Mathematical description

The problem of estimating diet composition based on n-alkanes with a constraint system of linear equations, as introduced by Dove and Mayes (Reference Dove and Mayes1991), can be stated as follows.

Suppose d is the number of n-alkanes in plants and faeces. Each faecal sample can be considered a point on the d-Euclidean space, which describes the concentration of each of the d n-alkanes. Each plant species can be interpreted as a vector in the d-Euclidean space, defining the value of each n-alkane in that plant. To illustrate this we use a fictitious example with two n-alkanes, two plant species, and six faecal samples (Figure 1).

Figure 1 Example representing two n-alkanes (axes A ₁ and A ₂), two plant species (vectors P ₁ and P ₂), and six faecal samples (the six dots in the figure). The shaded area is the two-dimensional cone generated by vectors P ₁ and P ₂.

Diets are linear combinations, i.e. weighted sums of the vectors representing the plant species. The weight or coefficient of each vector defines the quantity of the corresponding species in the diet. Each coefficient value, divided by the sum of the coefficients, gives the proportion of each plant species in the diet. If P ₁, P ₂,…, P _p are the d-vectors representing p plant species, each vector indicating the concentrations of n-alkanes on that species, the linear combination with coefficients c ₁, c ₂,…, c _p is c ₁P ₁ +c ₂P ₂+…+ c _pP _p.

Clearly, linear combinations with negative coefficients are ‘nonsensical diets’. Hence, we must restrict our attention to linear combinations having non-negative coefficients. The set of all non-negative linear combinations of vectors is called the cone generated by those vectors. In Figure 1 the cone generated by vectors P ₁ and P ₂ is the shaded region. We use C to denote the cone generated by the vectors corresponding to species, i.e.

The estimation of diets from faecal samples F ₁, F ₂,…, F _q takes one sample F at a time and seeks whether either

1. F belongs to the cone C, or

2. F is a point outside of C.

This is determined by solving the system of linear equations

where A is the d × p matrix whose columns are the vectors P ₁, P ₂,…, P _p representing the plant species. If all components of the solution x are non–negative then (i) occurs, and x specifies the composition of the corresponding species in the faeces.

If there is a negative component, we are faced with situation (ii), indicating that only ‘nonsensical diets’ can explain faeces F. This may result from errors in measuring the concentrations of n–alkanes, or from the existence of plant species which are included in the diet but not sampled in the field. The usual procedure in this case (e.g. Mayes et al., Reference Mayes, Beresford, Lamb, Barnett, Howard, Jones, Eriksson, Hove, Pedersen and Staines1994; Salt et al., Reference Salt, Mayes, Colgrove and Lamb1994; Dove and Moore, Reference Dove and Moore1995) is to find a non–negative vector of coefficients which ‘adequately approximates’ x. A reasonable approach consists of

1. (iii)identifying a point F′ in the cone C considered to be ‘similar’ to F, and

2. (iv)using F′ instead of F, proceed as in (i) solving the system of equations (S).

Usually the projection of F onto C, i.e. the point in C which is closest to F, is selected to be F′. In the example of Figure 1 there are two points in case (ii). Each of these points will be replaced by its projection onto C, which will lie in the ray of the cone defined by vector P ₁. This implies that the herbage mixtures that will be derived from these two points consist only of P ₁.

The estimated diet of the animal is finally computed from the solutions obtained with faecal samples F ₁, F ₂,…, F _q. Often, the diet is defined to be the average of the q solutions. Note that this diet is in fact the solution of the linear system of equations (S) with F equal to the average point of the projections of the faecal samples F ₁, F ₂,… F _q onto C. (The projection onto C of a point in C coincides with the point.)

We implicitly assumed that the number of n–alkanes is equal to the number of plant species, i.e. that A is a square (and non–singular) matrix. If there are more alkanes than species the situation does not change substantially, apart from a larger percentage of faecal samples F in condition (ii) that may now be expected. Figure 2 is an example of three n–alkanes, two plant species, and six faecal samples. Only one point is in the cone.

Figure 2 Example representing three n-alkanes (axes A ₁, A ₂ and A ₃), two plant species (vectors P ₁ and P ₂), and six faecal samples (the six dots in the figure). The shaded area is the two-dimensional cone generated by vectors P ₁ and P ₂.

Consider now that there are more plant species than n–alkanes. Figure 3 is an example of two n–alkanes, three plant species, and six faecal samples.

Figure 3 Example representing two n-alkanes (axes A ₁ and A ₂), three plant species (vectors P ₁, P ₂ and P ₃), and six faecal samples (the six dots in the figure). The shaded area is the two-dimensional cone generated by vectors P ₁, P ₂ and P ₃.

The situation has now changed considerably. Now any non–negative linear combination of vectors P ₁ and P ₃ of Figure 3 defines a new vector P contained in the cone generated by P ₁ and P ₃. Any point F inside the cone generated by P and P ₂ is a non–negative linear combination of P (and consequently of P ₁ and P ₃) and P ₂. Since there may be be infinitely many vectors P defined from P ₁ and P ₃ such that F is inside the cone generated by P and P ₂, system (S) may have an infinite number of non–negative solutions. In other words, the concentration of n–alkanes in faecal samples may result from infinitely many different plant mixtures.

Whenever the number of species exceeds the number of n–alkanes, the usual approach is to group species into relevant categories (e.g. Hulbert et al., Reference Hulbert, Iason and Mayes2001; Rao et al., Reference Rao, Iason, Hulbert, Mayes and Racey2003). This is settled defining a partition of the set of vectors P ₁, P ₂,…, P _p into d (the number of n–alkanes) subsets, and identifying each subset with a certain vector. Once this is done, the procedure described for case d = p is used to estimate the diet from the faecal samples F ₁, F ₂,…, F _q. The estimated diet consists of the non–negative coefficients of the linear combination of the vectors identified with the subsets of the partition.

However, there is no satisfactory criteria to decide how species should be grouped (in other words, how to define a suitable d − partition of the set of vectors P ₁, P ₂,…, P _p), and how to weight species within each group (in other words, how to select a vector which adequately represents a whole subset of vectors). The choices made with respect to those questions will affect the final result and will ultimately determine the estimated diet.

We suggest an alternative approach to estimate diet composition that avoids these difficulties and allows arbitrary numbers of plant species and n–alkanes.

The model

Let P ₁, P ₂,…, P _p be the d − vectors representing the p potentially selected plant species, where d is the number of n–alkanes used, and let C be the cone generated by these vectors. If P is one of the vectors P ₁, P ₂,…, P _p, let C _P be the cone generated by the remaining vectors. We denote by F _i, i = 1, 2,…, q, the projection onto C of the point on the d − Euclidean space representing each of the q faecal samples, and define Φ = {F ₁, F ₂,…, F _q} as the set of ‘corrected’ faecal samples.

We define feasible diet as every non–negative solution of the linear system Ax = F, for any point F in Φ, where A is the d × p matrix with columns P ₁, P ₂,…, P _p. There may be infinitely many feasible diets. Nevertheless, the set of diets is bounded by specified upper and lower bounds on the values of each component. Linear programming is a suitable tool to address questions about dietary composition such as:

• ● which are the maximum and minimum proportions of each species in the diet?

• ● which are the maximum and minimum proportions of each functional group (e.g. grasses, legumes, browse) in the diet?

• ● which is the minimum proportion of a particular plant species in those diets that satisfy some nutritional requirement (e.g. levels of nitrogen intake or tannin contents)?

In particular, if x _P denotes the component of x corresponding to plant P, the knowledge of M(i,P) = max{x _P, subject to Ax = F _i and x ≥ 0} and m(i,P) = min{x _P, subject to Ax = F _i and x ≥ 0}, for i = 1, 2,…, q, allow us to answer questions regarding presence or absence of plant species in the diet. For instance:

• ● which species are never eaten (absent species)?

• ● which species are always eaten (mandatory species)?

• ● which species are identifiable in some faecal samples but not in all (conditional mandatory species)?

We cannot confirm if species that do not fall in any of the previous categories (optional species) are eaten or not. Contrary to the absent species, whose corresponding concentrations of n-alkanes are not recovered in any faeces, there is evidence of the chemical markers of an optional plant species in faeces. However, the concentration of n-alkanes of an optional species is identical to those derived from certain combinations of other potentially selected plants. To confirm if an optional species is actually eaten may require further fieldwork to collect evidence of the utilisation of that species.

Absent species

Absent species are the plants not included in any diet. Species P is absent if the corresponding coefficient in every non-negative solution of Ax = F, for every F in Φ, is equal to zero. This can be determined by checking whether M(i,P) = 0, for i = 1, 2,…, q.

In Figure 4 species P ₄ is the unique absent plant.

Figure 4 Example representing three n-alkanes (axes A ₁, A ₂ and A ₃), four plant species (vectors P ₁, P ₂, P ₃ and P ₄), and six faecal samples (the six dots in the figure). The shaded area is the three-dimensional cone generated by vectors P ₁, P ₂, P ₃ and P ₄.

Once the absent species have been identified they can be removed from further consideration. Figure 5 represents the example in Figure 4 after the absent plant species P ₄ have been removed. From now on we assume that there are no absent species.

Figure 5 Example representing three n-alkanes (axes A ₁, A ₂ and A ₃), three plant species (vectors P ₁, P ₂, and P ₃), and six faecal samples (the six dots in the figure), obtained by removing P4 from the example in Fig. 5. The shaded area is the two-dimensional cone generated by vectors P ₁, P ₂, and P ₃.

The data sets

The two data sets consist of records of the n-alkane profiles of plant species and faeces of sheep and deer collected in experiments conducted in Australia and Portugal, respectively.