Title :
Theoretical properties of the “Caterpillar” method of time series analysis
Author :
Nekrutkin, Vladimir
Author_Institution :
Dept. of Math., St. Petersburg Univ., Russia
Abstract :
The article is devoted to the mathematical theory of the “Caterpillar” method which has proved to be a very powerful tool of time series analysis. This method is based on the use of the principal component analysis technique applied to a multivariate sample which is obtained from the initial sample by the method of delays. A natural language used to analyse the method is the Hilbert-Schmidt operator theory. We give conditions when two deterministic functions are completely separated from each other for a finite period of observations. We also show that under mild conditions any deterministic function can be asymptotically separated from any ergodic random noise
Keywords :
Hilbert spaces; delays; natural languages; random noise; signal sampling; time series; Caterpillar method; Hilbert space; Hilbert-Schmidt operator theory; deterministic function; deterministic functions; ergodic random noise; finite observation period; mathematical theory; method of delays; multivariate sample; natural language; principal component analysis; time series analysis; Covariance matrix; Delay effects; Hilbert space; Mathematics; Natural languages; Parametric statistics; Principal component analysis; Regression analysis; Time series analysis;
Conference_Titel :
Statistical Signal and Array Processing, 1996. Proceedings., 8th IEEE Signal Processing Workshop on (Cat. No.96TB10004
Conference_Location :
Corfu
Print_ISBN :
0-8186-7576-4
DOI :
10.1109/SSAP.1996.534899
