kw.\*:("Loi multinomiale")
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Selection :
A linear negative multinomial modelBONETT, D. G.Statistics & probability letters. 1985, Vol 3, Num 3, pp 127-129, issn 0167-7152Article
INTEGRAL EXPRESSIONS FOR TAIL PROBABILITIES OF THE NEGATIVE MULTINOMIAL DISTRIBUTION.JOSHI SW.1975; ANN. INST. STATIST. MATH.; JAP.; DA. 1975; VOL. 27; NO 1; PP. 95-97; BIBL. 6 REF.Article
ON MULTIVARIATE MODIFIED POLYA AND INVERSE POLYA DISTRIBUTIONS AND THEIR PROPERTIES.JANARDAN KG; PATIL GP.1974; ANN. INST. STATIST. MATH.; JAP.; DA. 1974; VOL. 26; NO 2; PP. 271-276; BIBL. 5 REF.Article
The negative multinomial logit modelBONETT, D. G.Communications in statistics. Theory and methods. 1985, Vol 14, Num 7, pp 1713-1717, issn 0361-0926Article
Subset selection for the least probable multinomial cellPINYUEN CHEN.Annals of the Institute of Statistical Mathematics. 1985, Vol 37, Num 2, pp 303-314, issn 0020-3157Article
Some theorems, counterexamples, and conjectures in multinomial selection theoryCHEN, R. W; HWANG, F. K.Communications in statistics. Theory and methods. 1984, Vol 13, Num 10, pp 1289-1298, issn 0361-0926Article
On a noninformative prior distribution for bayesian inference of multinomial distribution's parametersSONO, S.Annals of the Institute of Statistical Mathematics. 1983, Vol 35, Num 2, pp 167-174, issn 0020-3157Article
A one-sided goodness-of-fit test for a multinomial population. CommentGREENBERG, I; SCHERVISH, M. J.Journal of the American Statistical Association. 1985, Vol 80, Num 391, pp 558-563, issn 0162-1459Article
On the Ramey-Alam sequential procedure for selecting the multinomial event which has the largest probabilityBECHHOFER, R. E; GOLDSMAN, D. M.Communications in statistics. Simulation and computation. 1985, Vol 14, Num 2, pp 263-282, issn 0361-0918Article
An integrated formulation for selecting the most probable multinomial cellPINYUEN CHEN.Annals of the Institute of Statistical Mathematics. 1988, Vol 40, Num 3, pp 615-625, issn 0020-3157Article
The variance and covariance of a generalized index of similarity especially for a generalization of an index of Hellinger and BhattacharyyaGOOD, I. J; SMITH, E. P.Communications in statistics. Theory and methods. 1985, Vol 14, Num 12, pp 3053-3061, issn 0361-0926Article
Truncation of the Bechhofer-Kiefer-Sobel sequential procedure for selecting the multinomial event which has the largest probabilityBECHHOFER, R. E; GOLDSMAN, D. M.Communications in statistics. Simulation and computation. 1985, Vol 14, Num 2, pp 283-315, issn 0361-0918Article
Range preserving unbiased estimators in the multinomial caseHOEFFDING, W.Journal of the American Statistical Association. 1984, Vol 79, Num 387, pp 712-714, issn 0162-1459Article
Multinomial goodness-of-fit testsCRESSIE, N; READ, T. R. C.Journal of the Royal Statistical Society. Series B. Methodological. 1984, Vol 46, Num 3, pp 440-464, issn 0035-9246Article
Large-sample pairwise comparisons among multinomial proportions with an application to analysis of mutant spectraPIEGORSCH, Walter W; RICHWINE, Kelly A.Journal of agricultural, biological, and environmental statistics. 2001, Vol 6, Num 3, pp 305-325, issn 1085-7117Article
On the least favorable configuration in multinomial selection problemsPINYUEN CHEN.Communications in statistics. Theory and methods. 1986, Vol 15, Num 2, pp 367-385, issn 0361-0926Article
Best-ball events in golf: an application of the multinomial distributionHEINY, R. L; CROSSWHITE, C. E.The American statistician. 1986, Vol 40, Num 4, pp 316-317, issn 0003-1305Article
Asymptotic approximations for the distributions of multinomial goodness-of-fit statisticsSIOTANI, M; FUJIKOSHI, Y.Hiroshima mathematical journal. 1984, Vol 14, Num 1, pp 115-124, issn 0018-2079Article
Complete multinomial expansionsNAIYANG MA.Applied mathematics and computation. 2001, Vol 124, Num 3, pp 365-370, issn 0096-3003Article
A Bayesian approach to calculating samples sizes for multinomial samplingADCOCK, C. J.Statistician (London. Print). 1987, Vol 36, Num 2-3, pp 155-159, issn 0039-0526Article
Bayesian statistical inference for sampling a finite populationLO, A. Y.Annals of statistics. 1986, Vol 14, Num 3, pp 1226-1233, issn 0090-5364Article
On Neyman's conjecture: a characterizaton of the multinomialsBIKAS KUMAR SINHA; GERIG, T. M.Journal of multivariate analysis. 1985, Vol 16, Num 3, pp 440-450, issn 0047-259XArticle
Mathematical properties of the variance of the multinomial distributionNEUDECKER, H.Journal of mathematical analysis and applications. 1995, Vol 189, Num 3, pp 757-762, issn 0022-247XArticle
Geometrical properties of the multinomial distribution based on α-entropyTANEICHI, N; SATO, Y.Tensor. 1986, Vol 43, Num 1, pp 88-94, issn 0040-3504Article
The Poisson approximation of multinomial probabilitiesAHMAD, I. A.Statistics & probability letters. 1985, Vol 3, Num 1, pp 55-56, issn 0167-7152Article