Fractional optimal control problems with both integer-order and Atangana-Baleanu Caputo derivatives
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Publication:6583477
DOI10.1002/asjc.3127MaRDI QIDQ6583477
Song Liu, Xiaoyan Li, Xiao-Wen Zhao, Xiangxiang Ma
Publication date: 6 August 2024
Published in: Asian Journal of Control (Search for Journal in Brave)
collocation methodfractional optimal control problemshifted Legendre polynomialAtangana-Baleanu Caputo derivative
Cites Work
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- Spectral homotopy analysis method and its convergence for solving a class of nonlinear optimal control problems
- A numerical technique for solving fractional optimal control problems
- The Pontryagin maximum principle for nonlinear optimal control problems with infinite horizon
- A new formulation of the fractional optimal control problems involving Mittag-Leffler nonsingular kernel
- Global attractiveness and consensus for Riemann-Liouville's nonlinear fractional systems with mixed time-delays
- A new approach for solving integro-differential equations of variable order
- Optimal control of nonlinear systems with dynamic programming
- A nonlinear optimal control approach for tracked mobile robots
- Existence and uniqueness results for a nonlinear Caputo fractional boundary value problem on a star graph
- A Bessel collocation method for solving fractional optimal control problems
- A necessary condition of optimality for uncertain optimal control problem
- An Efficient Numerical Scheme for Solving Multi-Dimensional Fractional Optimal Control Problems With a Quadratic Performance Index
- A Central Difference Numerical Scheme for Fractional Optimal Control Problems
- An iterative approach for solving fractional optimal control problems
- Integration by parts and its applications of a new nonlocal fractional derivative with Mittag-Leffler nonsingular kernel
- Optimal control problems with Atangana‐Baleanu fractional derivative
- An approach based on Haar wavelet for the approximation of fractional calculus with application to initial and boundary value problems
- A new class of orthonormal basis functions: application for fractional optimal control problems
- Solving fractional optimal control problems within a Chebyshev–Legendre operational technique
- Spectral Methods
- Convex functions and their applications. A contemporary approach
- Containment control for fractional‐order multi‐agent systems with mixed time delays
- On the fractional optimal control problems with a general derivative operator
- Legendre wavelet method for solving variable-order nonlinear fractional optimal control problems with variable-order fractional Bolza cost
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