Udc 17. 977+644. Bashkir State University, Republic of Bashkortostan
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- Antipina, S. I. Mustafina, A. F. Antipin, S. A. Mustafina Introduction.
UDC 517.977+644.4 Bashkir State University, Republic of Bashkortostan, 450075 Ufa, ul. Zaki Validi, 32 E-mail: stepashinaev@ya.ru An algorithm for solving the optimal control problem with terminal constraints is developed. A statement of the optimal control problem with terminal constraints and constraints on the control parameter is given. A numerical algorithm for solving the formulated problem based on the penalty method and genetic algorithms is described. A computational experiment was carried out for the reaction of obtaining phthalic anhydride in order to achieve the maximum yield of the reaction product in the presence of terminal restrictions. Optimal temperature conditions and optimal concentrations of reagents have been obtained. Keywords: optimal control problem, terminal constraints, method 132 fines, genetic algorithms, phthalic anhydride production reaction. AUTOMETRY. 2020. V. 56, No. 6 DOI: 10.15372/AUT20200615 c E. V. Antipina, S. I. Mustafina, A. F. Antipin, S. A. Mustafina Introduction. Currently, among the problems of mathematical modeling of dynamic systems, optimal control problems are of the greatest practical interest, in which restrictions can be imposed not only on control parameters, but also on phase variables. If the constraints on the phase variables are given at the final time of the system operation, then such a problem is a problem with terminal constraints. These include problems of transferring a controlled system from the initial point to the final one, boundary extremal problems, etc. In addition, problems with phase constraints can be reduced to optimal control problems with terminal constraints by applying mathematical reductions [1]. The presence of restrictions on phase variables complicates the solution of optimal problems both in the theoretical study of the properties of optimal processes and in the implementation of numerical solution algorithms. Therefore, the development of methods and algorithms for solving this problem is an urgent problem and is of scientific and practical interest. One of the approaches to solving this class of problems consists in obtaining exact necessary optimality conditions and constructing computational procedures on their basis [2, 3]. However, such computational procedures are rather laborious and difficult to apply [4]. Another approach involves reducing a problem with constraints on phase variables to a problem without constraints using the penalty method [5]. In this method, an auxiliary function is introduced into consideration by adding a penalty for violating the constraints imposed on the phase variables to the control quality criterion of the original problem. Then the problem of optimal control without restrictions is solved, where the constructed auxiliary function acts as a control quality criterion. Download 338.38 Kb. Do'stlaringiz bilan baham: |
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