http://orcid.org/0000-0003-2330-718X
References
- Allison, P. D. ( 2001). Missing Data. Thousand Oaks, CA: Sage Publications.
- Bai, X., Yao, W., Boyer, J. E. ( 2012). Robust fitting of mixture regression models. Computational Statistics and Data Analysis 56:2347–2359.
- Bashir, S., Carter, E. ( 2012). Robust mixture of linear regression models. Communications in Statistics: Theory and Methods 41:3371–3388.
- Banfield, J. D., Raftery, A. E. ( 1993). Model-based Gaussian and non-Gaussian clustering. Biometrics 49:803–821.
- Coretto, P., Hennig, C. ( 2011). Maximum likelihood estimation of heterogeneous mixtures of Gaussian and uniform distributions. Journal of Statistical Planning and Inference 141:462–473.
- Cuesta-Albertos, J. A., Gordaliza, A., Matran, C. ( 1997). Trimmed k-means: An attempt to robustify quantizers. The Annals of Statistics 25(2):553–576.
- DasGupta, A., Raftery, A. E. ( 1998). Detecting Features in Spatial Point Process with Clutter via Model-Based Clustering. Journal of the American Statistical Association 93:294–302.
- Dempster, A. P., Laird, N. M., Rubin, D. B. ( 1977). Maximum likelihood from incomplete data using the EM algorithm (with discussion). Journal of the Royal Statistical Society, B 39:1-38.
- Desarbo, W. S., Cron, W. L. ( 1988). A Maximum Likelihood Methodology for Clusterwise Linear Regression. Journal of Classification 5(2):249–282.
- Fraley, C., Raftery, A. E. ( 2002). Model-based clustering, discriminant analysis, and density estimation. Journal of the American Statistical Association 97:611–631.
- Früwirth-Schnatter, S. ( 2006). Finite Mixture and Markov Switching Models. Heidelberg: Springer.
- Ghahramani, Z., Jordan, M. I. ( 1994). Supervised learning from incomplete data via an EM approach. In: Cowan, J. D., Tesarro, G., Alspector, J., Eds., Advances in Neural Information Processing Systems, vol. 6, Morgan Kaufmann, San Francisco, pp. 120–127.
- Gormley, I. C., Murphy, T. B. ( 2008). A mixture of experts model for rank data with applications in election studies. The Annals of Applied Statistics 2:1452–1477.
- Grün, B., Leisch, F. ( 2007). Fitting finite mixtures of generalized linear regressions in R. Computational Statistics and Data Analysis 51(11):5247–5252.
- Hampel, F. R., Ronchetti, E. M., Rousseeuw, P. J., Stahel, W. A. ( 1986). Robust Statistics: The Approach Based on Influence Functions. New York: Wiley.
- Harel, O., Zhou, X. H. ( 2007). Multiple imputation: Review of theory, implementation and software. Statistics in Medicine 26:3057–3077.
- Hennig, C. ( 2000). Identifiability of Models for Clusterwise Linear Regression. Journal of Classification 17:273–296.
- Hennig, C. ( 2004). Breakdown points for maximum likelihood estimators of location-scale mixtures. Annals of Statistics 32:1313–1340.
- Hunt, L. A., Basford, K. E. ( 1999). Fitting a mixture model to three-mode three-way data with categorical and continuous missing information. Journal of Classification 18:283–296.
- Hunt, L. A., Jorgensen, M. A. ( 2003). Mixture model clustering for mixed data with missing information. Computational Statistics and Data Analysis 41:429–440.
- Ingrassia, S., Minotti, S. C., Vittadini, G. ( 2012). Local statistical modeling via a cluster-weighted approach with elliptical distributions. Journal of Classification 29:363–401.
- Jiang, W., Tanner, M. ( 1999). Hierarchical mixtures-of-experts for exponential family regression models: Approximation and maximum likelihood estimation. Annals of Statistics 27:987–1011.
- Jordan, M. I., Jacobs, R. A. ( 1994). Hierarchical mixtures of experts and the EM algorithm. Neural Computation 6:181–224.
- Leisch, F. ( 2008). Modelling background noise in finite mixtures of generalized linear regression models. Proceedings of COMPSTAT 2008, 385–396.
- Lin, T. I., Lee, J. C., Huey, F. N. ( 2004). Bayesian analysis of mixture modelling using the multivariate t distribution. Statistics and Computing 14:119–130.
- Lin, T. I., Lee, J. C., Ho, H. J. ( 2006). On fast supervised learning for normal mixture models with missing information. Pattern Recognition 39:1177–1187.
- Lin, T. C., Lin, T. I. ( 2010). Supervised learning of multivariate skew normal mixture models with missing information. Computational Statistics and Data Analysis 14:183–201.
- Little, R. J. A., Rubin, D. B. ( 2002). Statistical Analysis With Missing Data. New York: Wiley.
- Lo, K., Gottardo, R. ( 2012). Flexible mixture modeling via the multivariate t distribution with the Box–Cox transformation: An alternative to the skew-t distribution. Statistics and Computing 22:33–52.
- McLachlan, G. J., Peel, D. ( 2000). Finite Mixture Models. New York: Wiley.
- Neykov, N. M., Filzmoser, P., Neytchev, P. N. ( 2007). Robust joint modeling of mean and dispersion through trimming. Computational Statistics and Data Analysis 56:34–48.
- Ng, S. K., McLachlan, G. J. ( 2007). Extension of mixture-of-experts networks for binary classification of hierarchical data. Artificial Intelligence in Medicine 41:57–67.
- Peel, D., McLachlan, G. J. ( 2000). Robust mixture modelling using the t distribution. Statistics and Computing 10:339–348.
- Peng, F., Jacobs, R. A., Tanner, M. A. ( 1996). Bayesian inference in mixtures-of-experts and hierarchical mixtures-of-experts models with an application to speech recognition. Journal of the American Statistical Association 91:953–960.
- Quandt, R. E. ( 1972). A new approach to estimating switching regressions. Journal of the American Statistical Society 67:306–310.
- Rubin, D. B. ( 1976). Inference and missing data. Biometrika 63:581–592.
- Shoham, S. ( 2002). Robust clustering by deterministic agglomeration EM of mixtures of multivariate t-distributions. Pattern Recognition 35(5):1127–1142.
- Song, W., Yao, W., Xing, Y. ( 2014). Robust mixture regression model fitting by Laplace distribution. Computational Statistics and Data Analysis 71:128–137.
- Wang, H., Zhang, Q., Luo, B. L., Wei, S. ( 2004). Robust mixture modelling using multivariate t-distribution with missing information. Pattern Recognition Letters 25:701–710.
- Wedel, M., Desarbo, W. S. ( 1995). A mixture likelihood approach for generalized linear models. Journal of Classification 12(1):21–55.
- Wedel, M., Kamamura, W. A. ( 2000). Market Segmentation. Conceptual and Methodological Foundations. Boston: Kluwer Academic Publishers.
- Wedel, M., Steenkamp, J. B. E. M. ( 1991). A clusterwise regression method for simultaneous fuzzy market structuring and benefit segmentation. Journal of Marketing Research 28:385–397.
- Yao, W., Wei, Y., Yu, C. ( 2014). Robust mixture regression using the t-distribution. Computational Statistics and Data Analysis 71:116–127.
- Zio, M. D., Guarnera, U., Luzi, O. ( 2007). Imputation through finite Gaussian mixture models. Computational Statistics and Data Analysis 51:5305–5316.