Title :
Maximum likelihood estimation for a multivariate autoregressive model
Author :
Pham, Dinh Tuan ; Tong, Dinh Quy
Author_Institution :
Lab. of Modelling & Comput., IMAG, Grenoble, France
fDate :
11/1/1994 12:00:00 AM
Abstract :
The paper provides an analytical expression for the exact log likelihood function and its first derivatives for a multivariate autoregressive model. Based on these results, two algorithms for constructing the maximum likelihood estimate, using the Fisher´s scoring technique, are proposed. The estimated model is guaranteed to be stable. Simulation examples show that this algorithm has good convergence properties and the resulting maximum likelihood estimator could perform better than earlier methods, in cases where the record length is short and the autoregressive polynomial has roots near the unit circle
Keywords :
Gaussian processes; Toeplitz matrices; autoregressive processes; computational complexity; convergence of numerical methods; filtering theory; iterative methods; maximum likelihood estimation; Fisher´s scoring technique; analytical expression; convergence properties; exact log likelihood function; maximum likelihood estimation; multivariate autoregressive model; record length; Convergence; Covariance matrix; H infinity control; Maximum likelihood estimation; Performance analysis; Polynomials; Reflection; Signal processing algorithms; Stability; Statistics;
Journal_Title :
Signal Processing, IEEE Transactions on
