https://orcid.org/0000-0001-6770-1205
References
- Awang, N., and M. Shitan. 2006. Estimating the parameters of the second order spatial unilateral autoregressive model. International Journal of Statistical Sciences 5:37–58.
- Bartlett, M. S. 1971. Physical nearest-neighbour models and non-linear time-series. Journal of Applied Probability 8 (2):222–32. doi:10.2307/3211892.
- Basu, S., and G. C. Reinsel. 1992. A note on properties of spatial Yule-Walker estimators. Journal of Statistical Computation and Simulation 41 (3–4):243–55. doi:10.1080/00949652208811404.
- Basu, S., and G. C. Reinsel. 1993. Properties of the spatial unilateral first-order ARMA model. Advances in Applied Probability 25 (3):631–48. doi:10.2307/1427527.
- Besag, J. 1974. Spatial interaction and the statistical analysis of lattice systems. Journal of the Royal Statistical Society: Series B (Methodological) 36 (2):192–236. doi:10.1111/j.2517-6161.1974.tb00999.x.
- Brunsdon, C., A. S. Fotheringham, and M. E. Charlton. 1996. Geographically weighted regression: A method for exploring spatial nonstationarity. Geographical Analysis 28 (4):281–98. doi:10.1111/j.1538-4632.1996.tb00936.x.
- Damian, D.,. P. D. Sampson, and P. Guttorp. 2001. Bayesian estimation of semi-parametric non-stationary spatial covariance structures. Environmetrics 12 (2):161–78. doi:10.1002/1099-095X(200103)12:2<161::AID-ENV452>3.0.CO;2-G.
- Delfiner, P. 1976. Linear estimation of non stationary spatial phenomena. In Advanced geostatistics in the mining industry, edited by M. Guarascio, M. David, and Ch. J. Huijbregts, 49–68. Dordrecht: Springer Netherlands.
- Drapatz, M. 2016. Strictly stationary solutions of spatial ARMA equations. Annals of the Institute of Statistical Mathematics 68 (2):385–412. doi:10.1007/s10463-014-0500-y.
- Du, Z., Z. Wang, S. Wu, F. Zhang, and R. Liu. 2020. Geographically neural network weighted regression for the accurate estimation of spatial non-stationarity. International Journal of Geographical Information Science 34 (7):1353–25. doi:10.1080/13658816.2019.1707834.
- Fotheringham, A. S., C. Brunsdon, and M. Charlton. 2002. Geographically weighted regression: the analysis of spatially varying relationships. Chichester, NY; Hoboken, NJ; UK: John Wiley and Sons, Limited.
- Fuentes, M. 2001. A high frequency kriging approach for non-stationary environmental processes. Environmetrics 12 (5):469–83. doi:10.1002/env.473.
- Griffith, D. A. 2015. Approximation of Gaussian spatial autoregressive models for massive regular square tessellation data. International Journal of Geographical Information Science 29 (12):2143–73. doi:10.1080/13658816.2015.1068318.
- Haining, R. P. 1978. The moving average model for spatial interaction. Transactions of the Institute of British Geographers 3 (2):202–25. doi:10.2307/622202.
- Martin, R. J. 1979. A subclass of lattice processes applied to a problem in planar sampling. Biometrika 66 (2):209–17. doi:10.1093/biomet/66.2.209.
- Martin, R. J. 1996. Some results on unilateral ARMA lattice processes. Journal of Statistical Planning and Inference 50 (3):395–411. doi:10.1016/0378-3758(95)00066-6.
- Mojiri, A., Y. Waghei, H. R. Nili Sani, and G. R. Mohtashami Borzadaran. 2018a. Spatial prediction by using unilateral autoregressive models in two dimensional space. Journal of Statistical Sciences 12 (1):189–208. doi:10.29252/jss.12.1.189.
- Mojiri, A., Y. Waghei, H. R. Nili Sani, and G. R. Mohtashami Borzadaran. 2018b. Comparison of predictions by kriging and spatial autoregressive models. Communications in Statistics - Simulation and Computation 47 (6):1785–95. doi:10.1080/03610918.2017.1324980.
- Mojiri, A., Y. Waghei, H. R. Nili Sani, and G. R. Mohtashami Borzadaran. 2018c. The stationary regions for parameter space unilateral second-order spatial AR model. Random Operators and Stochastic Equations 26 (3):185–91. doi:10.1515/rose-2018-0017.
- Ord, K. 1975. Estimation methods for models of spatial interaction. Journal of the American Statistical Association 70 (349):120–26. doi:10.1080/01621459.1975.10480272.
- Ribeiro, P. J., Jr, and P. J. Diggle. 2001. geoR: A package for geostatistical analysis. R News 1 (2):14–18.
- Ribeiro, P. J., Jr, and P. J. Diggle. 2006. geoR: Package for geostatistical data analysis an illustrative session. Artificial Intelligence 1:1–24.
- Saber, M. M. 2019. Performance of extrapolation based on Pitman’s measure of closeness in spatial regression models with extended skew t innovations. Communications in Statistics - Theory and Methods 48 (2):282–99. doi:10.1080/03610926.2017.1408830.
- Saber, M. M., and A. R. Nematollahi. 2017. Comparison of spatial interpolation methods in the first order stationary multiplicative spatial autoregressive models. Communications in Statistics - Theory and Methods 46 (18):9230–46. doi:10.1080/03610926.2016.1205619.
- Schmidt, A. M., and A. O'Hagan. 2003. Bayesian inference for non stationary spatial covariance structure via spatial deformations. Journal of the Royal Statistical Society: Series B (Statistical Methodology) 65 (3):743–58. doi:10.1111/1467-9868.00413.
- Tjostheim, D. 1978. Statistical spatial series modelling. Advances in Applied Probability 10 (1):130–54.
- Tjostheim, D. 1983. Statistical spatial series modelling II: Some further results on unilateral lattice processes. Advances in Applied Probability 15 (3):562–84.
- Ver Hoef, J. M., E. E. Peterson, M. B. Hooten, E. M. Hanks, and M. J. Fortin. 2018. Spatial autoregressive models for statistical inference from ecological data. Ecological Monographs 88 (1):36–59. doi:10.1002/ecm.1283.
- Wang, H., S. R. Stephenson, and S. Qu. 2019. Modeling spatially non-stationary land use/cover change in the lower Connecticut River Basin by combining geographically weighted logistic regression and the CA-Markov model. International Journal of Geographical Information Science 33 (7):1313–34. doi:10.1080/13658816.2019.1591416.
- Whittle, P. 1954. On sationary processes in the plane. Biometrika 41 (3–4):434–49. doi:10.1093/biomet/41.3-4.434.