Regression and classification trees

Roff and Roff (Reference Roff and Roff2003) initially suggested regression tree analysis to determine factors contributing to the risk of extinction. Several studies have since used a regression tree analysis to assess extinction probability (Jones et al. Reference Jones, Fielding and Sullivan2006; Boyer Reference Boyer2008, Reference Boyer2010; Davidson et al. Reference Davidson, Hamilton, Boyer, Brown and Ceballos2009). In our case study the predicted category consisted of two states, ‘threatened’ ( = 1) and ‘non-threatened’ ( = 0), and thus regression and classification trees were identical. In principal, classification trees could be used to identify each different IUCN category. We restricted the analysis to the two states and used the regression tree approach, owing to insufficient data.

Logistic regression

Our aim was to determine the accuracy of models created using logistic regression at predicting the correct assignment of a species as threatened or non-threatened based on LH characteristics. As done with the regression trees, species in the non-threatened category were coded as 0 and those in the threatened category as 1. To use the model as a mechanism for placement of a species into the threatened or non-threatened category, we required a threshold for the fitted value, for example 0.5, above which species were placed into the threated category and below which they were placed into the non-threatened category. Alternatively, we could have selected two thresholds, such as 0.25 and 0.75, and placed species below the lower threshold in the non-threatened category and species above the upper threshold in the threatened category, classifying species lying between the two thresholds as ‘uncertain.’ We explored the consequences of both approaches.

An important point to note in this method of analysis is that, whereas the stopping point for the stepwise regression is defined by a metric such as the Akaike information criterion (AIC), the adequacy of the model in the present context was measured by the assignment to the two categories: because of this, it was possible for the ‘best’ model to contain more or fewer variables than that specified by the ‘best’ stepwise logistic model.

Discriminant function analysis

There are several covariance structures that can be identified when performing a discriminant function analysis: homoscedastic, spherical, proportional, group spherical, equal correlation and heteroscedastic. Principal components can also be specified for analysis in a discriminant function analysis. In the analyses here, to compare statistical tests, we used the covariance structure that correctly assigned the most threatened species based on LH characteristics.

Determining the probability of correct assignment by chance alone

An important consideration is the probability of assigning a species to the correct category, threatened or non-threatened, by chance alone. To determine this we used a simulation model (coding in R given in Appendix 1, see supplementary material at Journals.cambridge.org/ENC). First, we generated a vector, V, of length N, where N was the total number of species in the sample with ones in the first n ₁ rows and zeros in the remaining N – n ₁ rows, the former being the number of threatened species and the latter the number non-threatened species. These zeros and ones were rearranged at random in the vector. The number of correct assignments in the threatened category, N ₁, was given by

that is, the number of ones in the first n₁ rows, and the number of correct assignments in the non-threatened category, N ₀ was namely the number of zeros in the remaining N – n ₁ rows. The total number of correct assignments, N _T, was thus N_T =N ₁+N ₀. These three numbers were stored and the process repeated to generate three new samples. The whole process was replicated 10 000 times, generating a matrix with three columns (total correctly assigned, correctly assigned to threatened, correctly assigned to non-threatened) and 10 000 rows. From this matrix we calculated the distribution of correct assignments. For each column we determined the probability of correctly assigning n_j species (j = 0 to N, j = 0 to n ₁, j = 0 to N – n ₁) as S _J/10000, where S _J was the number of times n _j appeared in the relevant column.

Determining the preferred method

As indicated below, regression tree analysis was not satisfactory for either of the two data sets (butterflies or moths) and, therefore, our further analysis focused upon logistic regression versus discrimination function analysis. We compared the ability of these two methods to correctly classify species into the threatened or non-threatened category with a χ² analysis. Of particular interest were those species which were incorrectly classified according to one or both methods: we plotted the predicted values from the logistic regression against the predicted values from the discriminant function analysis to see whether the species that were classified differently fell near the 0.5 cutoff. It is safer to classify non-threatened species as threatened than it is to classify threatened species as non-threatened, because in the former case a species will receive attention, but in the latter case a threatened species that needs attention will be overlooked. Therefore, we used the number of correctly classified threatened species in a final comparison of methods to determine which method was to be preferred, at least for the data sets assessed here.

Data sets

The Kotiaho et al. (Reference Kotiaho, Kaitala, Komonen and Paivinen2005) butterfly data set consisted of 94 species and 13 predictor variables: family, genus, species, abundance, distribution, distribution change, resource distribution, extent of range, larval specificity, female size, length of flight period, mobility and habitat breadth (see Komonen et al. Reference Komonen, Grapputo, Kaitala, Kotiaho and Paivinen2004 and Kotiaho et al. Reference Kotiaho, Kaitala, Komonen and Paivinen2005 for variable definitions). Because the primary criterion for listing these species according to IUCN threat status is a function of three ‘distribution’ variables (distribution, distribution change, and extent of range), we included these variables as predictor variables to assess whether any of the other variables were better at predicting IUCN threat status. After initial analysis, these distribution variables were excluded from subsequent analyses to determine whether any more easily accessible variables (such as those obtainable from published natural history descriptions) could be used to predict threat status. One species, Glaucopsyche alexis, was listed using only abundance as the criterion, and so this species was not used in the analyses. Thirteen other species were excluded due to missing data. The analysed data consisted of 18 threatened and 62 non-threatened species. The rest of the variables, excluding resource distribution due to lack of data, were used to predict IUCN threat status as given in the 2000 Finnish Red List (Rassi et al. Reference Rassi, Alanen, Kanerva and Mannerkoski2001). One of the principal aims of the analysis was to investigate the ability of variables that are readily available from published data on the natural history of a species to determine threat status. Therefore, we ran the analyses with and without the variable ‘abundance,’ which might typically be difficult to estimate and, in many cases, unavailable. However, due to the similarity of the results, only the analyses excluding abundance are reported here (Appendix 2 provides a table of the analyses including abundance, see supplementary material at Journals.cambridge.org/ENC).

Two data sets on moths were used, one on noctuids (Mattila et al. Reference Mattila, Kaitala, Komonen, Kotiaho and Paivinen2006) and one on geometrids (Mattila et al. Reference Mattila, Kotiaho, Kaitala and Komonen2008). These two data sets consisted of 284 and 306 species, respectively, and each had the same eight predictor variables: genus, species, male size, length of flight period, larval specificity, resource distribution, overwintering stage, and distribution change. After we ran the analyses with each data set, we combined them into a single data set with the added variable ‘taxonomic family’ to increase the power of the analyses and avoid issues of non-independence by using closely related species. In total, we excluded 40 species from the data sets due to missing data. The analysed data consisted of 68 threatened and 482 non-threatened species. Distribution change was the only distribution variable for these data sets and, after initial analysis, was, as before, excluded to determine which other variables may be important for predicting IUCN threat status. As previously noted, the response variable for all data sets was binomial, threatened or non-threatened. It included all species listed as near threatened or higher according to the IUCN threat status as threatened and the rest as non-threatened.