Exact Likelihood Equations for Autoregression Models with Multivariate Elliptically Contoured Distributions |
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| Authors: | B. Tarami Z. Khodadadi |
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| Affiliation: | 1. Department of Mathematics, College of Sciences , Yasouj University , Yasouj , Iran tarami@mail.yu.ac.ir;3. Department of Statistics , Islamic Azad University, Science &4. Research Branch , Tehran , Iran |
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| Abstract: | Abstract The multivariate elliptically contoured distributions provide a viable framework for modeling time-series data. It includes the multivariate normal, power exponential, t, and Cauchy distributions as special cases. For multivariate elliptically contoured autoregressive models, we derive the exact likelihood equations for the model parameters. They are closely related to the Yule-Walker equations and involve simple function of the data. The maximum likelihood estimators are obtained by alternately solving two linear systems and illustrated using the simulation data. |
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| Keywords: | Causality Covariance function Innovation distribution Kotz-type distribution Pearson-type VII distribution Stationary process Yule–Walker equations |
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