Background

Trophic interactions are fundamental components of biodiversity, directly contributing to ecosystem organization and dynamics [1]. Accurate reconstruction and quantification of the strengths of trophic interactions remains a challenge in most ecological systems [2]. Often, it is impossible to directly observe or document feeding relationships [3]. In many such cases, ratios of stable isotopes (typically those of carbon: ¹³C∶¹²C and nitrogen: ¹⁵N∶¹⁴N) can be used to investigate the diets of consumers [4]. Carbon isotope ratios distinguish primary producers that use different photosynthetic pathways (or that differ in other physiological or physiognomic attributes) and are conserved in the tissues of consumers, whereas ratios of nitrogen isotopes are strongly sensitive to trophic level (though they may vary spatially or with primary producer functional type). Accordingly, stable isotope data of both consumer and potential prey can be used to quantify a consumer's resource niche, can provide dietary information relevant across a range of temporal and spatial scales, and can distinguish dietary differences across hierarchies of animal communities [5], [6], [7], [8].

The extent to which inference can be successfully drawn from stable isotope data is dependent upon the isotopic uniqueness of a consumer's prey (here ‘prey’ may refer to any resource that is consumed by an organism). When different potential prey are isotopically distinct and the number of prey are greater than the number of isotopic tracers +1, analytical mixing models may be employed to assess the possible contributions of prey to a consumer's diet [9], [10], [11], [12]. Because many different combinations of dietary sources can produce a given set of isotope values under these conditions, quantitative tools are required to parse less likely trophic interactions from those that are more likely to occur. Bayesian mixing models can be used to numerically simulate posterior probability distributions that quantify the range and likelihood of all potential source combinations [7], [13], [14]. This approach requires prior knowledge of a consumer's diet to be designated, even if that knowledge is specified to be uninformative (i.e. that each prey item has an equal probability of contributing to the predator's diet). In addition, all isotopic mixing models require the accurate specification of prey isotope values and trophic fractionation factors [15].

Despite recent advances in Bayesian mixing models, estimates of dietary relationships may be inaccurate or uninformative when multiple prey are isotopically similar (this issue is problematic in non-Bayesian mixing models as well) [11]. Here we address the issue of isotopic similarity among prey that are not equally available to a consumer. Because the relative availability of a specific prey will theoretically have a direct impact on the consumer's diet, we propose a method to employ data reflecting these differences in availability to weight the probability distributions of a consumer's reliance on a particular prey. Because the precise relationship between a prey's inclusion to a predator's diet and a prey's availability is uncertain (and is not necessarily applicable to all prey in a predator's diet), we condition the influence of availability data on the isotopic uniqueness of a given prey.

Incorporating Biological Information

The quantification of a consumer's diet implicitly assumes that all dietary resources included in an analysis are potentially important. If an uninformative prior is used in a Bayesian mixing model, all prey are assumed to contribute equally to a predator's diet a priori. This specification allows isotopic data to maximally influence the results of the mixing model. Thus, in a system with n potential prey sources, the a priori assumption is that the consumer is an ultrageneralist, consuming a unit of biomass of prey i with the probability: c_i = n⁻¹. The unique isotopic distribution of prey relative to the consumer's isotope values can modify this probability. Nevertheless, the a priori assumption will be especially relevant when two prey occupy the same isotopic space. Here, the model will predict that isotopically similar prey contribute equally to a consumer's diet.

Additional biological information regarding prey sources may render such generalizations over-simplistic; if the relative availability of prey on the landscape is known (α₁, α₂, … ,α_n; where the sum of these elements is equal to unity), the underlying assumption may be revised to reflect these differences such that the probability of consuming a prey source is c_i = α_i. Accordingly, the system operates under conditions imposed by interaction neutrality (consumption in proportion to prey abundance) [16], [17], as opposed to ultrageneralism (consumption in proportion to the number of prey available to the consumer).

In theory, prey availability data, as quantified by abundance, biomass, consumer preference, or a combination thereof, can be used to inform dietary relationships within the framework of traditional Bayesian mixing models. We acknowledge upfront that, like all aspects of isotopic mixing models, such a practice should be used with caution. Specifically, there exists an implicit assumption that prey availability and consumer-prey interactions are directly related for every prey item that is included in the analysis. Importantly, the calculation of a consumer's diet based on prey availability and/or isotopic data are not equivalently informative. Isotopic data of a consumer and its potential prey are empirical measurements that track the flow of matter within a physical system. The relationship between isotopic data and trophic interactions has been well established in many ecosystems [4], [6], [18], [19]. On the other hand, the relationship between prey availability and diet choice is still not well understood [20], need not be system-specific [21], and may differ across prey, even for the same predator [21]. In these scenarios, prey availability data should not be introduced indiscriminately to inform Bayesian mixing models. Additionally, the use of prior information in Bayesian mixing models is subject to a number of important constraints, such that incorporation of biological information by means other than the Bayesian paradigm may be advantageous, depending on what data are available for a particular system.

Post-hoc adjustments vs. the formulation of Prior Distributions

Bayesian isotope mixing models allow researchers to apply prior information to an isotopic system, thereby making use of different sources of biological data that provide information regarding a consumer's diet. Prior distributions represent the a priori knowledge of a consumer-resource relationship, and can be parameterized by direct or indirect measurements of prey consumption by a predator. The effect that a prior distribution has, relative to the likelihood, is partially dependent upon the uncertainty, or variance, of the prior distribution [22]. The formulation of informative priors is based on two logical assumptions. First, the Bayesian algorithm assumes that the data used to formulate the prior and likelihood are determinants of the same variable (in this case, diet). Second, the parameterization of prior probability distributions is contingent on calculable metrics, such as the mean and variance.

There are scenarios where one or both of these assumptions cannot be met. Regarding the first assumption, an example involving the use of gut contents data to formulate a prior for an isotope mixing model is presented in Moore and Semmens [13]. Because both gut contents data and the isotope values of a system are indirect measures of diet (θ), they lend themselves to a Bayesian framework wherein the posterior probability p(θ|y) is informed by both the prior p(θ) and the likelihood p(y|θ)(1)where y represents isotopic data, and θ is a dietary parameter. According to Eq. (1), it is evident that p(θ|y) and p(θ) must both describe diet. Alternatively, if p(θ) represents measures of prey availability to a consumer and p(y|θ) is the likelihood shaped by isotopic (dietary) data, it is unclear what p(θ|y) describes, unless it is assumed that availability is directly correlated with diet. Prey availability would be an indirect measure of diet if species interactions follow neutral dynamics [16], [17]. For predator-prey interactions that are influenced by non-neutral, prey-specific ecological factors such as predator preference, prey defense, or habitat variability, measurements of prey availability cannot lend themselves to indiscriminant use as prior distributions as they no longer have a one-to-one relationship with their contribution to a consumer's diet.

As importantly, the second assumption requires that prior distribution parameters be calculable. Estimates of both mean and variance must be made for all prey species in the predator's diet to formulate appropriate priors. In systems where isotopic data are likely to be of maximum utility (e.g. systems that are difficult to observe directly), such parameters are often difficult (if not impossible) to estimate well, rendering prey availability data to parameterize prior distributions unviable. Moreover, in systems where few measurements of prey availability exist, or when count (census) data are used, variance is often underestimated [23], which can result in inaccurate posterior distributions [24]. Often, prey availability is better characterized for some species than for others. Differences in body size, temporal habitat use, and many other factors may confound parameterization of availability distributions of some species, even if the same quantities are well known for others. This renders the formulation of an accurate prior distribution difficult or impossible. In order to avoid these pitfalls, and to maximize the utility of isotope mixing models, a more targeted procedure designed to inform isotope-based measurements of a consumer's diet in a post-hoc fashion is warranted.

Here we introduce a procedure that incorporates, and appropriately weights, biologically relevant information into the posterior distributions of a Bayesian isotope mixing model. With this approach, the assumption of interaction neutrality is incorporated into mixing model results conditional on the isotopic similarity of prey sources. This condition preserves the intrinsic differences between direct measurements that describe a system (isotopic data), and independent data that may be theoretically linked to a system (prey availability data). First, we introduce the utility of this approach with a hypothetical isotopic system. We then test the effectiveness of our approach at increasing the accuracy of trophic interaction estimates by comparing isotope data and independently estimated foraging rates of a whelk predator feeding on its prey in a New Zealand intertidal community.

Weighting of Bayesian isotope mixing models

Bayesian isotope mixing model output is often summarized in a matrix of estimated dietary contribution vectors (ρ_i,…,n; accepted results from a Markov Chain Monte Carlo, MCMC, or a Sampling-Importance-Resampling, SIR, algorithm), where each element in the vector is the contribution of a potential prey source, and each proposed vector sums to unity [13]. Proportional prey availability can be incorporated into the vector that defines the contribution of dietary sources for a particular consumer by multiplication and renormalization. Because direct physical measurements of trophic relationships (e.g. isotopic data) are likely to be more informative than the idealized assumption of a relationship between prey availability and diet, we allow prey availability data to influence dietary contribution results only in proportion to the extent that the prey have similar isotope values. As such, our model allows availability data to influence the source contribution vector in proportion to the pairwise isotopic overlap between prey. Isotopic overlap is proportional to the probability that the isotopic values of two sources are misidentified. Relative to a single pair of potential prey within a larger system, we define the impact of prey availability and isotopic data on final contribution-to-diet values to be exactly inversely proportional: when there is no overlap of prey sources, isotopic data are singularly informative; when there is complete overlap of prey sources, availability data are singularly informative (for the prey pair in question). We utilize Pianka's measure of density overlap to estimate the degree of isotopic overlap between two prey sources with normally distributed isotope values. Pianka's measure of overlap (w_ij) is defined by(2)where g_i,j(x) represent multivariate normal distributions of isotope values for overlapping prey sources i and j [25]. Solving Eq. (2) with the assumption of bivariate normality yields(3)where μ_i and μ_j are vectors of bivariate distribution means, Σ_i and Σ_j are covariance matrices of prey i and j, respectively, and is the square of the Mahalanobis Distance (a generalization of Euclidean Distance) [26]. While this metric is capable of handling isotopic distributions with alternative non-Gaussian covariance structures, mixing models have not yet taken isotopic covariance into account, and we will not discuss it further. The application of an alternative measure of overlap, Morisita's metric [27], provided nearly identical results (not reported).

As noted above, isotopic overlap represents the probability of mistaking one prey source for another; in systems where isotope values for prey i and j are completely distinct (w_ij = 0), assumptions of consumption based on prey availability have no influence, whereas isotopic data are regarded as singularly effective for determining a consumer's likely diet. If two prey have similar isotope values (0<w_ij≤1), prey availability data are incorporated, in proportion to w_ij, to estimate the final contribution-to-diet values. Accordingly, prey availability data are weighted to become increasingly informative as w_ij increases. If w_ij = 1 (exact isotopic overlap between two prey), isotopic and prey availability data are equally informative. We define the strength of this weighting value for prey i and j as(4)where w_ij is the degree of isotopic overlap (Eqns. 2,3), and α_i,j are proportional availability measurements of prey i and j (for example, if prey i and j had proportional biomass measurements of 0.25 and 0.75, respectively, then α_i = 0.25 and α_j = 0.75). Therefore, the final weighted mixing model output is calculated as(5)where ρ_i,j represents a vector of estimated contribution-to-diet values for prey i and j from a given iteration of the MCMC or SIR algorithm in a Bayesian isotope mixing model without including knowledge of relative availability. This process is employed iteratively across all proposed mixing model contribution-to-diet vectors, resulting in final probability distributions that are skewed towards relative availability (α_i, α_j) for prey i and j in proportion to their isotopic similarity. As an alternative to a single ratio of two integers (e.g. α_i = 0.25, α_j = 0.75), relative availability can be incorporated as a probability distribution. This ability is excluded from these analyses for simplicity.

Application to a New Zealand intertidal food web

To assess the empirical power of our method, we applied mixing models with and without our weighting procedure to stable isotope data obtained from a predator-prey system of the New Zealand intertidal [28], [29]. Model results were then compared to biomass-weighted feeding rates calculated from independent observational data.

The focal predator is the gastropod whelk, Haustrum ( = Lepsiella) scobina, which is common along the rocky intertidal shores of New Zealand. We established the diet of H. scobina at a focal study site (Tauranga Head, 41°46′26″S, 171°27′20″E) by performing systematic low-tide feeding surveys of the population in pre-determined mid- and high-intertidal areas of the shore. Each encountered whelk was counted and carefully examined to determine feeding activity. The sizes of all whelks and their identified prey items were measured to within ±1 mm [30]. In total, 2668 whelks where encountered in 20 surveys performed over a 2-year period (May 2005–July 2007). On average, 20.8% of all individuals were actively feeding such that a total of 554 feeding observations on 8 prey species were recorded. The eight observed prey species were: the snails, Austrolittorina antipodum (Aa), A. cincta (Ac), and Risellopsis varia (Rv); a limpet Notoacmea sp. (Nr); the mussels Mytilus galloprovincialis (Mg) and Xenostrobus pulex (Xp); and the barnacles Chamaesipho columna (Cc) and Epopella plicata (Ep) (Table 1). The saturated nature of the resultant species accumulation curve suggests that most of H. scobina's prey were documented (Fig. S1). Further details are provided in Novak [30].

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Table 1. Haustrum scobina prey-specific foraging metrics.

https://doi.org/10.1371/journal.pone.0022015.t001

Stable isotope estimates of prey contributions.

Individuals of H. scobina (12–15 mm shell length, n = 10) and each of its observed prey (n = 5–8 per species) were collected for stable isotope analysis from both high and mid-intertidal zones in July of 2004 and 2005. All individuals were stored live on ice for 4 hrs and frozen prior to processing. Insufficient material was obtained for Nr to enable analysis. Although only a single Nr predation event was observed during feeding surveys, we account for this missing prey source by substituting Nr with the limpet Patelloida corticata (Pc), a closely related species that shares the same habitat (Table 2). Analysis of the system without Pc did not change the applicability of our weighting method (Fig. S2).

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Table 2. Mean and standard deviation of species-specific isotopic signatures at Tauranga Head, New Zealand.

https://doi.org/10.1371/journal.pone.0022015.t002

We dissected, rinsed, and oven-dried the foot muscle tissue of all snails and limpets (Hs, Aa, Ac, Pc, Rv) and the whole-body tissue of the mussels (Mg, Xp) and barnacles (Cc, Ep). The ground samples of some species were pooled to ensure sufficient sample size (Table 2). Analyses of carbon and nitrogen stable isotope ratios were perfformed by the UC Davis Stable Isotopes Facility and were expressed in delta-notation such that δ = 1000((R_sample/R_standard)−1) where R = either ¹³C/¹²C or ¹⁵N/¹⁴N; reference standards are Vienna PeeDee-belemnite for carbon and atmospheric N₂ for nitrogen. The isotope values of the predator Hs were corrected by −1±0.2‰ and −2±0.3‰ for δ¹³C and δ¹⁵N, respectively, to account for trophic enrichment (± SD). Chosen values are representative of those observed for invertebrates in general [32].

Hypothetical Dataset and Model Assessment

A hypothetical predator-prey isotopic dataset (Fig. 1A) was assigned a single consumer species, and four prey species, each normally distributed across the bivariate isotopic niche space (consumer and prey standard deviation (SD) = 0.5 for each isotopic tracer). Two prey were constructed to have distinct (non-overlapping) isotopic distributions, while the blue and orange prey (hereafter referred to as prey i and j, respectively) were given equal values. The mixing space was designed such that the overlap of prey i and j could be manipulated without affecting direct mixing model output (Fig. S3). As expected, analysis of this system with a Bayesian isotope mixing model (MixSIR v.1.0.4) provided similar posterior probability distributions of contribution-to-diet values for the two overlapping prey species (Fig. 1B): proportional contribution medians (1^st quartile, 3^rd quartile) for prey i and j = 0.17 (0.08, 0.25), 0.16 (0.08, 0.25). To evaluate isotopic similarity between prey i and j, we employed Pianka's measure of density overlap, such that w_ij = 1. We then set prey availability values (α_i, α_j) to 0.1 and 0.9 for prey i and j, respectively, and applied these values to Eqs. 4 and 5 across the entire matrix of iterated diet-to-contribution vectors to calculate the revised estimates of dietary reliance (Fig. 1C): revised proportional contribution medians (1^st quartile, 3^rd quartile) for prey i and j = 0.04 (0.01, 0.09), 0.30 (0.25, 0.32).

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Figure 1. Isotopic niche space of a theoretical single predator, four prey community.

A) The predator (black) and prey (red, green, blue, orange) have a standard deviation of (0.5, 0.5) for both isotope tracer 1 and 2. Two of the four prey (red and green) are isotopically distinct with no overlap. Two of the four prey (blue and orange) are isotopically identical, with w_ij = 1. B) Initial MixSIR contribution-to-diet posterior probability distributions for the isotopically identical prey. C) Final weighted and renormalized posterior probability distributions for the isotopically similar prey. Relative abundance values of 0.9 and 0.1 were applied to the orange and blue prey, respectively.

https://doi.org/10.1371/journal.pone.0022015.g001

An examination of Pianka's measure of overlap confirms consistent behavior over a range of isotopic mean differences and variances, resulting in a sigmoid relationship between the mean difference of prey isotope values and w_ij that becomes less pronounced with increased variance (Fig. 2A). Because we constructed the mixing space such that estimates of dietary contribution are nearly invariant with respect to manipulation of w_ij (cf. Fig. S3), an assessment of the behavior of our weighting procedure across different ratios of prey availability is possible (Fig. 2B,C). There is a linear relationship between the initial degree of isotopic overlap of two prey and the difference of final posterior probability distribution mean values. The slope of this relationship is determined by the availability differences (α_i−α_j); small variations in the linear trends can be attributed to fluctuations in mean values as the distributions are successively weighted and renormalized. If the abundances of prey i and j are equal (α_i−α_j = 0), our weighting procedure returns results identical to those originally calculated by the isotope mixing model, as intended given its a priori ultrageneralist assumption. As the overlap of prey isotope values increases, the weighting procedure increasingly returns dietary contribution values influenced by the relative availability of the two isotopically similar prey. This translates to an increasing discrepancy between the proportional contribution to diet distributions of prey i and j as the difference in availability increases.

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Figure 2. Sensitivity analysis of the weighting procedure as a function of isotopic similarity and the difference in proportional availability of isotopically similar prey.

A) Sensitivity analysis of Pianka's measure of density overlap (w_ij) across differences in mean values and variance of two bivariate normal isotopic distributions. When variance is small, w_ij decreases sigmoidally as the difference in means increases. Larger variance predictably tends to linearize the relationship. B) The mixing space of our hypothetical scenario permits manipulation of isotopic overlap between two prey (blue and orange; the consumer is black) without altering mixing model estimates of summed proportional contribution to diet of the two prey (cf. Fig. S3). C) An analysis of the effect of model parameters (density overlap, w_ij, and availability differences, α_i−α_j) on the final weighted and renormalized posterior distributions, measured by the difference of final distribution means for blue and orange in the hypothetical isotopic dataset (Fig. 1). The model is assessed across all possible values of w_ij (0∶1), and across five prey availability scenarios. There is a strong linear effect of isotopic overlap on the difference in means of the weighted posterior probability distributions. The slope of this relationship is determined by availability differences.

https://doi.org/10.1371/journal.pone.0022015.g002

New Zealand Dataset and Model Validation

Haustrum scobina's diet at the site includes eight potential prey (Aa, Ac, Cc, Ep, Mg, Pc (substituted for Nr), Rv, and Xp). Five of the eight prey species are isotopically distinct, however the nesting mussel Xenostrobus pulex (Xp) and the blue mussel Mytilus galloprovincialis (Mg) had overlapping isotope values; w_ij = 0.63 (Fig. 3A). An analysis of the mixing space reveals a range of likely contributions for each prey (Fig. 3B). The isotopic similarity between Xp and Mg resulted in similar contribution-to-diet probability distributions for these species in unweighted MixSIR results (Fig. 3B; blue and green hatched distribution density lines, respectively): Mg = 0.16 (0.07, 0.28), Xp = 0.18 (0.08, 0.31); median (1^st quartile, 3^rd quartile). Applying relative abundance measurements (α_Mg = 0.05_, α_Xp = 0.95) to our weighting procedure resulted in proportional contribution distributions that were quite different (Fig. 3C): Mg = 0.07 (0.03, 0.16), Xp = 0.27 (0.15, 0.41).

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Figure 3. The weighting procedure applied to a New Zealand intertidal community.

A) Isotopic niche space of the New Zealand whelk-predator system, where δ¹³C is plotted on the x-axis and δ¹⁵N is plotted on the y-axis. The δ¹³C and δ¹⁵N values of the predator Hs are adjusted for trophic discrimination factors (see methods). B) MixSIR contribution-to-diet posterior probability distributions of all New Zealand prey for predator Hs. Solid distribution density lines denote isotopically distinct prey, whereas hatched distribution density lines denote isotopically similar prey. Prey colors match those of panel 3A. C) Weighted posterior probably distributions for the isotopically similar prey. Relative abundance values of 0.05 and 0.95 correspond to Mg (blue) and Xp (green), respectively. D) ln-ln-transformed regression of biomass-weighted proportional feeding rate means vs. original mixing model result means; (slope = 0.19, and R² = 0.46). Hatched red lines represent the 90% confidence interval. E) ln-ln-transformed regression of biomass-weighted proportional feeding rate means vs. weighted model result means; slope = 0.22, R² = 0.56. Hatched red lines represent the 90% confidence interval.

https://doi.org/10.1371/journal.pone.0022015.g003

To investigate whether our weighting procedure improved inferences of prey contribution to the diet of Hs, we regressed both original mixing model results and our weighted results against Haustrum scobina's field-estimated proportional feeding rates on each of its prey species (Fig. 3D,E). Recall that our field-estimated feeding rates were weighted by prey biomass to ensure a more direct comparison to the isotopic representation of the system, which is intrinsically mass-dependent (Eq. 7). The ln-ln-transformed regression of the mixing model result means with feeding rate observation means (Fig. 3D) indicated that four of the five most heavily preyed upon species (prey with predator feeding rates greater than 0.0023 grams⋅whelk⁻¹⋅day⁻¹), with the exception of Mg, fall within the 90% confidence interval (slope = 0.19, and R² = 0.46). After the implementation of our weighting procedure, all five of the top prey species fall within the 90% confidence interval (Fig. 3E; slope = 0.22, R² = 0.56). Accordingly, the inclusion of prey availability, conditional on the isotopic uncertainty of prey, increased the slope and improved the accuracy of trophic interaction predictions by ca. 10%.