Model selection

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Model selection is the task of selecting a statistical model from a set of candidate models, given data. In the simplest cases, a preexisting set of data is considered. However, the task can also involve the design of experiments such that the data collected is wellsuited to the problem of model selection. Given candidate models of similar predictive or explanatory power, the simplest model is most likely to be the best choice (Occam's razor).
Konishi & Kitagawa (2008, p. 75) state, "The majority of the problems in statistical inference can be considered to be problems related to statistical modeling". Relatedly, Cox (2006, p. 197) has said, "How [the] translation from subjectmatter problem to statistical model is done is often the most critical part of an analysis".
Model selection may also refer to the problem of selecting a few representative models from a large set of computational models for the purpose of decision making or optimization under uncertainty. ^{[1]}
Introduction [ edit ]
In its most basic forms, model selection is one of the fundamental tasks of scientific inquiry. Determining the principle that explains a series of observations is often linked directly to a mathematical model predicting those observations. For example, when Galileo performed his inclined plane experiments, he demonstrated that the motion of the balls fitted the parabola predicted by his model^{[citation needed]}.
Of the countless number of possible mechanisms and processes that could have produced the data, how can one even begin to choose the best model? The mathematical approach commonly taken decides among a set of candidate models; this set must be chosen by the researcher. Often simple models such as polynomials are used, at least initially^{[citation needed]}. Burnham & Anderson (2002) emphasize throughout their book the importance of choosing models based on sound scientific principles, such as understanding of the phenomenological processes or mechanisms (e.g., chemical reactions) underlying the data.
Once the set of candidate models has been chosen, the statistical analysis allows us to select the best of these models. What is meant by best is controversial. A good model selection technique will balance goodness of fit with simplicity^{[citation needed]}. More complex models will be better able to adapt their shape to fit the data (for example, a fifthorder polynomial can exactly fit six points), but the additional parameters may not represent anything useful. (Perhaps those six points are really just randomly distributed about a straight line.) Goodness of fit is generally determined using a likelihood ratio approach, or an approximation of this, leading to a chisquared test. The complexity is generally measured by counting the number of parameters in the model.
Model selection techniques can be considered as estimators of some physical quantity, such as the probability of the model producing the given data. The bias and variance are both important measures of the quality of this estimator; efficiency is also often considered.
A standard example of model selection is that of curve fitting, where, given a set of points and other background knowledge (e.g. points are a result of i.i.d. samples), we must select a curve that describes the function that generated the points.
Methods to assist in choosing the set of candidate models [ edit ]
Criteria [ edit ]
Below is a list of criteria for model selection. The most commonly used criteria are (i) the Akaike information criterion and (ii) the Bayes factor and/or the Bayesian information criterion (which to some extent approximates the Bayes factor).
 Akaike information criterion (AIC), a measure of the goodness fit of an estimated statistical model
 Bayes factor
 Bayesian information criterion (BIC), also known as the Schwarz information criterion, a statistical criterion for model selection
 Crossvalidation
 Deviance information criterion (DIC), another Bayesian oriented model selection criterion
 False discovery rate
 Focused information criterion (FIC), a selection criterion sorting statistical models by their effectiveness for a given focus parameter
 Hannan–Quinn information criterion, an alternative to the Akaike and Bayesian criteria
 Kashyap information criterion (KIC) is a powerful alternative to AIC and BIC, because KIC uses Fisher information matrix
 Likelihoodratio test
 Mallows's C_{p}
 Minimum description length
 Minimum message length (MML)
 PRESS statistic, also known as the PRESS criterion
 Structural risk minimization
 Stepwise regression
 Watanabe–Akaike information criterion (WAIC), also called the widely applicable information criterion
 Extended Bayesian Information Criterion (EBIC) is an extension of ordinary Bayesian information criterion (BIC) for models with high parameter spaces.
 Extended Fisher Information Criterion (EFIC) is a model selection criterion for linear regression models.
Among these criteria, crossvalidation is typically the most accurate, and computationally the most expensive, for supervised learning problems.
Burnham & Anderson (2002, §6.3) say the following (with wikilinks added).
There is a variety of model selection methods. However, from the point of view of statistical performance of a method, and intended context of its use, there are only two distinct classes of methods: These have been labeled efficient and consistent. .... Under the frequentist paradigm for model selection one generally has three main approaches: (I) optimization of some selection criteria, (II) tests of hypotheses, and (III) ad hoc methods.
See also [ edit ]
 All models are wrong
 Analysis of competing hypotheses
 Automated machine learning (AutoML)
 Biasvariance dilemma
 Feature selection
 Freedman's paradox
 Grid search
 Identifiability Analysis
 Loglinear analysis
 Model identification
 Occam's razor
 Optimal design
 Parameter identification problem
 Scientific modelling
 Statistical model validation
 Stein's paradox
Notes [ edit ]
 ^ Shirangi, Mehrdad G.; Durlofsky, Louis J. (2016). "A general method to select representative models for decision making and optimization under uncertainty". Computers & Geosciences. 96: 109–123. Bibcode:2016CG.....96..109S. doi:10.1016/j.cageo.2016.08.002.
References [ edit ]
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 Anderson, D.R. (2008), Model Based Inference in the Life Sciences, Springer, ISBN 9780387740751
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