A Hybrid Model Based on Wavelet Decomposition-Reconstruction in Track Irregularity State Forecasting release_z5cy2tvjtnerniis4ylvjy2nfa

by Chaolong Jia, Lili Wei, Hanning Wang, Jiulin Yang

Published in Mathematical Problems in Engineering by Hindawi Limited.

2015   Volume 2015, p1-13

Abstract

Wavelet is able to adapt to the requirements of time-frequency signal analysis automatically and can focus on any details of the signal and then decompose the function into the representation of a series of simple basis functions. It is of theoretical and practical significance. Therefore, this paper does subdivision on track irregularity time series based on the idea of wavelet decomposition-reconstruction and tries to find the best fitting forecast model of detail signal and approximate signal obtained through track irregularity time series wavelet decomposition, respectively. On this ideology, piecewise gray-ARMA recursive based on wavelet decomposition and reconstruction (PG-ARMARWDR) and piecewise ANN-ARMA recursive based on wavelet decomposition and reconstruction (PANN-ARMARWDR) models are proposed. Comparison and analysis of two models have shown that both these models can achieve higher accuracy.
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