Title :
On universal linear prediction of Gaussian data
Author :
Kozat, Suleyman S. ; Singer, Andrew C.
Author_Institution :
Coordinated Sci. Lab., Illinois Univ., Urbana, IL, USA
Abstract :
In this paper, we derive some of the stochastic properties of a universal linear predictor, through analyses similar to those generally made in the adaptive signal processing literature. A. C. Singer et al. (see IEEE Trans. Signal Proc., vol.47, no.10, p.2685-2700, Oct. 1999) introduced a predictor whose sequentially accumulated mean squared error for any bounded individual sequence was shown to be as small as that for any linear predictor of order less than some maximum order m. For stationary Gaussian time series, we generalize these results, and remove the boundedness restriction. In this paper we show that the learning curve of this universal linear predictor is dominated by the learning curve of the best order predictor used in the algorithm
Keywords :
Gaussian processes; adaptive signal processing; convergence of numerical methods; mean square error methods; prediction theory; time series; Gaussian data; adaptive signal processing; bounded individual sequence; learning curve; sequentially accumulated mean squared error; stationary Gaussian time series; stochastic properties; universal linear prediction; Convergence; Integrated circuit modeling; Least squares methods; Predictive models; Random processes; Resonance light scattering; Speech analysis; Speech coding; Stochastic processes; Time series analysis;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 2000. ICASSP '00. Proceedings. 2000 IEEE International Conference on
Conference_Location :
Istanbul
Print_ISBN :
0-7803-6293-4
DOI :
10.1109/ICASSP.2000.861846
