Title of article
Modeling covariance matrices via partial autocorrelations
Author/Authors
Daniels، نويسنده , , M.J. and Pourahmadi، نويسنده , , M.، نويسنده ,
Issue Information
دوفصلنامه با شماره پیاپی سال 2009
Pages
12
From page
2352
To page
2363
Abstract
We study the role of partial autocorrelations in the reparameterization and parsimonious modeling of a covariance matrix. The work is motivated by and tries to mimic the phenomenal success of the partial autocorrelations function (PACF) in model formulation, removing the positive-definiteness constraint on the autocorrelation function of a stationary time series and in reparameterizing the stationarity-invertibility domain of ARMA models. It turns out that once an order is fixed among the variables of a general random vector, then the above properties continue to hold and follow from establishing a one-to-one correspondence between a correlation matrix and its associated matrix of partial autocorrelations. Connections between the latter and the parameters of the modified Cholesky decomposition of a covariance matrix are discussed. Graphical tools similar to partial correlograms for model formulation and various priors based on the partial autocorrelations are proposed. We develop frequentist/Bayesian procedures for modelling correlation matrices, illustrate them using a real dataset, and explore their properties via simulations.
Keywords
Uniform and reference priors , Levinson–Durbin algorithm , Prediction variances , Markov chain Monte Carlo , Autoregressive parameters , Positive-definiteness constraint , Cholesky decomposition
Journal title
Journal of Multivariate Analysis
Serial Year
2009
Journal title
Journal of Multivariate Analysis
Record number
1565319
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