Exploring Spatial Generalized Functional Linear Models: A Comparative Simulation Study and Analysis of COVID-19
Abstract: Implementation of spatial generalized linear models with a functional covariate can be accomplished through the use of a truncated basis expansion of the covariate process. In practice, one must select a truncation level for use. We compare five criteria for the selection of an appropriate truncation level, including AIC and BIC based on a log composite likelihood, a fraction of variance explained criterion, a fitted mean squared error, and a prediction error with one standard error rule. Based on the use of extensive simulation studies, we propose that BIC constitutes a reasonable default criterion for the selection of the truncation level for use in a spatial functional generalized linear model. In addition, we demonstrate that the spatial model with a functional covariate outperforms other models when the data contain spatial structure and response variables are in fact influenced by a functional covariate process. We apply the spatial functional generalized linear model to a problem in which the objective is to relate COVID-19 vaccination rates in counties of states in the Midwestern United States to the number of new cases from previous weeks in those same geographic regions.
- Quasi-maximum likelihood estimators for functional linear spatial autoregressive models. Geostatistical Functional Data Analysis , 286–328.
- Spatial interaction and the statistical analysis of lattice systems. Journal of the Royal Statistical Society: Series B (Methodological) 36, 192–225.
- Statistical analysis of non-lattice data. The Statistician 24, 179–195.
- Variable selection in generalized functional linear models. Stat 2, 86–101.
- Penalized functional regression. Journal of computational and graphical statistics 20, 830–851.
- Random fields on a network: modeling, statistics, and applications. Springer Science & Business Media.
- Dependent generalized functional linear models. Biometrika 104, 987–994.
- The construction of multivariate distributions from markov random fields. Journal of Multivariate Analysis 73, 199–220.
- Generalized linear models with spatial dependence and a functional covariate. arXiv preprint arXiv:2402.13472 .
- Generalized functional linear models .
- An overview of composite likeihood methods. Statistica Sinica 21, 5–42.
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