Title :
Nonlinear maximum likelihood estimation of autoregressive time series
Author :
McWhorter, L. Todd ; Scharf, Louis L.
Author_Institution :
Dept. of Electr. & Comput. Eng., Colorado Univ., Boulder, CO, USA
fDate :
12/1/1995 12:00:00 AM
Abstract :
Describes an algorithm for finding the exact, nonlinear, maximum likelihood (ML) estimators for the parameters of an autoregressive time series. The authors demonstrate that the ML normal equations can be written as an interdependent set of cubic and quadratic equations in the AR polynomial coefficients. They present an algorithm that algebraically solves this set of nonlinear equations for low-order problems. For high-order problems, the authors describe iterative algorithms for obtaining a ML solution
Keywords :
Gaussian processes; autoregressive processes; iterative methods; maximum likelihood estimation; nonlinear equations; polynomials; signal processing; time series; AR polynomial coefficients; autoregressive time series; cubic equations; high-order problems; iterative algorithms; low-order problems; nonlinear equations; nonlinear maximum likelihood estimation; normal equations; parameters; quadratic equations; Computer errors; Iterative algorithms; Maximum likelihood estimation; Nonlinear equations; Parameter estimation; Polynomials; Probability; Reflection; Signal processing algorithms; Statistics;
Journal_Title :
Signal Processing, IEEE Transactions on
