Data

Data were collected over consecutive years from five cohorts of 200 straight-bred Scottish Blackface lambs. All lambs were given anthelmintic every 28 days. Within each year, monthly FEC, weights, IgA concentrations, Peps and eosinophilia were measured using standard procedures between May and October with additional post-mortem counts (Stear et al. Reference Stear, Bairden, McKeller, Scott, Strain and Bishop1999a ; Strain et al. Reference Strain, Bishop, Henderson, Kerr, McKeller, Mitchell and Stear2002; Henderson and Stear, Reference Henderson and Stear2006). In total, 20 different measurements were collected on live animals. However, the data are unbalanced with different numbers of animals tested for each trait (Table 1). Summary statistics for each trait in the month of October are provided by Davies et al. (Reference Davies, Stear and Bishop2005).

Table 1. Summary statistics for 20 predictor variables including median values, ranges (minimal and maximal values) and the per cent of missing values from the 490 necropsied lambs

Post-mortem adult worm number and length were collected from 531 lambs. After data editing to remove lambs with incomplete information 490 lambs remained. In total seven categories of adult nematode were found with variation in prevalence across the five years. T. circumcincta were found in all lambs (Stear et al. Reference Stear, Bairden, Bishop, Gettinby, McKellar, Park, Strain and Wallace1998). We use worm number and worm length to refer to T. circumcincta only. The distribution of adult T. circumcincta is overdispersed and follows a negative binomial distribution (Henderson and Stear, Reference Henderson and Stear2006). Adult worm length was defined as the average length of at least 25 randomly selected adult female worms, and had a distribution consistent with a normal distribution (Stear et al. Reference Stear, Fitton, Innocent, Murphy, Rennie and Matthews2007).

Univariate analysis

We assessed the linear relationships between each response variable and the list of independent variables (Table 1) using a series of linear regressions. For each response, the p-values were corrected for multiple comparisons using the methods described by Bretz et al. (Reference Bretz, Hothorn and Westfall2011). The p-values were adjusted using the p-adjust function in R (R Core Team, 2013).

In addition to the original variables (Table 1), we also considered other possible indicators of infection. The relationship between worm number and FEC is not linear (Bishop and Stear, Reference Bishop and Stear2000); low FECs occur in animals with both low and high worm numbers. Therefore, quadratic relationships between FECs and worm length and number were considered. To predict worm number and worm length, we considered changes in lamb weights in July and August, and August and September. Lastly, there may be interactions between some of the variables. Increased IgA activity is negatively correlated with FECs (Strain et al. Reference Strain, Bishop, Henderson, Kerr, McKeller, Mitchell and Stear2002). Interaction terms between FECs and IgA across the 6 months were included.

Multivariate analyses

Multiple linear regression (MR) is a commonly used method for estimating the importance of multiple independent variables in accounting for variation in a dependent variable. It is also used for prediction (Raadsma et al. Reference Raadsma, Kingsford, Suharyanta, Spithill and Piedrafita2008; Nathans et al. Reference Nathans, Oswald and Nimon2012). In this paper, we take a regression approach to predict the intensity of nematode infection in lambs using a range of traits. However, many of the potential predictive traits are correlated. Some correlations arise because the data are longitudinal. Others arise for biological reasons. For example, plasma IgA and peripheral eosinophilia have similar kinetics (Henderson and Stear, Reference Henderson and Stear2006). High correlations between variables can cause multicollinearity problems by inflating estimated standard errors of regression coefficients (Dunteman, Reference Dunteman1989) creating difficulty in finding statistically significant variables. Principal component analysis (PCA) is a dimension reduction tool that can be used in these circumstances. In multivariate problems, PCA aims to make independent linear combinations of the original variables which account for most of the variation in the data, and correlation principal component regression (CPCR) can be used as a multivariate calibration method to overcome multicollinearities between regression variables (Jolliffe, Reference Jolliffe2002).

For both responses – worm number and length – we performed PCA on the full set of variables, reducing the dimensionality to relatively few components. By selecting the components most correlated to the response variable and analysing each component weight, or loading, this method assesses the importance of each variable in prediction (Magidson, Reference Magidson, Abdi, Chin, Esposito Vinzi, Russolillo and Trinchera2013).

Our interest lies primarily in the predictive ability of each regression model. The model selection criteria used was root mean squared error of prediction (RMSEP) for worm length and root mean squared log error of prediction (RMSLEP) for worm number (described below). For each response, we compared 6 models, three versions of the MR model and three versions of the CPCR model (Table 2). Specifically, the alternative versions allowed us to compare the predictive ability of the full set of variables (models MR3 and CPCR3) with the set of variables found to be significant in the univariate analyses (models MR2 and CPCR2) in addition to assessing the value of repeated measurements (models MR1 and CPCR1).

Table 2. Description of the 6 models applied to the two variables

Table 3. Univariate significant relationships found between worm length and the set of predictor variables (corrected for sex and year of birth). For each variable, the correlation and RMSEP are given. The p-values reported for quadratic relationships correspond to the quadratic term

Table 4. Univariate significant relationships found between worm number and the set of predictor variables (corrected for sex and year of birth). For each variable, the correlation and RMSLEP are given. The p-values reported for quadratic relationships correspond to the quadratic term

Correlation principal component regression

The method used was adapted from Sun (Reference Sun1995). Given a training dataset of size n with response variable Y and P explanatory variables stored in matrix X of dimension n × P:

1. 1. For variable X _j (j= 1…P), set ${\widetilde{X_j}} = {(X_j - \bar X_j )} / $ ${\left( {\sqrt {var(X_j )}} \right)}$ . This produces a matrix $\widetilde{X}$ , a scaled and centred version of X.

2. 2. Find a set of linear combinations PC ₁…PC _P such that for lamb i,

   $$PC_{ij} = \mathop \sum \limits_{\,p = 1}^P c_{\,jp} \tilde X_{ip},$$
   where c _jp are the component loadings.

3. 3. Regress Y on the A principal components, PC ₁…PC _A , most correlated with Y. Selecting the value of A is discussed in the next section.

4. 4. Predict new observation y′ by

   $$y^{\prime} = \bar y + \mathop \sum \limits_{\,p = 1}^A \hat b_p PC_p, $$
   where $\bar y\; $ is the mean value of the response variable Y and $\hat b_1, \ldots, \hat b_A $ are estimated regression coefficients.

Model selection

To find the best predictor of worm number or worm length, we used 10-fold cross-validation to select the value of A (step 3 in CPCR) which minimized the RMSEP, defined as

$${\rm RMSEP} = \sqrt {\displaystyle{1 \over n}\mathop \sum \limits_{i = 1}^n (y^{\prime}_i - \hat y^{\prime}_i )^2} $$

(Sun, Reference Sun1995). This is a function of the difference between the true value $y_i^{\prime} $ and the predicted value $\hat y_i^{\prime} \; \; $ with each difference equally weighted. The RMSLEP

$${\rm RMSLEP} = \sqrt {\displaystyle{1 \over n}\mathop \sum \limits_{i = 1}^n \left( {{\rm log}(y_i^{\prime} + 1) - {\rm log}\left( {\hat y_i^{\prime} + 1} \right)^2} \right)}, $$

is more appropriate for data over a larger range. Worm numbers in this data are between 100 and 28 400. Therefore, any slight deviations from the true values in the upper tail of this distribution will heavily influence the value of RMSEP. We therefore used RMSEP to choose the value of A when modelling an average worm length and we used RMSLEP when modelling a worm number.

In order to compare the results from the 6 models (Table 2), we randomly sampled 300 observations to act as a training set and the remaining data were used as a test set and RMSEP (or RMSLEP in the case of worm number) was calculated to access the predictive ability of the models. This process was repeated 1000 times. RMSEP and RMSELP are only informative about the accuracy of a predictor.

To assess precision, we computed prediction bands. For any linear regression model, uncertainty arises due to the variability between the fitted values and the observed values. However, given that the fitted values are only expectations of the observed data, applying a fitted regression model to new data presents additional sources of variation due to the uncertainty in these expectations (Gelman et al. Reference Gelman, Carlin, Stern and Rubin2004). Since we assumed normality in modelling worm length, we computed prediction intervals in R using the predict.lm function. However, we took a Bayesian approach to compute prediction bands for worm number since we used negative binomial models. This was achieved by first sampling from the joint posterior distribution of all estimated regression parameters given in the observed data, and given these samples and new data, we simulated from the data distribution (Gelman et al. Reference Gelman, Carlin, Stern and Rubin2004).

The best model minimized RMSEP (or RMSLEP) and produced narrow prediction bands.

Rotating principal components

Principal components are useful if they are interpretable and rotating a set of components can ease interpretation (Jolliffe, Reference Jolliffe2002). Variables that are most influential in prediction are more heavily weighted in the first component, which is the component most correlated with the response variable, and have previously been referred to as prime predictors (Magidson, Reference Magidson, Abdi, Chin, Esposito Vinzi, Russolillo and Trinchera2013). We rotated the set of components using the varimax method, which is designed to inflate higher component weights and decrease the lower weights (Dunteman, Reference Dunteman1989).

Missing data

A major constraint in using principal component regression is that we require observations from all of the original variables for all of the lambs, which is not the case in the dataset (Table 1). One method is to simply use only lambs with a complete set of observations in any analysis. However, very few lambs had observations for every variable. There are several statistical methods for imputation of missing data. We used singular value decomposition (Troyanskaya et al. Reference Troyanskaya, Cantor, Sherlock, Brown, Hastie, Tibshirani, Botetein and Altman2001 and Wong, Reference Wong2013).