Solving Optimal Control Problems by using Hermite polynomials

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Ayat Ollah; Mirnia Mirkamal

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Journal: Computational Methods for Differential Equations Year:2020 | Volume:8 | Issue:2 Page(s): 314-329

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Title

Solving Optimal Control Problems by using Hermite polynomials

Author(s)

Ayat Ollah | Mirnia Mirkamal | Issue Writer Certificate

Keywords

Optimal control

Hermite polynomials

Best approximating

Operational matrix of derivative

Abstract

In this paper, one numerical method is presented for numerical approximation of linear constrained Optimal control problems with quadratic performance index. The method with variable coefficients is based on Hermite polynomials. The properties of Hermite polynomials with the operational matrices of derivative are used to reduce Optimal control problems to the solution of linear algebraic equations. Illustrative examples are included to demonstrate the validity and applicability of the technique.

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APA: Copy

, Ayat Ollah, & Mirnia, Mirkamal. (2020). Solving Optimal Control Problems by using Hermite polynomials. COMPUTATIONAL METHODS FOR DIFFERENTIAL EQUATIONS, 8(2), 314-329. SID. https://sid.ir/paper/345744/en

Vancouver: Copy

Ayat Ollah, Mirnia Mirkamal. Solving Optimal Control Problems by using Hermite polynomials. COMPUTATIONAL METHODS FOR DIFFERENTIAL EQUATIONS[Internet]. 2020;8(2):314-329. Available from: https://sid.ir/paper/345744/en

IEEE: Copy

Ayat Ollah , and Mirkamal Mirnia, “Solving Optimal Control Problems by using Hermite polynomials,” COMPUTATIONAL METHODS FOR DIFFERENTIAL EQUATIONS, vol. 8, no. 2, pp. 314–329, 2020, [Online]. Available: https://sid.ir/paper/345744/en

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