(This article was first published on

**ExploringDataBlog**, and kindly contributed to R-bloggers)It has been several months since my last post on classification tree models, because two things have been consuming all of my spare time. The first is that I taught a night class for the University of Connecticut ’s Graduate School of Business, introducing R to students with little or no prior exposure to either R or programming. My hope is that the students learned something useful – I can say with certainty that I did – but preparing for the class and teaching it took a lot of time. The other activity, that has taken essentially all of my time since the class ended, is the completion of a book on nonlinear digital filtering using Python, joint work with my colleague Moncef Gabbouj of the Tampere University of Technology in Tampere , Finland . I will have more to say about both of these activities in the future, but for now I wanted to respond to a question raised about my last post.

Specifically, Professor Frank Harrell, the developer of the extremely useful

**Hmisc**package, asked the following:How did you take into account model uncertainty? The uncertainty resulting from data mining to find nodes and thresholds for continuous predictors has a massive impact on confidence intervals for estimates from recursive partitioning.

The short answer is that model uncertainty was not accounted for in the results I presented last time, primarily because – as Professor Harrell’s comments indicate – this is a complicated issue for tree-based models. The primary objective of this post and the next few is to discuss this issue.

So first, what exactly is model uncertainty? Any time we fit an empirical model to data, the results we obtain inherit some of the uncertainty present in the data. For the specific example of linear regression models, the magnitude of this uncertainty is partially characterized by the standard errors included in the results returned by R’s

**summary()**function. This magnitude depends on both the uncertainty inherent in the data and the algorithm we use to fit the model. Sometimes – and classification tree models are a case in point – this uncertainty is not restricted to variations in the values of a fixed set of parameters, but it can manifest itself in substantial structural variations. That is, if we fit classification tree models to two similar but not identical datasets, the results may differ in the number of terminal nodes, the depths of these terminal nodes, the variables that determine the path to each one, and the values of these variables that determine the split at each intermediate node. This is the issue Professor Harrell raised in his comments, and the primary point of this post is to present some simple examples to illustrate its nature and severity.In addition, this post has two other objectives. The first is to make amends for a very bad practice demonstrated in my last two posts. Specifically, the classification tree models described there were fit to a relatively large dataset and then evaluated with respect to that same dataset. This is bad practice because it can lead to overfitting, a problem that I will discuss in detail in my next post. (For a simple example that illustrates this problem, see the discussion in Section 1.5.3 of Exploring Data in Engineering, the Sciences, and Medicine.) In the machine learning community, this issue is typically addressed by splitting the original dataset randomly into three parts: a training subset (Tr) used for model-fitting, a validation subset (V) used for intermediate modeling decisions (e.g., which variables to include in the model), and a test subset (Te) used for final model evaluation. This approach is described in Section 7.2 of The Elements of Statistical Learning by Hastie, Tibshirani, and Friedman, who suggest 50% training, 25% validation, and 25% test as a typical choice.

The other point of this post is to say something about the different roles of model uncertainty and data uncertainty in the practice of predictive modeling. I will say a little more at the end, but whether we are considering business applications like predicting customer behavior or industrial process control applications to predict the influence of changes in control valve settings, the basic predictive modeling process consists of three steps: build a prediction model; fix (i.e., “finalize”) this model; and apply it to generate predictions from data not seen in the model-building process. In these applications, model uncertainty plays an important role in the model development process, but once we have fixed the model, we have eliminated this uncertainty by fiat. Uncertainty remains an important issue in these applications, but the source of this uncertainty is in the data from which the model generates its predictions and not in the model itself once we have fixed it. Conversely, as George Box famously said, “all models are wrong, but some are useful,” and this point is crucial here: if the model uncertainty is great enough, it may be difficult or impossible to select a fixed model that is good enough to be useful in practice.

Returning to the topic of uncertainty in tree-based models, the above plot is a graphical representation of a classification tree model repeated from my previous two posts. This model was fit using the

**ctree**procedure in the R package**party**, taking all optional parameters at their default values. As before, the dataset used to generate this model was the Australian vehicle insurance dataset**car.csv**, obtained from the website associated with the book Generalized Linear Models for Insurance Data, by Piet de Jong and Gillian Z. Heller. This model – and all of the others considered in this post – was fit using the same formula as before: Fmla = clm ~ veh_value + veh_body + veh_age + gender + area + agecat

Each record in this dataset describes a single-vehicle, single-driver insurance policy, and clm is a binary response variable taking the value 1 if policy filed one or more claims during the observation period and 0 otherwise. The other variables (on the right side of “~”) represent covariates that are either numeric (veh_value, the value of the vehicle) or categorical (all other variables, representing the vehicle body type, its age, the gender of the driver, the region where the vehicle is driven, and the driver’s age).

As I noted above, this model was fit to the entire dataset, a practice that is to be discouraged since it does not leave independent datasets of similar character for validation and testing. To address this problem, I randomly partitioned the original dataset into a 50% training subset, a 25% validation subset, and a 25% test subset as suggested by Hastie, Tibshirani and Friedman. The plot shown below represents the

**ctree**model we obtain using exactly the same fitting procedure as before, but applied to the 50% random training subset instead of the complete dataset. Comparing these plots reveals substantial differences in the overall structure of the trees we obtain, strictly as a function of the data used to fit the models. In particular, while the original model has seven terminal nodes (i.e., the tree assigns every record to one of seven “leaves”), the model obtained from the training data subset has only four. Also, note that the branches in the original tree model are determined by the three variables agecat, veh_body, and veh_value, while the branches in the model built from the training subset are determined by the two variables agecat and veh_value only.These differences illustrate the point noted above about the strong dependence of classification tree model structure on the data used in model-building. One could object that since the two datasets used here differ by a factor of two in size, the comparison isn’t exactly “apples-to-apples.” To see that this is not really the issue, consider the following two cases, based on the idea of bootstrap resampling. I won’t attempt a detailed discussion of the bootstrap approach here, but the basic idea is to assess the effects of data variability on a computational procedure by applying that procedure to multiple datasets, each obtained by sampling with replacement from a single source dataset. (For a comprehensive discussion of the bootstrap and some of its many applications, refer to the book Bootstrap Methods and their Application by A.C. Davison and D.V. Hinkley.) The essential motivation is that these datasets – called bootstrap resamples – all have the same essential statistical character as the original dataset. Thus, by comparing the results obtained from different bootstrap resamples, we can assess the variability in results for which exact statistical characterizations are either unknown or impractical to compute. Here, I use this idea to obtain datasets that should address the “apples-to-apples” concern raised above. More specifically, I start with the training data subset used to generate the model described in the previous figure, and I use R’s built-in

**sample()**function to sample the rows of this dataframe with replacement. For an arbitrary dataframe DF, the code to do this is simple:> set.seed(iseed)

> BootstrapIndex = sample(seq(1,nrow(DF),1),size=nrow(DF),replace=TRUE

> ResampleFrame = DF[BootstrapIndex,]

The only variable in this procedure is the seed for the random sampling function

**sample()**, which I have denoted as iseed. The extremely complicated figure below shows the**ctree**model obtained using the bootstrap resample generated from the training subset with iseed = 5.

Comparing this model with the previous one – both built from datasets of the same size, with the same general data characteristics – we see that the differences are even more dramatic than those between the original model (built from the complete dataset) and the second one (built from the training subset). Specifically, while the training subset model has four terminal nodes, determined by two variables, the bootstrap subsample model uses all six of the variables included in the model formula, yielding a tree with 16 terminal nodes. But wait – sampling with replacement generates a significant number of duplicated records (for large datasets, each bootstrap resample contains approximately 63.2% of the original data values, meaning that the other 36.8% of the resample values must be duplicates). Could this be the reason the results are so different? The following example shows that this is not the issue.

This plot shows the

**ctree**model obtained from another bootstrap resample of the training data subset, obtained by specifying iseed = 6 instead of iseed = 5. This second bootstrap resample tree is much simpler, with only 7 terminal nodes instead of 16, and the branches of the tree are based on only four of the prediction variables instead of all six (specifically, neither gender nor veh_body appear in this model). While I don’t include all of the corresponding plots, I have also constructed and compared the**ctree**models obtained from the bootstrap resamples generated for all iseed values between 1 and 8, giving final models involving between four and six variables, with between 7 and 16 terminal nodes. In all cases, the datasets used in building these models were exactly the same size and had the same statistical character. The key point is that, as Professor Harrell noted in his comments, the structural variability of these classification tree models across similar datasets is substantial. In fact, this variability of individual tree-based models was one of the key motivations for developing the random forest method, which achieves substantially reduced model uncertainty by averaging over many randomly generated trees. Unfortunately, the price we pay for this improved model stability is a complete loss of interpretibility. That is, looking at any one of the plots shown here, we can construct a simple description (e.g., node 12 in the above figure represents older drivers – agecat > 4 – with less expensive cars, and it has the lowest risk of any of the groups identified there). While we may obtain less variable predictions by averaging over a large number of these trees, such simple intuitive explanations of the resulting model are no longer possible.I noted earlier that predictive modeling applications typically involve a three-step strategy: fit the model, fix the model, and apply the model. I also argued that once we fix the model, we have eliminated model uncertainty when we apply it to new data. Unfortunately, if the inherent model uncertainty is large, as in the examples presented here, this greatly complicates the “fix the model” step. That is, if small variations in our training data subset can cause large changes in the structure of our prediction model, it is likely that very different models will exhibit similar performance when applied to our validation data subset. How, then, do we choose? I will examine this issue further in my next post when I discuss overfitting and the training/validation/test split in more detail.

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