Title of article
Estimation and prediction for spatial generalized linear mixed models using high order Laplace approximation
Author/Authors
Evangelou، نويسنده , , Evangelos and Zhu، نويسنده , , Zhengyuan and Smith، نويسنده , , Richard L.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
14
From page
3564
To page
3577
Abstract
Estimation and prediction in generalized linear mixed models are often hampered by intractable high dimensional integrals. This paper provides a framework to solve this intractability, using asymptotic expansions when the number of random effects is large. To that end, we first derive a modified Laplace approximation when the number of random effects is increasing at a lower rate than the sample size. Second, we propose an approximate likelihood method based on the asymptotic expansion of the log-likelihood using the modified Laplace approximation which is maximized using a quasi-Newton algorithm. Finally, we define the second order plug-in predictive density based on a similar expansion to the plug-in predictive density and show that it is a normal density. Our simulations show that in comparison to other approximations, our method has better performance. Our methods are readily applied to non-Gaussian spatial data and as an example, the analysis of the rhizoctonia root rot data is presented.
Keywords
Generalized linear mixed models , Maximum likelihood estimation , predictive inference , Spatial statistics , Laplace approximation
Journal title
Journal of Statistical Planning and Inference
Serial Year
2011
Journal title
Journal of Statistical Planning and Inference
Record number
2221629
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