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An Efficient Legendre Pseudospectral Method for Solving Nonlinear Quasi Bang-Bang Optimal Control Problems - MaRDI portal

An Efficient Legendre Pseudospectral Method for Solving Nonlinear Quasi Bang-Bang Optimal Control Problems

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Publication:2867291

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DOI10.2478/v10294-012-0016-0zbMath1277.65104OpenAlexW2091426366MaRDI QIDQ2867291

Somayyeh Lotfi Noghabi, Emran Tohidi

Publication date: 11 December 2013

Published in: Journal of Applied Mathematics, Statistics and Informatics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.2478/v10294-012-0016-0

zbMATH Keywords

numerical methods pseudospectral Legendre method switching point quasi bang-bang optimal control

Mathematics Subject Classification ID

Nonlinear programming (90C30) Linear programming (90C05) Spectral, collocation and related methods for boundary value problems involving PDEs (65N35) Linear systems in control theory (93C05) Existence theories for optimal control problems involving ordinary differential equations (49J15) Discrete approximations in optimal control (49M25)

Related Items (10)

Exponential convergence of the \textit{hp}-version of the composite Gauss-Legendre quadrature for integrals with endpoint singularities ⋮ A directed tabu search method for solving controlled Volterra integral equations ⋮ A high-order discontinuous Galerkin method with mesh refinement for optimal control ⋮ A numerical method for solving a nonlinear 2-D optimal control problem with the classical diffusion equation ⋮ Constructing frozen Jacobian iterative methods for solving systems of nonlinear equations, associated with ODEs and PDEs using the homotopy method ⋮ Solving systems of nonlinear equations when the nonlinearity is expensive ⋮ Frozen Jacobian multistep iterative method for solving nonlinear IVPs and BVPs ⋮ An eighth order frozen Jacobian iterative method for solving nonlinear IVPs and BVPs ⋮ Generalized newton multi-step iterative methods GMN_p,m for solving system of nonlinear equations ⋮ A parameterized multi-step Newton method for solving systems of nonlinear equations

Uses Software

Matlab

Cites Work

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