Relação Beta-Funcional entre o P-value e a Medida de Evidência Bayesiana na Comparação de duas Populações Normais
Resumo
Texto completo:
PDFReferências
[1] J.O. Berger, T. Selke, Testing a point null hypothesis: the irreconcilability of p values and evidence, Journal of the American Statistical Association, 82 (1987), 112-139.
J.O. Berger, M. Delampady, Testing precise hypotheses, Statistical Science, 2 (1987), 317-352.
H. Bolfarine, M.C. Sandoval, “Introdução à Inferência Estatística”, Sociedade Brasileira de Matemática, Rio de Janeiro, 2001.
M. Evans, Bayesian inference procedures derived via the concept of relative surprise. Communications in Statistics, 26 (1997), 1125-1143.
H. Jeffreys, “Theory of Probability”, University Press, Oxford, 1961.
D.V. Lindley, A Statistical Paradox, Biometrika, 44 (1957), 187-192.
M.R. Madruga, L.G. Esteves, S. Wechsler, On the Bayesianity of Pereira-Stern tests, Test, 10 (2001), 291-299.
M.R. Madruga, “Teste de Significância: Uma Proposta Genuinamente Bayesiana”, Tese de Doutorado, IME, USP, São Paulo, SP, 2002.
M.R. Madruga, C.A. de B. Pereira, J. Stern, Bayesian evidence test for precise hypotheses, Journal of Statistical Planning and Inference, 117 (2003), 185-198.
C.A. de B. Pereira, J. Stern, Evidence and credibility: a full bayesian test of precise hypothesis, Entropy, 1 (1999), 99-110.
H. Rubin, A weak system of axioms for ’rational’ behaviour and the nonseparability of utility from prior, Statistics and Decisions, 5 (1987), 47-58.
DOI: https://doi.org/10.5540/tema.2006.07.02.0269
Métricas do artigo
Metrics powered by PLOS ALM
Apontamentos
- Não há apontamentos.
Trends in Computational and Applied Mathematics
A publication of the Brazilian Society of Applied and Computational Mathematics (SBMAC)
Indexed in: