Ethics statement

All sampling work was approved by the Ministry of Agriculture, Forestry and Food of Republic of Slovenia and the Fisheries Research Institute of Slovenia. Original title of the Plan: RIBISKO - GOJITVENI NACRT za TOLMINSKI RIBISKI OKOLIS, razen Soce s pritoki od izvira do mosta v Cezsoco in Krnskega jezera, za obdobje 2006–2011. Sampling was supervised by the Tolmin Angling Association (Slovenia).

Case study

Our case study involves two populations (Gacnik and Zakojska) of marble trout living in Slovenian streams [38]. These populations are part of a larger study involving 10 marble trout populations [38]. We limit our discussion to two populations showing contrasting demographic traits and characteristics of the habitat to focus on the computational tools and the insights generated by the estimation of the parameters of the growth models.

Marble trout is a resident salmonid endemic in Northern Italy and Slovenia that is now endangered due to widespread hybridization with introduced brown trout and displacement by alien rainbow trout. The populations of Gacnik and Zakojska were established in stretches of fishless streams in 1996 (Zakojska) and 1998 (Gacnik) by stocking age-1 fish that were the progeny of parents from relic genetically pure marble trout populations [39]. Trout in Gacnik and Zakojska are genetically different [39]. Fish hatched in the streams for the first time in 1998 and in 2000 in Zakojska and Gacnik, respectively. Those cohorts are the first included in the analysis. The two populations were sampled annually in June. The geomorphological characteristics of the two streams are different: Zakojska is (mostly) a fragmented one-way stream (i.e. trout can move downstream, but not upstream), while Gacnik is a two-way stream, i.e. trout can move in either direction.

Fish were collected by electrofishing and measured for length and weight to the nearest mm and g, respectively (fig. 1). If fish were caught for the first time - or if the tag had been lost – and they were longer than 110 mm they were tagged with Carlin tags [40] and age was determined by reading scales. Marble trout spawn in November–December and offspring emerge in April–May. Underyearlings are smaller than 110 mm in June, thus trout were tagged at age 1 or, in the case of small size, at age 2. Males and females are morphologically indistinguishable at the time of sampling. The probability of recapture was higher than 80% and we did not find evidence of capture probability varying with age and size for fish older than age 0 [41]. In addition, we found no evidence of size-selective mortality in either stream [42]. The movement of marble trout is limited, and the majority of marble trout were sampled within the same 200 m reach throughout their lifetime. Marble trout females achieve sexual maturity when longer than 200 mm, usually at age 3 or older. The maximum observed age for fish born in the streams was 12 and 9 years in Gacnik and Zakojska, respectively. The last sampling occasion included in the dataset was June 2012. In Gacnik the last cohort included was the one born in 2010. Due to a flood that almost completely wiped out the population in 2007 [38], the last cohort included for Zakojska was the one born in 2008. Density of fish of age 1 and older (number m⁻²) was (mean±sd) 0.05±0.04 in Zakojska from 1998 to 2012 and 0.16±0.07 in Gacnik from 2000 to 2012. In total, 1 067 unique fish were included in the Zakojska dataset and 4 764 in the Gacnik dataset.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 1. Number of recaptures for fish and observed growth trajectories.

Frequency of number of capture/recaptures for fish (left column) and observed individual growth trajectories (right column) for the populations of Gacnik (top row) and Zakojska (bottom row).

https://doi.org/10.1371/journal.pcbi.1003828.g001

Empirical Bayes method for random-effects models

Empirical Bayes (EB) refers to a tradition in statistics where the fixed effects and variance (or standard deviation) of a random-effects model are estimated by maximum likelihood, while estimates of random effects are based on Bayes formula (e.g. [43], [44]). Although random-effects models can be analyzed using frequentist or Bayesian methods [45], [46], the frequentist point of view may have a number of advantages [44]. From a computational perspective the maximum likelihood estimate is relatively inexpensive to calculate and avoids difficulties associated with judging convergence of MCMC samplers when using a full Bayesian approach. Due to these advantages, EB has increasingly been applied in the last few years in the biological sciences in fields including genetics [47], [48], disease screening [49], and genomics [50]. Estimation of fixed effects and variance parameters by maximum likelihood is in widespread use in mixed model software packages, such as the R package “lme4” [51].

Fitting non-linear random-effects models in ADMB-RE

ADMB is an open source statistical software package for fitting non-linear statistical models [37], [53]. ADMB can be used to fit generic random-effects models with an EB approach using the Laplace approximation (ADMB-RE [54]). ADMB is totally flexible in model formulation, allowing any likelihood function to be coded in C++. Coding in C++ allows also for a great flexibility of functional forms to be used for model parameterization. In terms of computing times, ADMB compares favorably to other software and methods for the estimation of parameters of highly-complex non-linear models [55] (see also text S2).

The gradient (i.e. the vector of partial derivatives of the likelihood function with respect to model parameters) provides a measure of convergence of the parameter estimation procedure in ADMB. Although considerations of speed and model complexity may motivate the use of a less strict convergence criterion, by default ADMB stops when the maximum gradient component (i.e. the largest of the partial derivatives of the likelihood function with respect to model parameters) is <10⁻⁴. An explicit convergence criterion allows the researcher to systematically move forward in the analysis and thus potentially explore a large number of model parameterizations.

Growth model

A broad range of models describing the physiology of growth have been developed [56]–[62] and recent papers have summarized non-linear growth models along with methods for parameter estimation [16], [17]. However, it has often been difficult, if not impossible, to estimate parameters for many of the proposed growth models using data on individual growth trajectories in natural settings. Even in the presence of a large amount of data, a highly parameterized model may be only weakly statistically identifiable.

We use the growth model due to von Bertalanffy [59], [63], [64]. The von Bertalanffy growth function (vBGF) has been used to model the growth of organisms across a wide range of taxa, including fish [57], [65], mammals [66], [67], snakes [68], and birds [69], [70]. von Bertalanffy hypothesized that the growth of an organism results from a dynamic balance between anabolic and catabolic processes [59]. If W(t) denotes mass at time t, the von Bertalanffy assumption is that anabolic factors are proportional to surface area, which scales as , and that catabolic factors are proportional to mass. If a and b denote these scaling parameters, then the rate of change of mass is(3)If we further assume that mass and length, L(t), are related by with ρ corresponding to density, then elementary calculus shows that [64](4)where and .

The linear differential equation in Eq. 4 is readily solved by the method of the integrating factor. Setting to be the asymptotic size (obtained when we set the left-hand side of Eq. 4 equal to 0) and to be the initial size, two forms of the solution are(5)and(6)where t₀ is the hypothetical age at which length is equal to 0.

In light of Eq. 4, if , the rate of growth is negative, so that we can think of asymptotic size as the size only attained in the limit of very long times. For a given value of asymptotic size, the parameter k (in y⁻¹) describes how fast the individual or group of individuals reaches the asymptotic size. In this work, we will use the formulation of the vBGF of Eq. 6, which has 3 parameters: L_∞, k, and t₀. Although the mechanistic definition of asymptotic size in the vBGF introduces an explicit linear relationship on the log scale between k and L_∞ (i.e. ), in this work we do not explicitly introduce L_∞ as equal to , but we let the correlation between L_∞ and k at the whole population and at the individual level emerge from data, as it is commonly done [71].

Parameter estimation and individual variation.

In the vast majority of applications of the vBGF, L_∞, k, and t₀ have been estimated at the population level (i.e. without accounting for individual heterogeneity in growth) starting from cross-sectional data, and interpreted as the growth parameters of an average individual in the population (e.g. L_∞ is the asymptotic size of an average individual). That is, one collects a group of individuals at a single time, measures their sizes and ages, and then estimates the parameters of the vBGF growth function parameters at the population (or groups within populations, e.g. cohorts) level using standard non-linear regression techniques via maximum likelihood or Bayesian methods ([72] and references therein). However, when data include measurements on individuals that have been sampled multiple times, failing to account for individual variation in growth will lead to biased estimations of mean length-at-age [13], [73].

Following [58] (although in [58] data were not longitudinal and thus individual random effects were not included), we present a formulation of the vBGF specific for longitudinal data where L_∞, k, and t₀ may be allowed to be a function of shared predictors and individual random effects. To improve the biological interpretation of the parameters of the vBGF, we treated t₀ in Eq. 6 as a population-level parameter (with no predictors), so that all individuals are assumed to have a shared value. Since k and L_∞ must be non-negative, it is natural to use a log-link function. In addition, values far apart on the natural scale are often of the same magnitude when log-transformed; this facilitates parameter estimation and model convergence. We thus set(7)where and are the standardized individual random effects, and are the standard deviations of the statistical distributions of the random effects, and the other parameters are defined as in Eq. 1. The minimal model (i.e. with no predictors and ) only contains . The continuous predictor x_ij in Eq. 7 (i.e. population density in our analyses, but one may have different continuous predictors for L_∞ and k) does not need to enter linearly into the equation, i.e. any of the terms and may be replaced by a more general function h(x_ij;Φ), where Φ denotes a set of parameters to be estimated.

We thus assume that the observed length of individual i in group j at age t is(8)where ε_ij is normally distributed with mean 0 and variance .

To focus on the EB method, we do not explicitly introduce process stochasticity, so that the likelihood function is(9)where n_j is the number of individuals in group j, m_ij is the number of observations from individual i of group j, l is an index that runs over these observations, the observed length measurements for individual i in group j are denoted by , while is the age of the individual when the l-th measurement is made. Predictors are implicitly included via Eq. 8.

According to Eq. 7, a positive correlation between and (from now on we will refer to them as L_∞ and k at the individual level) indicates that size ranks tend to be maintained throughout the lifetime of individuals, while a negative correlation indicates that size ranks tend not to be maintained (fig. 2).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 2. Growth trajectories from simulated data with negative, positive and no correlation between L_∞ and k.

Growth trajectories from simulated data according to Eq. 7 (no predictors, only intercept and individual random effects) with strong negative (left panel, Pearson's r = −0.9), positive (middle panel, r = 0.6), and no correlation (right panel, r = 0) between L_∞ and k at the individual level. For all three panels, L_∞ = 330 mm, k = 0.37 y⁻¹, t₀ = −0.38 y, σ_v = 0.22, σ_u = 0.22.

https://doi.org/10.1371/journal.pcbi.1003828.g002

Statistical analysis

Selection of best growth model.

To begin, we were interested in the ability of the model with no predictors to describe the data used to calibrate the model (i.e. hindcasting). We checked the maximum gradient component to ensure that a satisfactory optimum was reached, and used R² and mean absolute error (MAE) as measures of goodness of fit. Unless otherwise noted, each model we tested included individual random effects and intercept for L_∞ and k.

We introduced predictors as fixed effects to test whether they improved model performance. In particular, we included as predictors (i) population density in the first year of life of the fish (ind ha⁻¹) as a continuous variable (x_ij Eq. 7) [33], and (ii) cohort as a group (i.e. categorical) variable (α₁ and β₁ in Eq. 7). All fish in a cohort experience the same population density in the first year of life, thus we can intuitively think of the cohort effect as including other factors beyond early density affecting growth that are largely shared by the cohort, such as temperature at emergence/first stages of life (although the cohort effect is categorical, while the density effect is continuous).

We treated predictors as fixed effects for two reasons. First, introducing predictors as random effect is computationally more demanding in ADMB than using fixed effects, in the sense that run times for parameter estimation are substantially longer. This drawback is greatest when thousands of individuals are included in the dataset, as in the case of the marble trout population of Gacnik. Second, treating a factor with just a few levels as random factors may generate imprecise estimates of the associated standard deviation [52].

For each population, we fitted models in which density- or cohort effects were introduced in k or L_∞. For simplicity and ease of interpretation, in each model we introduced at most one predictor for the two vBGF parameters (table 1). To guard against inconsistent parameter estimates caused by likelihood functions with multiple maxima, we started ADMB-RE from different initial parameter values and checked for consistency of parameter estimates.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 1. AIC of tested models.

https://doi.org/10.1371/journal.pcbi.1003828.t001

We used the Akaike Information Criterion [74], [75] to select the best model, although we also tested consistency of AIC ranking against the Bayesian Information Criterion (BIC) [76]. Following [58], we also tested whether a log transformation of population density decreased AIC of models that had density as predictor, but results were basically unaffected by the log transformation.

We then investigated correlation between the EB estimates of and k at the individual level and of cohort-specific mean and k when cohort was a predictor of both and k (e.g. following Eq. 7, ). We used simulated data to test whether a significant correlation may emerge as an artifact of the algorithm for parameter estimation. Specifically, we simulated growth data with a randomly drawn correlation r between and k at the individual or cohort level and we then tested whether the empirical correlation between estimates of and k at the individual or cohort level obtained using the model fitting procedure in ADMB-RE was equal (or very close) to r.

We also tested whether there were noticeable differences in vBGF cohort-specific models when estimating parameters separately for each cohort using a standard non-linear regression routine with no random effects (nls function in R [77]) or using ADMB-RE. We carried out this analysis in order to determine whether the fitting of a random-effects model is recommended even when only mean growth trajectories at the group level are needed, thus in the case when the fitting of a standard non-linear regression model may represent a theoretically viable procedure.

Supplementary information and code

In Supporting Information we provide (i) tests of correlation between individual and mean cohort-specific and k using simulated datasets (fig. S1 and table S3), (ii) the mean estimate and confidence intervals for parameters of the best models (table S2 and table S3), (iii) cohort-specific growth trajectories (fig. S2), (iv) derivation of the correlation between parameters of the vBGF under size-dependent mortality and description of potential processes leading to a negative correlation between and k (text S1), (v) confidence bands estimated using a MonteCarlo algorithm (fig. S3), (vi) a comparison with JAGS and the nlme function in R (text S2), (vii) results of a repeatability analysis of body size throughout the lifetime [78], [79] (text S3), and (viii) details of the Empirical Bayes algorithm (text S4). All data and code used for the analyses and to produce figures can be found in an online repository at http://dx.doi.org/10.6084/m9.figshare.831432.

Estimates of parameters

For each vBGF model we tested, we obtained convergence of the algorithm for parameter estimation in ADMB, and the data used for the estimation of the parameters were well predicted by the models (for the model with no predictors except individual random effects: Zakojska, R² = 0.97, MAE = 9.58 mm; Gacnik, R² = 0.98, MAE = 6.82 mm).

We obtained consistent parameter estimates when starting ADMB-RE from different initial parameter values. For each model, the standard deviation of the probability distribution of random effects was larger than 0. In the vBGF model with no predictors for both and k, the two parameters at the individual level were strongly and positively correlated (Zakojska; r = 0.79, p<0.01; Gacnik, r = 0.85, p<0.01) (fig. 3). However, the correlation was inflated by the almost perfect correlation of k and for fish that were sampled just once (Zakojska; r = 0.97, p<0.01; Gacnik, r = 0.99, p<0.01). Considering only fish that were sampled more than 2 times, the correlation between k or at the individual level remained positive and highly significant in both populations, albeit weaker (Zakojska; r = 0.48, p<0.01; Gacnik, r = 0.59, p<0.01). We also found a strong and positive correlation within cohorts between k and at the individual level in the models that included cohort as predictor in either or both parameters (for the model with cohort as predictor for both k and , Zakojska [mean r across cohorts ± sd] = 0.86±0.11; Gacnik = 0.86±0.12). Tests on simulated data sets showed that when individual trajectories are simulated with positive, negative or no correlation r between k and at the individual level, the estimated correlation between individual random effects estimated with the EB method is very close to the true r (fig. S1). The CVs of k and at the individual level for the vBGF model with no predictors were 6% and 6% respectively in Gacnik and 2% and 9% respectively in Zakojska. When the model included cohort as predictor for both k and , the range of cohort-specific CV of k and at the individual level were 3–6% (k) and 4–7% () for Gacnik and 1–2% (k) and 3–13% () for Zakojska. In the model with no predictors, at the population level was greater in Gacnik than in Zakojska, while the opposite was true for k (mean and 95% confidence intervals, Gacnik: L_∞ = 323.28 mm [318.54–328.02], k = 0.24 y⁻¹ [0.23–0.25], t₀ = −0.92 y [−0. 97-(−0.87)]; Zakojska: L_∞ = 298.83 mm [289.83–307.82], k = 0.36 y⁻¹ [0.33–0.39], t₀ = −0.49 y [−0.58-(−0.41)]).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 3. Distribution of estimates of individual random effects and correlation between L_∞ and k.

Distribution of estimates of individual random effects (left column, u = random effect for k, v = random effect for ) and plot of individual-level (mm) and k (y⁻¹) (right column) for the populations of Zakojska (top row) and Gacnik (bottom row). For Zakojska: σ_u = 0.06, σ_v = 0.11; for Gacnik, σ_u = 0.10, σ_v = 0.09.

https://doi.org/10.1371/journal.pcbi.1003828.g003

For both populations, k and tended to get smaller with increasing density in the first year of life. The best model according to AIC had cohort as predictor of both k and in both populations (table 1, see table S1 and S2 for parameter estimates for Zakojska and Gacnik, respectively). Cohort-specific mean k and (i.e., with individual random effects u_ij and v_ij in Eq. 7 set to 0) were negatively correlated (Zakojska; r = −0.81, p<0.01; Gacnik, r = −0.87, p<0.01) (figs. 4 and S2). Simulations showed that the estimated correlation between mean cohort-specific k and is not an artifact of the parameter estimation procedure (table S3).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 4. Cohort-specific growth trajectories.

Cohort-specific growth trajectories for the marble trout populations of Zakojska (panel a) and Gacnik (b). The cohorts with the biggest and smallest body size at age 8 as predicted by the model were for Zakojska the 2006 and 2004 cohorts and for Gacnik the 2000 and 2003 cohorts.

https://doi.org/10.1371/journal.pcbi.1003828.g004

Cohort-specific models with no random effects (i.e. parameters estimated using nls function in R) provided consistently greater estimates of and smaller estimates of k than random-effects models (fig. 5 and table 2), which showed that ignoring autocorrelation among individual measures is likely to upwardly bias estimates of asymptotic length at the group level.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 5. Prediction of mean cohort-specific growth with random-effects or non-linear least squares model.

Prediction of mean cohort-specific growth trajectories (i.e. individual random effects u and v = 0) using the von Bertalanffy growth function model with cohort as a categorical predictor for both and k (solid line) and non-linear least-squares regression using the R function nls (dashed line) for the 2001 (a) and 2002 (b) cohorts for the population of Gacnik, and 2001 (c) and 1999 (d) cohorts for the population of Zakojska. Estimates of model parameters are reported in Table 3.

https://doi.org/10.1371/journal.pcbi.1003828.g005

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 2. Parameters of the von Bertalanffy growth function model for two cohorts of Gacnik and Zakojska.

https://doi.org/10.1371/journal.pcbi.1003828.t002

Prediction of lifetime growth trajectories

In the populations of Gacnik and Zakojska 450 and 62 fish respectively have been sampled more than 3 times during their lifetime. For both populations, the best vBGF model (i.e. model including cohort and individual random effects as predictors for both k and ) fitted for the fish in the validation samples using only the first observation (20% of 450 and 62 fish for Gacnik and Zakojska, respectively) provided better prediction of the missing observations than mean length-at-age of the respective fish cohort (fig. 6, table 3). Finally, when we used no predictors for either model parameter except the individual random effects, the random-effects model provided better predictions of the missing observations than population mean length-at-age (table 3).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Figure 6. Prediction of validation data using random-effects model or mean cohort-specific length-at-age empirical data.

Example of prediction of validation data for the population of Gacnik using the model with cohort as predictor for both and k (panel a, R² = 0.76, MAE = 19 mm) and mean cohort-specific length-at-age empirical data (b, R² = 0.66, MAE = 22 mm). For the population of Zakojska, (c) model predictions (R² = 0.72, MAE = 24 mm), and (d) predictions using mean cohort-specific length-at-age empirical data (R² = 0.36, MAE = 37 mm).

https://doi.org/10.1371/journal.pcbi.1003828.g006

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Table 3. Prediction of future growth trajectories.

https://doi.org/10.1371/journal.pcbi.1003828.t003

Maintenance of size ranks and correlation between L_∞ and k

As described above, we found a strong positive correlation between and k at the individual level, as well as very high repeatability of body size in both populations (text S3). These two results concordantly indicate that size ranks are strongly maintained over time.

Two other studies investigated the correlation between the von Bertalanffy growth function's parameters and k at individual level. Using a random-effects model implemented in BUGS, Pilling et al. [80] found a strong negative correlation between and k at the individual level in a sky emperor Lethrinus mahsena population, but they did not discuss any potential processes leading to the estimated negative correlation. In [81], Alós et al. using a modified five-parameter von Bertalanffy growth function implemented in BUGS found a positive correlation between and two growth parameters (k₀ and k₁) at the individual level, but they did not discuss the biological and ecological determinants of the observed positive correlation among parameters of the growth function. In text S1, we discuss the processes that may lead to a negative correlation between and k and here focus on the positive correlation.

At the population or group level, the correlation between and k obtained from the Hessian estimated at maximum likelihood estimates of the parameters is usually negative. This correlation does not offer any biological insights, since it occurs because different combinations of and k can basically provide the same fit to the data, in particular when the range of ages is limited [58], [82], [83]. In other words, by slightly increasing or decreasing and k in opposite directions, the same likelihood is obtained. Although it is possible to estimate the correlation between random effects within ADMB-RE, this may lead to computational instabilities and possibly to ambiguous interpretation of the correlation parameter when other predictors are taken into account (we provide the code in the online repository). Our simulations confirmed that the observed positive correlation between estimates of and k at the group level (cohort, as in our case) and at the individual levels is not a statistical artifact.

Multiple non-exclusive and potentially interacting processes may lead to the maintenance of size ranks throughout marble trout lifetime. Specifically, we consider three potential processes: (i) among-fish differences in genetic growth potential; (ii) habitat heterogeneity; (iii) size-dependent piscivory.

Best models for the marble trout populations of Zakojska and Gacnik

The best model for both populations included cohort as a categorical predictor for both and k. Within each cohort we found substantial individual variation as well as strong maintenance of size ranks throughout marble trout lifetime (i.e. the within-cohort correlation of and k at the individual level was strongly positive). Models including only density in the first year of life performed distinctly worse than the best model, but better than the model with no predictors. This seems to suggest that other factors, in addition to early density experienced by cohorts, contribute to determine mean growth trajectories of cohorts. Apart from climatic vagaries or particular trophic conditions affecting cohorts in their early life stages, another possible explanation for the emergence of cohort effect is high variance in reproductive success (e.g. just a few fish contribute to the next generation), which is common in salmonids [99], [100], combined with (i) high heritability of growth and/or (ii) heterogeneity in site profitability accompanied by limited movement. The mean growth trajectory of the cohort may thus signal in case of (i) the growth potential of the small parental pool, or in case of (ii) the profitability of the stream habitat where a large fraction of the cohort lived.

Cohort effects on growth were more pronounced in Zakojska than in Gacnik. We found a strong negative correlation between cohort-specific mean and k in both populations. Thus, some of the mean growth trajectories of cohorts were crossing throughout fish lifetime, but within cohorts size ranks were mostly maintained over time. However, the cohort-specific growth trajectories in Gacnik showed very little variation with the exception of a particularly fast-growing cohort, while a richer variety of cohort-specific mean growth trajectories were observed in Zakojska. This may be in part related to the estimation of being particularly sensitive to the presence in the dataset of older individuals [101]. In Zakojska, the dramatic reduction in population size after the flood of 2007 accompanied by the natural thinning of cohorts over time reduced the number of older individuals in the dataset, and this may lead to less accurate predicted mean size of cohorts at older ages. However, we observed the same strong negative correlation even if only including cohorts born up to 2002 (fig. S2), although the diversity of cohort-specific growth pattern was noticeably smaller and comparable to the diversity observed in Gacnik.

Fast-growing cohorts can play a key role in the persistence of small fish populations. Since sexual maturity and egg production in fish are generally size dependent [102], a higher proportion of fish can reach sexual maturity at younger ages in a fast-growing cohorts than in slow-growing ones. This may be crucial when population size is low and the population is at risk of extinction due to demographic stochasticity. In both Gacnik and Zakojska, the fastest-growing cohorts experienced very low population densities in the first two years of life. Further studies should test whether at the individual or at the cohort level a trade-off between growth and mortality can be observed [103], and whether fast-growing cohorts had higher lifetime reproductive success than slow-growing ones.

Prediction of growth trajectories

A sizable literature on prediction of future growth exists for humans, especially in the context of early identification of pathologies [104]–[107]. An approach similar to that presented in our work for the estimation of lifetime growth trajectories given only information on growth and size during the early stages of life was proposed in [104] and [105]. In particular, in [104] Shohoji et al estimated the lifetime growth of Japanese girls using measurement up to the age of 6 years old. They first adapted to humans a parametric model previously developed to model the growth in weight of savannah baboons. Then, they tested the suitability of an Empirical Bayes approach to estimate model parameters and predict abnormal growth at later stages of life. They found that classification of individuals into proper homogenous groups (i.e. where the strength is borrowed from) was necessary in order to obtain accurate predictions of lifetime growth. In [105], Berkey found that there is a point beyond which the Empirical Bayes method (but more in general any method) is no longer robust to missing data, and found - as expected - that growth curve parameters are especially sensitive to the end points of the growth trajectories.

Given an appropriate growth model, the prediction of lifetime growth trajectories from early measurements presents further complications - as in our case - when dealing with organisms that still grow after sexual maturity [108] and when homogenous groups (i.e. cohorts) may include just a few individuals reaching older ages. In addition, when using the vBGF model with both and k function of cohort and individual random effects, the estimation of cohort effects should be robust to the deletion from the dataset of one-third of the individuals that have been sampled more than 3 times, since the presence of only a few old individuals in the dataset is likely to bias the estimation of [101].

Our results indicate that when strength is borrowed from other individuals, parameters estimated on a single measurement can be used to summarize the growth trajectory of marble trout living in Zakojska and Gacnik and to impute missing observation for the estimation of size-dependent survival. The best vBGF model provided predictions of future growth trajectories in both populations that were consistently (i.e. for all validation samples) better than simply using the mean length-at-age of the fish cohort. Clearly, other covariates presently not available or not included in the model, such as sex or position in the stream, may help further improve predictions of lifetime growth and size-at-age.

We found better predictions across validation samples for the population of Gacnik than for the Zakojska population. This may be due to a higher number of fish both overall and in each cohort in Gacnik, less variability in growth at the whole population level as well as among fish in the same cohort, as evidenced by the much smaller coefficient of variation of and higher repeatability of body size in Gacnik than in Zakojska, or a lower plasticity of growth trajectories after the first year of life in Gacnik than in Zakojska, which may be caused by more homogenous site profitability in Gacnik.

In conclusion, in this work we have shown how the estimation of parameters of a parameter-rich non-linear growth function using longitudinal data can shed light on the shared and individual determinants of somatic growth in natural populations. The estimation method based on the Empirical Bayes approach is readily applicable to different parameterizations of the von Bertalanffy growth function or other growth models, and it provides additional flexibility, speed and ease of use with respect to other approaches [8]. In the case of more frequent sampling of individuals [10], models with seasonal components may be used and the inclusion of more fine-grained candidate predictors (such as monthly temperature, flow, trophic conditions) when available may be tested.