Methods

The survival and breeding success analyses were based on 16 years (1992–2007) and 25 years (1981–2005) of monitoring data, respectively. The takahe population in the Murchison Mountains was surveyed twice per year, in October/November and in February/March, during which time banded adults were recorded and nests were managed (i.e. non-viable eggs removed and viable eggs fostered between pairs or transferred to the captive-rearing unit). Captive-reared juveniles are released back into the wild at c. 1 year old. A detailed explanation of the field methods used to collect the data is reported elsewhere (Hegg et al., Reference Hegg, Greaves, Maxwell, MacKenzie and Jamieson2012).

The population model developed for the takahe in the Murchison Mountains is a female-only, age structured birth-pulse model based on post-breeding census data (Caswell, Reference Caswell2001). The selection of a female-only model is based on the assumption that females drive the population dynamics and that there are always enough males available to fertilize all the females. The model assumes age-specific survival rates; reproductive output is also age dependent. A birth-pulse model assumes that the age distribution is a discontinuous series of pulses and that individuals reproduce on their birth day, a common model assumption for species with well-defined breeding seasons matching climatic factors (Caswell, Reference Caswell2001). Finally, a post-breeding census model takes a snapshot of the population every year just after reproduction, with the youngest age class composed of chicks that are not breeding in the current season. A life-cycle graph for the model is shown in Fig. 2.

Fig. 2 Life-cycle graph for the takahe Porphyrio hochstetteri in the Murchison Mountains (Fig. 1), built into a Matlab population model. Transitions between circles are annual steps and all other transitions occur within a breeding season.

The fully stochastic model includes parameter uncertainty and environmental and demographic stochasticity. Parameter uncertainty reflects two sources of sampling error in parameter estimates: firstly, we measure the outcome of a stochastic process and not the true probability of the underlying event and, secondly, we are rarely able to count all individuals or nests in a population (White et al., Reference White, Franklin, Shenk, Beissinger and McCullough2002). Environmental stochasticity accounts for the component of parameter variation over time that we are not able to explain and assume to be random, and demographic stochasticity accounts for an individual variation in fitness (Engen et al., Reference Engen, Bakke and Islam1998; Lande, Reference Lande, Beissinger and McCullough2002).

All demographic parameters P were calculated as:

(1)$$g(P) = \alpha _0 + \sum\limits_i {\alpha _i F_i + \varepsilon (t)} $$

where g(P) is a transformation function to ensure demographic parameters are on the correct scale, α _i are the model parameters, F _i are the factors included in the model (environment, management) and ε(t) is a random time effect (environmental stochasticity), normally distributed with a mean of zero and unknown variance σ ². α _i and σ ² were estimated in a Bayesian framework using WinBUGS 1.4.1 (Lunn et al., Reference Lunn, Thomas, Best and Spiegelhalter2000) (100,000 iterations, 4,000 burn-ins). MATLAB v. R2006a (MathWorks, Natick, USA) was used to perform all population model simulations, drawing values at random from the posterior distributions generated in WinBUGS. Demographic stochasticity was simulated by applying all demographic parameters (survival, reproductive success) through a binomial operator. Each model scenario was simulated with 10,000 repetitions.

The values of the survival model parameters are summarized in Appendix, Table A.1, and the mean survival values are reported in Table A.2. Adult survival was modelled using the equation:

(2)$$\eqalign{{\rm logit}(S) = & \alpha _1 + {Adult} \cdot (\alpha _2 + \alpha _3 \,{Age} + \alpha _4 \,{Age}^2 ) \cr &+ \alpha _5 \,{Trapped} + \alpha _6 \,{Seedfall} + \alpha _7 \,{Tussock} \cr &+ \alpha _8 \,{Temperature} + \alpha _9 \,{Rain} + \alpha _{10} \,{Snow} + \varepsilon (t)} $$

where S is the survival rate from one year to the next; Adult takes a value of 1 if a bird is older than 1 year and is otherwise set to 0; Age is a bird's age in years; Trapped takes a value of 1 for birds in the stoat control area, 0 for birds in the untrapped area; Seedfall is the annual beech seedfall measured as seeds per m²; Tussock is the percentage of flowering tussocks; Temperature is the mean temperature (°C) in the three coldest months of the year; Rain is the total precipitation (mm) in the calendar year; Snow is the total precipitation (mm) from May to September, as a proxy for snowfall; all environmental variables were standardized. ε(t) is a random error, normally distributed and with an average value of 0 and unknown variance σ ². A detailed explanation of the underlying methods and assumptions for the survival data is reported elsewhere (Hegg et al., Reference Hegg, Greaves, Maxwell, MacKenzie and Jamieson2012).

Most population models for birds look at breeding success as the combination of productivity to hatching (number of eggs hatched per pair) and fledging success (number of chicks fledged per egg hatched), or simply as the number of chicks fledged per year. A more detailed analysis of the breeding process was required for the purpose of this study because management of a nest depends on clutch size and egg viability (Hegg et al., Reference Hegg, Greaves, Maxwell, MacKenzie and Jamieson2012). A number of steps in the breeding process of the takahe were thus analysed separately as shown in Fig. 2. The mean values of takahe productivity used in the model are reported in Appendix, Table A.3. A detailed analysis of takahe breeding success is presented in Hegg et al. (Reference Hegg, Greaves, Maxwell, MacKenzie and Jamieson2012).

The probability of a bird breeding as a function of age was modelled according to Equation 3, below, with the best fit model parameters being α ₀ = 2.00 (confidence interval, CI, 1.73–2.27) and α ₁ = − 4.32 (CI −5.08– − 3.60; see also Appendix, Fig. A.1)

(3)$${\rm logit}(P_{{Breeding,}\,{Age}} ) = \alpha _0 + \displaystyle{{\alpha _1} \over {{Age}}}$$

The above analysis was based on 23 years of data (1982–2004) for island takahe (C. Grueber & I. Jamieson, unpubl. data), as data on breeding age of Fiordland takahe are too incomplete for a meaningful statistical analysis (Hegg, Reference Hegg2008). For model selection for different age-dependent models, see Appendix, Table A.4. The oldest breeding bird recorded in the Murchison Mountains was aged 13 years.

Within the range of historical population counts the effect of population density is not detectable for adult and juvenile takahe survival rates. There is some evidence that the probability of nesting, re-nesting and egg viability are negatively affected at high population numbers (Hegg et al., Reference Hegg, Greaves, Maxwell, MacKenzie and Jamieson2012), suggesting that population growth is limited by the number of available breeding territories. Therefore a space-limited model for territorial species (Murray, Reference Murray1979) was chosen to describe limited population growth for the takahe at high population density. This model assumes that survival rate and breeding success remain constant regardless of population density but the number of breeding pairs is capped and limited by the number of available territories, i.e. any excess adults will survive but will not breed. This model also yields a sigmoid population growth curve similar in shape to a logistic growth curve (Murray, Reference Murray1979). For the purpose of this study, carrying capacity was defined as the maximum number of available breeding territories based on previous habitat surveys (D. Crouchley, unpubl. data).

The population model was coded in MATLAB. Software was developed that allowed the user to save and retrieve model scenarios, to display the values of all demographic parameters and plot them as a function of time and age, and to model and compare different management scenarios without having to alter the code. The number of model repetitions (N _rep) can be specified by the user. For each repetition the parameters α _i and σ ² in Equations 1–3 were randomly sampled from the posterior distributions generated in WinBUGS. To account for any correlation amongst factors within each logistic regression equation the joint posterior distributions were sampled, with all parameter values being from a single sampled row of the stored results rather than being randomly selected from independent distributions.

The observed values of the environmental factors were used to calculate demographic parameters when simulating historical trends in population growth. When simulating future population growth environmental factors were generated by bootstrapping of the environmental data collected over the last 25 years, with the additional constraint of heavy beech mast fall occurring on average every 4–5 years (Wardle, Reference Wardle1984) and tussock flowering events every 2–4 years (Mark, Reference Mark1968). For this purpose all historical environmental data were classified into either non-mast year or mast year, and environmental factors sampled at random from either group, depending on whether it was a mast year.

A binomial operator was applied to calculate the probability of success (i.e. probability of hatching, fledging and survival), with the number of individuals being the number of trials. It was simpler to calculate the number of individuals N _j + 1 in the year j+1 by summing and taking the difference (N _j + 1=N _j + fledglings_j − deaths_j, with all addends being vectors of size N _rep) rather than using a Leslie matrix (Caswell, Reference Caswell2001). The population growth rate was then calculated as

(4)$$\lambda _j = N_{\,j + 1} /N_j $$

and the mean population growth rate as the geometric mean of the annual values λ _j over the whole time interval simulated by the model.

In the results we report mean λ (with 95% creditability intervals) for each management scenario (see below), as well as the probability (P) that λ > 1 (i.e. positive growth). Furthermore, the mean growth rates λ ₁ and λ ₂ obtained under two different management scenarios were compared by running the model twice, once for each scenario, each time with the same number of repetitions and using the same strings of random numbers to select from the distributions of all model parameters. The difference Δ=λ ₁−λ₂ is also a vector of size N _rep, and the probability P (λ ₁>λ ₂) is the number of positive elements in Δ divided by N _rep. Finally, we also report the probability of quasi-extinction (Ginzburg et al., Reference Ginzburg, Slobodkin, Johnson and Bindman1982), which we defined as the population declining to 20 individuals or less by the end of the simulation period.

The model was run for two different time periods. (1) Retrospectively, for the last 25 years, from an observed starting point of 120 individuals. Survival rates and reproductive success were calculated as a function of the observed environmental factors (Hegg et al., Reference Hegg, Greaves, Maxwell, MacKenzie and Jamieson2012). The model results were then matched with the actual population counts, which include unbanded and unidentified birds not included in the demographic analyses. (2) Into the future, to project population growth in the next 20 years. The future environmental factors were simulated, through bootstrapping of the observed data.

Different management scenarios were modelled based on different levels (0, 40 or 95%) of stoat trapping in the Special Takahe Area and captive-rearing effort (frequency of operation every year, and every second or third year, and no captive rearing). The 2008 management scenario (40% of Murchison Mountains trapped, captive rearing every year) was used as a reference scenario for comparison with other management options, as 2008 is when this analysis was completed. A hypothetical fostering scenario was also modelled, in which any nests with two viable eggs have one egg removed and transferred to a nest that only produced non-viable eggs. This is expected to improve the reproductive output, as two-egg clutches have a lower hatching and fledging success than one-egg clutches (Hegg et al., Reference Hegg, Greaves, Maxwell, MacKenzie and Jamieson2012). When simulating the effects of captive rearing and release the proportion of nests in which one and two eggs or chicks were removed was based on an analysis of historical egg/chick transfers to the captive-rearing facility in Burwood (Hegg, Reference Hegg2008). The maximum number of eggs or chicks transferred into captivity was also limited to 20, the maximum capacity of the captive-rearing facility.