An alternative to the standard Bayesian procedure for discrimination between normal linear modelsPERICCHI, L. R.Biometrika. 1984, Vol 71, Num 3, pp 575-586, issn 0006-3444Article

Outlier resistant distributions: where does the probability go?GOLDSTEIN, M.Journal of the Royal Statistical Society. Series B. Methodological. 1983, Vol 45, Num 3, pp 355-357, issn 0035-9246Article

Estimating the posterior probability that genome-wide association findings are true or falseBUKSZAR, József; MCCLAY, Joseph L; VAN DEN OORD, Edwin J. C. G et al.Bioinformatics (Oxford. Print). 2009, Vol 25, Num 14, pp 1807-1813, issn 1367-4803, 7 p.Article

A note on the posterior expectationGUNEL, E.Communications in statistics. Theory and methods. 1986, Vol 15, Num 4, pp 1337-1345, issn 0361-0926Article

A generalization of the near-optimum binary coherent state receiver conceptVILNROTTER, V. A; RODEMICH, E. R.IEEE transactions on information theory. 1984, Vol 30, Num 2, pp 446-450, issn 0018-9448Article

Sur la structure des distributions a posteriori des probabilités dans les problèmes du filtrage cumulé des processus de MarkovKAPYLOV, A. K.Radiotehnika i èlektronika. 1987, Vol 32, Num 7, pp 1466-1472, issn 0033-8494Article

CLASSIFICATION BY MAXIMUM POSTERIOR PROBABILITY.SHAPIRO CP.1977; ANN. STATIST.; U.S.A.; DA. 1977; VOL. 5; NO 1; PP. 185-190; BIBL. 5 REF.Article

ON SUBJECTIVE PROBABILITY REVISIONMORGAN BJT.1972; BRIT. J. MATH. STATIST. PSYCHOL.; G.B.; DA. 1972; VOL. 25; NO 2; PP. 292-304; BIBL. 23 REF.Serial Issue

ASYMPTOTIC PROPERTIES OF POSTERIOR DISTRIBUTIONS.STRASSER H.1976; Z. WAHRSCHEIN.-THEOR. VERWANDTE GEB.; DTSCH.; DA. 1976; VOL. 35; NO 3; PP. 269-282; BIBL. 14 REF.Article

A new criterion for variable selectionPHILIPS, R; GUTTMAN, I.Statistics & probability letters. 1998, Vol 38, Num 1, pp 11-19, issn 0167-7152Article

A MAP estimate that maximizes entropy ― an alternative interpretation for an autoregressive modelUNNIKRISHNA PILLAI, S.Proceedings of the IEEE. 1985, Vol 73, Num 4, pp 843-844, issn 0018-9219Article

Performance of M-ary feedback communication systemsKAZOVSKY, L. G.IEE proceedings. Part F. Communications, radar and signal processing. 1984, Vol 131, Num 1, pp 80-86, issn 0143-7070Article

QVALITY : non-parametric estimation of q-values and posterior error probabilitiesKÄLL, Lukas; STOREY, John D; STAFFORD NOBLE, William et al.Bioinformatics (Oxford. Print). 2009, Vol 25, Num 7, pp 964-966, issn 1367-4803, 3 p.Article

Graph edit distance from spectral seriationROBLES-KELLY, Antonio; HANCOCK, Edwin R.IEEE transactions on pattern analysis and machine intelligence. 2005, Vol 27, Num 3, pp 365-378, issn 0162-8828, 14 p.Article

Interval estimates for posterior probabilities in a multivariate normal classification modelAMBERGEN, A. W; SCHAAFSMA, W.Journal of multivariate analysis. 1985, Vol 16, Num 3, pp 432-439, issn 0047-259XArticle

Map-based context dependent tone recognition method of Chinese speechLI MING; LIU JIAN; YU TIECHENG et al.EUPSICO 2000 : European signal processing conference. 2000, pp 477-479, isbn 952-15-0443-9, 4VolConference Paper

On the transitivity of the posterior Pitman closeness criterionBOSE, S.Journal of statistical planning and inference. 1998, Vol 69, Num 2, pp 263-274, issn 0378-3758Article

Bayesian interval estimates which are also confidence intervalsSEVERINI, T. A.Journal of the Royal Statistical Society. Series B. Methodological. 1993, Vol 55, Num 2, pp 533-540, issn 0035-9246Article

TRACKING IN A CLUTTERED ENVIRONMENT WITH PROBABILISTIC DATA ASSOCIATION.BAR SHALOM Y; TSE E.1975; AUTOMATICA; G.B.; DA. 1975; VOL. 11; NO 5; PP. 451-460; BIBL. 14 REF.Article

TAILFREE AND NEUTRAL RANDOM PROBABILITIES AND THEIR POSTERIOR DISTRIBUTIONS.DOKSUM K.1974; ANN. PROBAB.; U.S.A.; DA. 1974; VOL. 2; NO 2; PP. 183-201; BIBL. 17 REF.Article

POPULATION-DISTRIBUTED PERSONAL PROBABILITIES.DICKEY J; FREEMAN P.1975; J. AMER. STATIST. ASS.; U.S.A.; DA. 1975; VOL. 70; NO 350; PP. 362-364; BIBL. 19 REF.Article

THE PROBABILITY OF "LAWS OF NATURE": A CASE FOR HENTIKKA'S INDUCTIVE LOGICMONDADORI M.1978; STATISTICA; ITA; DA. 1978; VOL. 38; NO 4; PP. 517-536; ABS. ITA/FRE; BIBL. 2 P.Article

APPROXIMATE POSTERIOR DISTRIBUTIONS.DICKEY JM.1976; J. AMER. STATIST. ASS.; U.S.A.; DA. 1976; VOL. 71; NO 355; PP. 680-689; BIBL. 1 P.Article

UNIQUENESS RELATION FOR LINEAR POSTERIOR EXPECTATIONS.GOLDSTEIN M.1975; J. R. STATIST. SOC., B; G.B.; DA. 1975; VOL. 37; NO 3; PP. 402-405; BIBL. 3 REF.Article

BAYESIAN INFERENCE ABOUT THE RELIABILITY FUNCTION FOR THE EXPONENTIAL DISTRIBUTIONS.SINHA SK; GUTTMAN I.1976; COMMUNIC. STATIST., THEORY METHODS; U.S.A.; DA. 1976; VOL. 5; NO 5; PP. 471-479; BIBL. 3 REF.Article