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Optimal Control of Time-Delay Fractional Equations via a Joint Application of Radial Basis Functions and Collocation Method

Shubo Chen, Samaneh Soradi‐Zeid, Hadi Jahanshahi, Raúl Alcaraz, J. F. Gómez‐Aguilar, Stelios Bekiros, Yu‐Ming Chu

2020Entropy61 citationsDOIOpen Access PDF

Abstract

A novel approach to solve optimal control problems dealing simultaneously with fractional differential equations and time delay is proposed in this work. More precisely, a set of global radial basis functions are firstly used to approximate the states and control variables in the problem. Then, a collocation method is applied to convert the time-delay fractional optimal control problem to a nonlinear programming one. By solving the resulting challenge, the unknown coefficients of the original one will be finally obtained. In this way, the proposed strategy introduces a very tunable framework for direct trajectory optimization, according to the discretization procedure and the range of arbitrary nodes. The algorithm's performance has been analyzed for several non-trivial examples, and the obtained results have shown that this scheme is more accurate, robust, and efficient than most previous methods.

Topics & Concepts

Collocation (remote sensing)DiscretizationOptimal controlRadial basis functionMathematical optimizationNonlinear systemCollocation methodComputer scienceMathematicsSet (abstract data type)Basis (linear algebra)Range (aeronautics)Trajectory optimizationControl theory (sociology)Control (management)Differential equationOrdinary differential equationArtificial neural networkMathematical analysisMachine learningComposite materialMaterials scienceProgramming languageArtificial intelligenceGeometryPhysicsQuantum mechanicsFractional Differential Equations SolutionsAdvanced Control Systems DesignAdvanced Optimization Algorithms Research
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