16.5 Selecting a model

16.5.1 Introduction

At this point in the text, almost all of the tools are in place for choosing a model. Before outlining a recommended approach, two important concepts must be introduced. The first is parsimony. The principle of parsimony states that unless there is considerable evidence to do otherwise, a simpler model is preferred. The reason for this preference is that a complex model may do a great job of matching the data, but that is no guarantee the model matches the population from which the observations were sampled. For example, given any set of 10 (x, y) pairs with unique x values, there will always be a polynomial of degree 9 or less that goes through all 10 points. But if these points were a random sample, it is highly unlikely that the population values all lie on that polynomial. However, there may be a straight line that comes close to the sampled points as well as the other points in the population. This observation matches the spirit of most hypothesis tests. That is, do not reject the null hypothesis (and thus claim a more complex description of the population holds) unless there is strong evidence to do so.

The second concept does not have a name. It states that, if you try enough models, one will look good, even if it is not. Suppose I have 900 models at my disposal. For most data sets, it is likely that one of them will fit extremely well, but it may not help us learn about the population.

Thus, in selecting models, there are two things ...