Back Criteri d'informació bayesià Catalan Informationskriterium German Criterio de información bayesiano Spanish معیار اطلاع بیزی-شوارتز Persian Critère d'information bayésien French Criterio di informazione Bayesiano Italian ベイズ情報量規準 Japanese Bayesowskie kryterium informacyjne Schwarza Polish Байесовский информационный критерий Russian Баєсів інформаційний критерій Ukrainian
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In statistics, the Bayesian information criterion (BIC) or Schwarz information criterion (also SIC, SBC, SBIC) is a criterion for model selection among a finite set of models; models with lower BIC are generally preferred. It is based, in part, on the likelihood function and it is closely related to the Akaike information criterion (AIC).
When fitting models, it is possible to increase the maximum likelihood by adding parameters, but doing so may result in overfitting. Both BIC and AIC attempt to resolve this problem by introducing a penalty term for the number of parameters in the model; the penalty term is larger in BIC than in AIC for sample sizes greater than 7.[1]
The BIC was developed by Gideon E. Schwarz and published in a 1978 paper,[2] where he gave a Bayesian argument for adopting it.
- ^ See the review paper: Stoica, P.; Selen, Y. (2004), "Model-order selection: a review of information criterion rules", IEEE Signal Processing Magazine (July): 36–47, doi:10.1109/MSP.2004.1311138, S2CID 17338979.
- ^ Schwarz, Gideon E. (1978), "Estimating the dimension of a model", Annals of Statistics, 6 (2): 461–464, doi:10.1214/aos/1176344136, MR 0468014.