Mélanges de GLMs et nombre de composantes : application ... - Scor
Mélanges de GLMs et nombre de composantes : application ... - Scor
Mélanges de GLMs et nombre de composantes : application ... - Scor
Create successful ePaper yourself
Turn your PDF publications into a flip-book with our unique Google optimized e-Paper software.
Chapitre 3. Mélange <strong>de</strong> régressions logistiques<br />
Bibliographie<br />
Bohning, D., Di<strong>et</strong>z, E., Schaub, R., Schlattmann, P. and Lindsay, B. (1994), ‘The distribution<br />
of the likelihood ratio for mixtures of <strong>de</strong>nsities from the one-param<strong>et</strong>er exponential family’,<br />
Annals of the Institute of Statistical Mathematics 46, 373–388. 75<br />
Bohning, D. and Sei<strong>de</strong>l, W. (2003), ‘Editorial : recent <strong>de</strong>velopments in mixture mo<strong>de</strong>ls’, Computational<br />
Statistics and Data Analysis 41, 349–357. 76<br />
Box, G. and Cox, D. (1964), ‘An analysis of transformations’, Journal of the Royal Statistical<br />
Soci<strong>et</strong>y B 26, 211–252. 69<br />
Cramér, H. (1946), Mathematical M<strong>et</strong>hods of Statistics, Princ<strong>et</strong>on University Press, Princ<strong>et</strong>on.<br />
75<br />
Dempster, A., N.M., L. and D.B., R. (1977), ‘Maximum likelihood from incompl<strong>et</strong>e data via<br />
the em algorithm’, Journal of the Royal Statistical Soci<strong>et</strong>y 39, 1–38. 73<br />
Follmann, D. and Lambert, D. (1989), ‘Generalizing logistic regression by non-param<strong>et</strong>ric<br />
mixing’, Journal of the American Statistical Association 84, 295–300. 76<br />
Garel, B. (2007), ‘Recent asymptotic results in testing for mixtures’, Computational Statistics<br />
and Data Analysis 51, 5295–5304. 76<br />
Ghosh, J. and Sen, P. (1985), ‘On the asymptotic performance of the log-likelihood ratio<br />
statistic for the mixture mo<strong>de</strong>l and related results’, 2, 789–806. Proceedings of the Berkeley<br />
Conference in Honor of Jerzy Neyman and Jack Kiefer. 75<br />
Lindsay, B. and Lesperance, M. (1995), ‘A review of semiparam<strong>et</strong>ric mixture mo<strong>de</strong>ls’, Journal<br />
of Statistical Planning and Inference 47, 29–99. 76<br />
Lindstrom, M. and Bates, D. (1988), ‘Newton-raphson and em algorithms for linear mixe<strong>de</strong>ffects<br />
mo<strong>de</strong>ls for repeated-measures data’, Journal of the American Statistical Association<br />
83, 1014–1022. 75<br />
Margolin, B., Kim, B. and Risko, K. (1989), ‘The ames salmonella/microsome mutagenicity<br />
assay : issues of inference and validation’, Journal of the American Statistical Association<br />
84, 651–661. 77<br />
McLachlan, G. and Peel, D. (2000), Finite Mixture Mo<strong>de</strong>ls, Wiley Series In Porbability and<br />
Statistics. 70, 71, 75<br />
Pearson, K. (1894), ‘Contributions to the theory of mathematical evolution’, Philosophical<br />
Transactions of the Royal Soci<strong>et</strong>y of London A 185, 71–110. 69<br />
Teicher, H. (1963), ‘I<strong>de</strong>ntifiability of finite mixtures’, Annals of Mathematical Statistics<br />
34, 1265–1269. 77<br />
Wang, P. (1994), Mixed Regression Mo<strong>de</strong>ls for Discr<strong>et</strong>e Data, PhD thesis, University of British<br />
Columbia, Vancouver. 76<br />
Wolfe, J. (1971), A monte carlo study of sampling distribution of the likelihood ratio for<br />
mixtures of multinormal distributions, Technical Report STB-72-2, San Diego : U.S. Naval<br />
Personnel and Training Research Laboratory. 75<br />
102
Change language