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|Title||Solving Optimal Linear Time-Variant Systems via Chebyshev Wavelet|
Over the last four decades, optimal control problem are solved using direct and indirect methods. Direct methods are based on using polynomials to represent the optimal problem. Direct methods can be implemented using either discretization or parameterization. The proposed method here is considered as a direct method in which the optimal control problem is directly converted into a mathematical programming problem. A wavelet-based method is presented to solve the linear quadratic optimal control problem. The Chebyshev wavelets functions are used as the basis functions. Numerical examples are presented to show the effectiveness of the method, several optimal control problems were solved, and the simulation results show that the proposed method gives good and comparable results with some other methods.
|Published in||International Journal of Computational Engineering Research|
|Series||Volume: 3, Number: 4|
|Item link||Item Link|
|Files in this item|
|Elaydi, Hatem A._69.pdf||514.7Kb|