A chaotic time series forecasting model based on parameters simultaneous optimization algorithm

被引：0

作者：

Xiang, Changsheng ^{[1
]}

Qu, Peixin ^{[2
]}

Qu, Xilong ^{[1
]}

机构：

[1] Department of Computer and Communication, Hunan Institute of Engineering

[2] School of Information and Engineering, Henan Institute of Science and Technology

来源：

Journal of Information and Computational Science | 2013年 / 10卷 / 15期

关键词：

Least square support vector machine; Optimization; Time series forecasting; Uniform design;

D O I：

10.12733/jics20102200

中图分类号：

学科分类号：

摘要：

Phase space reconstruction and parameters optimization were two key steps in the chaotic time series forecasting model, and tradition models could not get the optimal forecasting results without considering the relationship between the two steps. In order to improve forecasting accuracy of the chaotic time series, a chaotic time series forecasting model based on parameters simultaneous optimization was proposed. Firstly, the parameters were analyzed and designed based on uniform design, and then parameters were optimized by self-calling least square support vector machine, finally, the optimal forecasting model of chaotic time series is established, and the simulation experiment was carried out on by two chaotic time series. The simulation results show that the proposed model had improved the forecasting accuracy and computational complexity is much lower compared with the traditional models. Parameters simultaneous optimization algorithm has provided a new way to solve the parameters optimization problem of chaotic time series forecasting model. © 2013 Binary Information Press.

引用

页码：4917 / 4930

页数：13

共 20 条

[1]

Li S., Liu L., Gu C., Comparative study on forecasting models for chaotic time series, Computer Engineering and Applications, 45, 32, pp. 53-56, (2009)

[2]

Chen R., Yu J., Soft sensor modeling based on particle swarm optimization and least squares support vector machines, Journal of System Simulation, 19, 22, pp. 5307-5310, (2007)

[3]

Xiu C., Liu X., Zhang Y., Selection of embedding dimension and delay time in the phase space reconstruction, Transactions of Beijing Institute of Technology, 24, 2, pp. 219-225, (2003)

[4]

Liu S., Zhu S., Yu X., Study on phase space reconstruction optimization, Journal of Data Acquisition and Processing, 23, 1, pp. 65-69, (2008)

[5]

Ma Q., Zheng Q., Peng H., Et al., Study on the spatial parameters selection of chaotic time series reconstruction, Physica D, 59, 3, pp. 1576-1582, (2010)

[6]

Ma H., Li X., Wang G., Et al., Selection of embedding dimension and delay time in phase space reconstruction, Journal of Xi'an Jiaotong University, 38, 4, pp. 33-338, (2004)

[7]

Kim H.S., Eykholt R., Salas J.D., Nonlinear dynamics, delay times, and embedding windows, Physica D, 27, 1, pp. 48-60, (1999)

[8]

Xiang C., Zhou Z., Wu L., Study on the support vector machines model of grain production forecasting, Journal of Hunan Agricultural University (Social Sciences), 11, 1, pp. 6-10, (2010)

[9]

Dong C., Method for selecting the parameters of support vector machines, Systems Engineering and Electronics, 26, 8, pp. 1117-1120, (2004)

[10]

Zhang W., Hu C., Jiao L., Bo L., Least square support vector machine based on parameters optimization of clone programming-cross validation and inertial component forecasting, Journal of Xidian University (Natural Science), 34, 3, pp. 428-432, (2007)

← 1 2 →