个人信息Personal Information
教授
博士生导师
硕士生导师
性别:男
毕业院校:大连理工大学
学位:博士
所在单位:力学与航空航天学院
学科:动力学与控制. 计算力学. 工程力学
电子邮箱:hjpeng@dlut.edu.cn
A novel extended precise integration method based on Fourier series expansion for periodic Riccati differential equations
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论文类型:期刊论文
发表时间:2017-11-01
发表刊物:OPTIMAL CONTROL APPLICATIONS & METHODS
收录刊物:SCIE、EI、Scopus
卷号:38
期号:6
页面范围:896-907
ISSN号:0143-2087
关键字:doubling algorithm; Fourier series expansion; periodic Riccati differential equation; periodic system; precise integration method
摘要:A new, reliable algorithm for nonnegative, stabilizing solutions for the periodic Riccati differential equation (PRDE) is proposed based on Fourier series expansion and the precise integration method (PIM). Taking full advantages of periodicity, we expand coefficient matrices of the underlying linear time-varying periodic Hamiltonian system associated with the PRDE in Fourier series, and a novel extended PIM for the transition matrix of linear time-varying periodic systems is developed by combining the doubling algorithm with the increment-storage technique. This method needs to compute the matrix exponential and its related integrals only once for all evenly divided subintervals, which greatly improves the computational efficiency. Further, by introducing the Riccati transformation, a fast recursive formula for the PRDE is derived based on the block form of the transition matrix computed by the extended PIM. Finally, two numerical examples are presented to verify the numerical accuracy and efficiency of the proposed algorithm with compared results.