Title :
A class of integrable riccati equations and applications to optimal control
Author_Institution :
Sch. of Math. & Phys., North China Electr. Power Univ., Beijing, China
Abstract :
In this paper, based on the theory of Lie group and the Hamilton-Jacobi Theorem, the solution of the second-order linear homogeneous equations which can be obtained from a class of Riccati equations by transformation are considered. By solving the corresponding Hamilton-Jacobi equations, a class of integrable Riccati differential equations is obtained. Finally, the classical optimal control problem with finite time be considered, and a class of systems for the optimal control problem is solved by using the proposed method to solving the corresponding Riccati equations.
Keywords :
Jacobian matrices; Riccati equations; differential equations; optimal control; Hamilton-Jacobi theorem; Lie group; Riccati differential equations; integrable Riccati equations; optimal control; second-order linear homogeneous equations; Algebra; Differential algebraic equations; Differential equations; Mathematics; Optimal control; Partial differential equations; Physics; Riccati equations; Transforms; Hamilton-Jacobi Theorem; Lie Group; Riccati Equation;
Conference_Titel :
Control and Decision Conference (CCDC), 2010 Chinese
Conference_Location :
Xuzhou
Print_ISBN :
978-1-4244-5181-4
Electronic_ISBN :
978-1-4244-5182-1
DOI :
10.1109/CCDC.2010.5498520
