic model linear approximation investment optimal control Sociology (General) HM401-1281 Economics as a science HB71-74 Y. Aganin OPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT |
| description |
Hree variants of the dynamic model of a duopoly are considered. Here’s one of the stationary points is the Cournot point. We study the movement around these points and the optimal investment control in a linear approximation. The equations of dynamics of variables for equilibrium, developing and crisis markets in a linear approximation are obtained. A quasi-optimal Pareto maximization strategy for the vector prot criterion, using a linear convolution of the criteria along with the linearization of the dierential dynamics equations in the vicinity of the stationary points, is proposed. |
| format |
article |
| author |
Y. Aganin |
| author_facet |
Y. Aganin |
| author_sort |
Y. Aganin |
| title |
OPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT |
| title_short |
OPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT |
| title_full |
OPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT |
| title_fullStr |
OPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT |
| title_full_unstemmed |
OPTIMAL CONTROL OF INVESTMENTS AROUND COURNOT POINT |
| title_sort |
optimal control of investments around cournot point |
| publisher |
Publishing House of the State University of Management |
| publishDate |
2018 |
| url |
https://doaj.org/article/0ba133089e2c4e32b92ab39f4cceb74c |
| work_keys_str_mv |
AT yaganin optimalcontrolofinvestmentsaroundcournotpoint |
| _version_ |
1718373612133548032 |