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Numerical solution of nonlinear fractional optimal control problems using generalized Bernoulli polynomials

Hossein Hassani, J. A. Tenreiro Machado, Mohammad Kazem Hosseini Asl, Mohammad Shafi Dahaghin

2021Optimal Control Applications and Methods17 citationsDOI

Abstract

Abstract This article introduces a new class of basis functions, namely, the generalized Bernoulli polynomials (GBP). The GBP are adopted for solving nonlinear fractional optimal control problems (NFOCP) generated by nonlinear fractional dynamical systems (NFDS) and boundary conditions (BC). The corresponding operational matrices (OM) of fractional derivatives (FD) expand the solution of the problem in terms of the GBP. The method transforms the NFOCP into systems of nonlinear algebraic equations. First, the state and control variables are approximated by the GBP with unknown coefficients and parameters and substituted in the objective function, NFDS and BC. Then, the Gaussian quadrature rule and the OM of FD allow the formulation of a constrained problem, which is solved using Lagrange multipliers. The accuracy of the method is tested by means of several examples and the results confirm its good performance.

Topics & Concepts

MathematicsNonlinear systemApplied mathematicsFractional calculusAlgebraic equationBernoulli's principleOptimal controlAlgebraic numberBernoulli polynomialsBoundary value problemMathematical analysisOrthogonal polynomialsMathematical optimizationClassical orthogonal polynomialsQuantum mechanicsPhysicsEngineeringAerospace engineeringFractional Differential Equations SolutionsAdvanced Control Systems DesignAdvanced Optimization Algorithms Research