Title :
An extension of the split Levinson algorithm and its relatives to the joint process estimation problem
Author :
Delsarte, P. ; Genin, Y.
Author_Institution :
Philips Res. Lab., Brussels, Belgium
fDate :
3/1/1989 12:00:00 AM
Abstract :
It is shown that the split Levinson algorithm, the split Schur algorithm, and the split lattice algorithm to compute the reflection coefficients of the optimal linear prediction filter for a discrete-time stationary stochastic process can be extended to the more general case of the joint process estimation problem. The new algorithms are essentially based on well-defined recurrence relations for symmetric prediction filters and symmetric estimation filters. They are more economical than the standard methods in terms of storage space and number of arithmetic operations
Keywords :
filtering and prediction theory; signal processing; stochastic processes; discrete-time stationary stochastic process; joint process estimation problem; optimal linear prediction filter; recurrence relations; reflection coefficients; split Levinson algorithm; split Schur algorithm; split lattice algorithm; symmetric estimation filters; symmetric prediction filters; Arithmetic; Economic forecasting; Equations; Lattices; Nonlinear filters; Polynomials; Reflection; Signal processing; Stochastic processes; Wiener filter;
Journal_Title :
Information Theory, IEEE Transactions on
