![]() ![]() The expected scientific results will be published and presented at various prestigious scientific forums. The considered models, methods and algorithms will be used for the analysis of the growth economic models, solving the problems of solid body and gas mechanics, the diffusion problems and queuing theory problems. investigations of the problems of solid body and the fluid mechanics to obtain there efficient solutions.investigations of finite velocity diffusion processes and finding the characteristic functions for such processes This paper is about operator-theoretic methods for solving nonlinear stochastic optimal control problems to global optimality.finding the stationary and non-stationary Nash equilibrium for stochastic positional games and Shapley stochastic games.obtaining the necessary and sufficient conditions for the existence of stationary and non-stationary solutions in the sense of Pareto, Nash and Stackelberg for the multi-criteria and game variants of Markov decision problems with average and total discounted cost optimization criteria.finding of the optimal stationary and non-stationary strategies for the deterministic and stochastic discrete optimal control problems.The main results of the project are related to the following elaborations: The idea is that price action will tend to. probability distribution of such a process tends with time to. The considered problems comprise the classical discrete optimal control problems, Markov decision problems the variants of multi-criteria and game theory Markov decision processes, diffusion and queuing theory problems and some classes of solid bodies and gas mechanics problems. The stochastic indicator is classified as an oscillator, a term used in technical analysis to describe a tool that creates bands around some mean level. A wide class of stochastic processes, called regenerative, is defined, and it is shown that. The investigations in the project are concerned with the elaboration and theoretical argumentation of methods and numerical algorithms for solving the optimization and control problems for deterministic and stochastic systems with finite and infinite time horizon. Raport științific 2020 Raport științific 2021 Raport științific 2022 Vladimir Andrunachievici Institute of Mathematics and Computer Science ![]()
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