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A generalized model of logistic regression for clustered dataYINSHENG QU; WILLIAMS, G. W; BECK, G. J et al.Communications in statistics. Theory and methods. 1987, Vol 16, Num 12, pp 3447-3476, issn 0361-0926Article

Influence measures for logistic regression: another point of viewJOHNSON, W.Biometrika. 1985, Vol 72, Num 1, pp 59-65, issn 0006-3444Article

On errors-in-variables for binary regression modelsCARROLL, R. J; SPIEGELMAN, C. H; GORDON LAN, K. K et al.Biometrika. 1984, Vol 71, Num 1, pp 19-25, issn 0006-3444Article

Comprendre la régression logistique = Understanding logistic regressionEL SANHARAWI, M; NAUDET, F.Journal français d'ophtalmologie. 2013, Vol 36, Num 8, pp 710-715, issn 0181-5512, 6 p.Article

PGMs for classificationLARRANAGA, Pedro; LOZANO, Jose A; PENA, Jose M et al.Machine learning. 2005, Vol 59, Num 3, issn 0885-6125, 145 p.Serial Issue

Generalized logistic modelsSTUKEL, T. A.Journal of the American Statistical Association. 1988, Vol 83, Num 402, pp 426-431, issn 0162-1459Article

Logistic regression, survival analysis, and the kaplan-Meier curveEFRON, B.Journal of the American Statistical Association. 1988, Vol 83, Num 402, pp 414-425, issn 0162-1459Article

Modification of the empirical logit to reduce bias in simple linear logistic regressionJUNE DAVIS, L.Biometrika. 1985, Vol 72, Num 1, pp 199-202, issn 0006-3444Article

An algorithm for exact logistic regressionTRITCHLER, D.Journal of the American Statistical Association. 1984, Vol 79, Num 387, pp 709-711, issn 0162-1459Article

Genome-wide association analysis by lasso penalized logistic regressionTONG TONG WU; YI FANG CHEN; HASTIE, Trevor et al.Bioinformatics (Oxford. Print). 2009, Vol 25, Num 6, pp 714-721, issn 1367-4803, 8 p.Article

Combining Pairwise Coupling Classifiers Using Individual Logistic RegressionsYAMAGUCHI, Nobuhiko.Lecture notes in computer science. 2006, pp 11-20, issn 0302-9743, isbn 3-540-46479-4, 3Vol, 10 p.Conference Paper

Computing distributions for exact logistic regressionHIRJI, K. F; MEHTA, C. R; PATEL, N. R et al.Journal of the American Statistical Association. 1987, Vol 82, Num 400, pp 1110-1117, issn 0162-1459Article

Logistic regression for two-stage case-control dataBRESLOW, N. E; CAIN, K. C.Biometrika. 1988, Vol 75, Num 1, pp 11-20, issn 0006-3444Article

Regression and ordered categorical variablesANDERSON, J. A.Journal of the Royal Statistical Society. Series B. Methodological. 1984, Vol 46, Num 1, pp 1-30, issn 0035-9246Article

Binary regression models for contaminated dataCOPAS, J. B.Journal of the Royal Statistical Society. Series B. Methodological. 1988, Vol 50, Num 2, pp 225-265, issn 0035-9246Article

Double exponential families and their use in generalized linear regressionEFRON, B.Journal of the American Statistical Association. 1986, Vol 81, Num 395, pp 709-721, issn 0162-1459Article

Hierarchical Bayesian analysis using Monte Carlo integration: computing posterior distributions when there are many possible modelsSTEWART, L.Statistician (London. Print). 1987, Vol 36, Num 2-3, pp 211-219, issn 0039-0526Article

Fitting logistic models under case-control or choice based samplingSCOTT, A. J; WILD, C. J.Journal of the Royal Statistical Society. Series B. Methodological. 1986, Vol 48, Num 2, pp 170-182, issn 0035-9246Article

A ridge logistic estimatorSCHAEFER, R. L; ROI, L. D; WOLFE, R. A et al.Communications in statistics. Theory and methods. 1984, Vol 13, Num 1, pp 99-113, issn 0361-0926Article

Standards for Standardized Logistic Regression CoefficientsMENARD, Scott.Social forces. 2011, Vol 89, Num 4, pp 1409-1428, issn 0037-7732, 20 p.Article

Consistency and asymptotic normality of the minimum logit chi-squared estimator when the number of design points is largeDAVIS, L. J.Annals of statistics. 1985, Vol 13, Num 3, pp 947-957, issn 0090-5364Article

Maximum likelihood methods for complex sample data: logistic regression and discrete proportional hazards modelsCHAMBLESS, L. E; BOYLE, K. E.Communications in statistics. Theory and methods. 1985, Vol 14, Num 6, pp 1377-1392, issn 0361-0926Article

Nonlinear prediction theory and the estimation of proportions in a finite populationVALLIANT, R.Journal of the American Statistical Association. 1985, Vol 80, Num 391, pp 631-641, issn 0162-1459Article

Confidence regions for parameters of the proportional hazards model: a simulation studyMOOLGAVKAR, S. H; VENZON, D. J.Scandinavian journal of statistics. 1987, Vol 14, Num 1, pp 43-56, issn 0303-6898Article

LRpath : a logistic regression approach for identifying enriched biological groups in gene expression dataSARTOR, Maureen A; LEIKAUF, George D; MEDVEDOVIC, Mario et al.Bioinformatics (Oxford. Print). 2009, Vol 25, Num 2, pp 211-217, issn 1367-4803, 7 p.Article

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