Title of article
Direct solution of nonlinear optimal control problems using quasilinearization and Chebyshev polynomials
Author/Authors
Hussein Jaddu، نويسنده , , Hussein، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2002
Pages
20
From page
479
To page
498
Abstract
In this paper, a numerical method to solve nonlinear optimal control problems with terminal state constraints, control inequality constraints and simple bounds on the state variables, is presented. The method converts the optimal control problem into a sequence of quadratic programming problems. To this end, the quasilinearization method is used to replace the nonlinear optimal control problem with a sequence of constrained linear-quadratic optimal control problems, then each of the state variables is approximated by a finite length Chebyshev series with unknown parameters. The method gives the information of the quadratic programming problem explicitly (The Hessian, the gradient of the cost function and the Jacobian of the constraints). To show the effectiveness of the proposed method, the simulation results of two constrained nonlinear optimal control problems are presented.
Keywords
Constrained nonlinear optimal control problem , quadratic programming , direct method , Chebyshev polynomials
Journal title
Journal of the Franklin Institute
Serial Year
2002
Journal title
Journal of the Franklin Institute
Record number
1542683
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