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Evaluation of disposal techniques for electronic circuit board waste based on fuzzy multi-criteria decision analysis. [PDF]
Sci RepIjaz B +6 more
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Autonomous optimal control problems
Reports on Mathematical Physics, 2003zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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2015
Pontryagin (1962) and his associates developed the maximum principle for solving continuous-time control problems. Basically, the maximum (or minimum) principle provides a set of local necessary conditions for optimality. According to this method, variables analogous to the Lagrange multipliers should be introduced.
Dipak Basu, Victoria Miroshnik
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Pontryagin (1962) and his associates developed the maximum principle for solving continuous-time control problems. Basically, the maximum (or minimum) principle provides a set of local necessary conditions for optimality. According to this method, variables analogous to the Lagrange multipliers should be introduced.
Dipak Basu, Victoria Miroshnik
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2019
We consider discrete-time stochastic optimal control problems over a finite number of decision stages in which several controllers share different information and aim at minimizing a common cost functional. This organization can be described within the framework of “team theory.” Unlike the classical optimal control problems, linear-quadratic-Gaussian ...
Riccardo Zoppoli +3 more
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We consider discrete-time stochastic optimal control problems over a finite number of decision stages in which several controllers share different information and aim at minimizing a common cost functional. This organization can be described within the framework of “team theory.” Unlike the classical optimal control problems, linear-quadratic-Gaussian ...
Riccardo Zoppoli +3 more
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1997
In the present section we study optimization problems for elastic plates with obstacles. An optimal distribution of external forces is attained via the minimization of a functional which depends on the plate displacement. Therefore, the right-hand side of the variational inequality describing the displacement of an elastic plate with an obstacle loaded
A. M. Khludnev, J. Sokolowski
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In the present section we study optimization problems for elastic plates with obstacles. An optimal distribution of external forces is attained via the minimization of a functional which depends on the plate displacement. Therefore, the right-hand side of the variational inequality describing the displacement of an elastic plate with an obstacle loaded
A. M. Khludnev, J. Sokolowski
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OPTIMAL CONTROL ON RELIABILITY PROBLEMS
Far East Journal of Dynamical Systems, 2018Summary: Our basic problem is that of an optimal control whose Bolza payoff is the sum between a simple integral and a function of the initial and final events whose evolution ODE is a reliability flow. The original results include: (i) a list of payoffs with reliability sense, (ii) optimal value of mean time to failure functional constrained by ...
Udrişte, Constantin +2 more
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2004
Consider a control system of the form $$\dot q = fu(q),q \in M,u \in U \subset {R^m}.$$ (10.1) Here M is, as usual, a smooth manifold, and U an arbitrary subset of ℝm. For the right-hand side of the control system, we suppose that: $$q \mapsto fu(q)$$ (10.2) is a smooth vector field on M for any fixed u ∈ U, $$(q,u) \mapsto {f_u}
Andrei A. Agrachev, Yuri L. Sachkov
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Consider a control system of the form $$\dot q = fu(q),q \in M,u \in U \subset {R^m}.$$ (10.1) Here M is, as usual, a smooth manifold, and U an arbitrary subset of ℝm. For the right-hand side of the control system, we suppose that: $$q \mapsto fu(q)$$ (10.2) is a smooth vector field on M for any fixed u ∈ U, $$(q,u) \mapsto {f_u}
Andrei A. Agrachev, Yuri L. Sachkov
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