Multiblock redundancy analysis

An original method, called multiblock redundancy analysis, is proposed in the multiblock modelling framework, adapted to the setting in which a block Y of several variables is to be explained by K explanatory variable blocks (X ₁, …, X _K). The main idea is that each dataset is summed up by a latent variable (or component) which is a linear combination of the variables derived from this dataset. Multiblock redundancy analysis can be considered as a component-based estimation technique where the latent variable estimation plays a central role. More precisely, the method derives a global component t ⁽¹⁾, related to all the explanatory variables merged in the dataset X=[X ₁|…|X _K], closely related to a component u ⁽¹⁾, linear combination of the variables in Y. Moreover, the component t ⁽¹⁾ sums up the partial components (t ₁⁽¹⁾, …, t _K⁽¹⁾), respectively, associated with the blocks (X ₁, …, X _K). A simplified example of a conceptual scheme, highlighting the relationships between the variable blocks and their associated components is proposed in Figure 1.

Fig. 1. Example of multiblock data structure and associated conceptual scheme of multiblock redundancy analysis, highlighting the relationships between the variable blocks (X ₁, X ₂, Y) and their associated components (t ₁⁽¹⁾, t ₂⁽¹⁾, u ⁽¹⁾) for the first dimension.

The global component t ⁽¹⁾ sums up the partial components and is sought such as its squared covariance with u ⁽¹⁾ is as large as possible. The solutions are derived from the eigenanalysis of a matrix which involves the datasets Y and (X ₁, …, X _K). Thereafter, the partial components t ₁⁽¹⁾, …, t _K⁽¹⁾ are given by the normalized projection of u ⁽¹⁾ on each subspace spanned by variables in blocks X ₁, X ₂, …, X_K . It follows that the global component t ⁽¹⁾ is a synthesis of the partial components (t ₁⁽¹⁾, …, t _K⁽¹⁾) and therefore, the relationships of a given block X _k with Y is investigated through the relationships of t _k⁽¹⁾ with t ⁽¹⁾. (For a detailed account of multiblock redundancy analysis see [Reference Bougeard and Qannari19, Reference Bougeard20].)

In order to improve the prediction ability of the model, higher-order solutions are obtained by considering the residuals of the orthogonal projections of the datasets (X ₁, …, X _K) onto the subspace spanned by the first global component t ⁽¹⁾. Thereafter, the second-order solution is performed by replacing the original datasets (X ₁, …, X_K ) by their residuals in the criterion to maximize. This leads to determination of a second component u ⁽²⁾ in the Y space, a second component t ⁽²⁾ in the space spanned by the X variables and the associated latent variables in the various blocks of variables. The rationale behind this step is to investigate other directions in the space spanned by the X variables in order to shed light on the Y variables from various perspectives thus improving their prediction. Subsequent components (t ⁽²⁾, …, t ^{(H )}) can be found by reiterating this process. As a consequence, these components can be expressed as linear combinations of X, t ^{(h )}=Xw ^{*(h )}, where w ^{*(h )} is the vector of loadings associated with t ^{(h )}. They are mutually orthogonal with each other and ranked by order of importance in explaining the total variation of Y. This allows orthogonalized regression which takes into account all the explanatory variables, and Y is split up into for h=(1, …, H), Y ^{(h )} being the matrix of residuals of the model based on h components. This leads to the model: for h=(1, …, H). From a practical point of view, the final model may be obtained by selecting the optimal number of components to be retained with a validation technique such as twofold cross-validation [Reference Stone22]. This consists of splitting the whole dataset into two sets, namely a calibration set and a validation set. The calibration set is used to select the parameters of the model and the fitting ability of the model, and the validation set is used to compute the prediction ability. Among all the models corresponding to the various values of h, a model with a satisfactory fitting ability and good prediction ability is retained. Orthogonalized regression handles the multicollinearity problem by selecting a subset of orthogonal components and avoiding the latest components which can be deemed to reflect noise only.

Interpretation tools

For the optimal dimension h, the exponential of the regression coefficients associated with each explanatory variable x _p and each variable to be explained y _q, , are interpreted as the incidence rate ratio (IRR) [Reference Dohoo, Martin and Stryhn1]. Bootstrapping simulations are performed to provide standard deviations and tolerance intervals (TIs), associated with the regression coefficient matrix [Reference Efron and Tibshirani23, Reference Rebafka, Clémençon and Feinberg24]. An explanatory variable is considered to be significantly associated with a variable in Y if the 95% TI associated with the IRR does not contain 1. IRRs are interesting indices to link explanatory variables with each of the variables in Y.

However, if the number of variables in Y is large, the epidemiologist needs to sort the explanatory variables in a global order of priority. The variable importance for the projection (VIP) proposed in the PLS regression framework is a relevant tool [Reference Chong and Jun25, Reference Wold and Waterbeemd26]. The VIP values sum up the overall contribution of each explanatory variable to the explanation of the Y block for a model involving (t ⁽¹⁾, …, t ^(h)) components. As the VIP indices verify, for a given dimension, the property ∑^P _p=1(VIP² _p)/P=1, where P is the total number of variables in X, they can be expressed as percentages. Associated standard deviations and tolerance intervals, computed using bootstrapped results, may additionally be computed. For the optimal dimension h, each explanatory variable is considered as significantly associated with the Y block if the 95% TI associated with the VIP does not contain the threshold value 0·8 [Reference Gosselin, Rodrigue and Duchesne27].

Finally, it interesting for the epidemiologist to assess the contributions of the explanatory blocks to the modelling task. Several indices are proposed in the literature and the block importance in the prediction (BIP) appears to be the most relevant [Reference Vivien, Verron and Sabatier28]. For an optimal dimension h, the BIP values are based on the weighted average values of the coefficients (a ₁^(h)2, …, a _K^(h)2) which reflect the importance of each block X _k in the Y block explanation. Moreover, the BIP can also be computed to assess the importance of each block X _k in explaining each variable in Y. As the BIP indices verify, for a given dimension the property ∑^K _k=1(BIP² _k)/K=1, where K is the number of explanatory blocks, can be expressed as percentages. Associated standard deviations and tolerance intervals, computed using bootstrapped results, may be given. It follows that for the optimal dimension h, each block X _k is considered to be significantly associated with the overall block Y or with each variable in Y, if the 95% TI associated with the BIP does not contain the threshold value 0·8 [Reference Vivien, Verron and Sabatier28].

Software

Statistical procedures and associated interpretation tools were performed using code programs developed in Matlab®(The MathWorks Inc., USA) and also made available in R (http://www.r-project.org/). The code source is available upon request from the corresponding author.

Illustration dataset

Both in human and veterinary epidemiological surveys, it frequently occurs that the data at hand can be organized into blocks. The complex health issue (Y block), described by several variables, needs to be explained with a large number of explanatory variables organized into meaningful blocks (X ₁, …, X _K), related to feeding, environment, genetic heritage, among others.

An example is given in the field of veterinary epidemiology. The population consists of a cohort of slaughtered broiler chicken flocks from all the European Union licensed slaughterhouses in France [Reference Lupo29]. A large number (351) of broiler chicken flocks are randomly selected by two-stage sampling, stratified per slaughterhouse and based on random selection of the day of slaughter and of the flock sequence number in the slaughtering schedule of that day. On the one hand, the information collected on each flock is prospective at slaughterhouse, and consists of recording the transport conditions to the slaughterhouse, the number of dead animals on arrival, the slaughtering conditions, the condemnation rate and the official sanitary reasons for condemnation. On the other hand, retrospective information is collected and involves the conditions during the rearing period, health history, daily mortality, catching and loading conditions. The aim is to assess the overall risk factors for a composite outcome: losses in broiler chickens (Y), described by four variables, i.e. the first-week mortality rate, the mortality rate during the rest of the rearing, the mortality rate during the transport to the slaughterhouse, and the condemnation rate at the slaughterhouse.

The explanatory variables are first selected on the basis of the main factors reported in the literature and of an earlier univariate screening applied to each dependent variable. These 68 selected variables are organized in four thematic blocks related to farm structure and systematic husbandry management practices (X ₁, 16 variables), flock characteristics and on-farm history of the chicks at placement (X ₂, 14 variables), flock characteristics during the rearing period (X ₃, 17 variables) and catching, transport and lairage conditions, slaughterhouse and inspection features (X ₄, 21 variables). Indicator (dummy) variables are considered for the categorical variables. All the 68 putative explanatory variables are included in the multiblock analysis, fitted with a backwards-selection procedure.

As all the variables are expressed in different units, they are column centred and scaled to unit variance. As the explanatory variables have been standardized, the total variance in each block is equal to the number of variables in this block. This motivates the block scaling in order to put the blocks on the same footing [Reference Westerhuis and Coenegracht30]. For this purpose, each of the (K=4) explanatory block is accommodated with a scaling factor to set them at the same total variance 1/K.