biorthogonal cubic hermite spline multiwavelets on the interval for solving the fractional optimal control problems
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abstract
in this paper, a new numerical method for solving fractional optimal control problems (focps) is presented. the fractional derivative in the dynamic system is described in the caputo sense. the method is based upon biorthogonal cubic hermite spline multiwavelets approxima-tions. the properties of biorthogonal multiwavelets are first given. the operational matrix of fractional riemann-lioville integration and multiplication are then utilized to reduce the given optimization problem to the system of algebraic equations. in order to save memory requirement and computational time, a threshold procedure is applied to obtain algebraicequations. illustrative examples are provided to confirm the applicability of the new method.
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Journal title:
computational methods for differential equationsجلد ۴، شماره ۲، صفحات ۹۹-۱۱۵
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