Selection scheme scenarios

Four different selection scenarios were studied in respect to variable costs and economic efficiency. The scenarios have been described previously by Shumbusho et al. (Reference Shumbusho, Raoul, Astruc, Palhiere and Elsen2013) and are summarized hereafter.

Response to selection

The breeding scheme was assumed to be in a steady state, that is, it had been implemented for long enough to provide a constant annual genetic gain and the same cost each year. Selection response was predicted with deterministic methods based on selection index theory (Hazel, Reference Hazel1943), extending the model developed by Shumbusho et al. (Reference Shumbusho, Raoul, Astruc, Palhiere and Elsen2013) to include multiple traits in each index. The model predicts selection accuracy and genetic superiority of selection candidates, accounting for their age and genetic level.

In this study, two indices were constructed to represent two groups of traits: meat and maternal traits, which are the improvement targets for many meat sheep breeding programs in France (including the Mouton Ile de France breeding program). The meat index (I _b ) was a combination of the average daily gain, back fat depth and conformation score traits, and the maternal index (I _m ) included prolificacy (Pr) and milk value. The genetic parameters and economic values of these indices traits are provided in Table 1 and details on the formulae used for the indices are described in Supplementary Material S1. The heritabilities and correlations are those reported by Bibé et al. (Reference Bibé, Brunel, Bourdillon, Loradoux, Gordy, Weisbecker and Bouix2002) and the economic values and standard deviations (SD) are those reported by Guerrier et al. (Reference Guerrier, Praud, Poivey, Batut, Grenet and Bouix2010).

Table 1 Economic values (a), genetic standard deviation (GSD), heritabilities (bold on diagonal), genetic (above diagonal) and phenotypic (below diagonal) correlations of the traits included in selection indices

Using the physical units of the phenotypic and genetic variances of the traits, and their economic values, the genetic progress was expressed in monetary unit per unit change of the index (i.e. AMGG).

Genomic information was modeled as a trait with a heritability of 1.0, which was genetically correlated to the corresponding selection index (Dekkers, Reference Dekkers2007). This genetic correlation between the genomic information and the index was equal to the accuracy of genomic prediction, r _GBV, which depends on the reference population. The r _GBV was predicted using formulae of Daetwyler et al. (Reference Daetwyler, Swan, van der Werf and Hayes2008):

$$r_{{{\rm GBV}}} {\,=\,}\sqrt {{\rm nref}{\times}h^{{\rm 2}}\!\!\,/\!\,({\rm nref}{\times}h^{{\rm 2}} {\plus}M_{e} )} $$

where M _e =2N _e L/log(4N _e L) is the number of effective genome segments (Goddard, Reference Goddard2009), which depends on the effective population size of the considered population (N _e ) and the genome length in Morgans (L), nref is the number of animals forming the reference population and h ² is the heritability of the trait. As in Shumbusho et al. (Reference Shumbusho, Raoul, Astruc, Palhiere and Elsen2013), the length of the genome was fixed to L=27, and a medium-sized reference population (nref=2000) of genotyped and phenotyped animals and an effective population size of N _e =200 were used to calculate r _GBV.

Evaluation of the variable cost of different selection strategies

Following the model and selection scenarios described in the recent study by Shumbusho et al. (Reference Shumbusho, Raoul, Astruc, Palhiere and Elsen2013), we predicted the annual total variable cost (C) of adopting the different selection strategies. Only costs that vary among the various selection scenarios were considered. Those costs correspond to, on the one hand, genomic information costs and, on the other hand, all other decisional variables characterizing the selection scheme. Formally, the total variable cost, per year, for any selection scenario was given as: C=∑ _i cv _i X _i +cgeno, in which cv _i is the unit cost of the i ^th decision variable, X _i the value or level of the decision variable and cgeno the costs related to genotyping and extra statistical analysis (genomic scenarios only). In more details, cgeno was equal to cgeno=Genoc×(M _s +0.2×nref)+statc were Genoc is the cost of genotyping one individual and statc the fixed costs of statistical analyses on genomic information. Genotyping costs were those spent on male selection candidates and on the renewal of the reference population (a 20% renewal rate was supposed here). The question of to what extent and how often the reference population should be renewed to maintain or improve the prediction accuracy is still open to discussion. The consensus is that the reference population should be updated, at least to maintain GBV accuracy. On the basis of the assumption that this was an established breeding program, the costs of forming an initial reference population were not included in the variable costs.

Except for the costs of genomic information, other costs can be divided into four categories: (i) costs related to maintenance, recording and loss in slaughter of male selection candidates: cmale=Ms×(Msc _p (1−qMs)+Msc _m ) where Msc _p is a unit cost for loss in slaughter, Msc _m the costs of maintenance and recording male selection candidates, and qMs the proportion of males selected as reproducers or males kept for further evaluation. (ii) costs of keeping male reproducers: crepro=nElite×elitec+nNS×NSc, where elitec and NSc are the unit costs of maintaining elites and natural service rams, respectively, and nElite and nNS the number of elite and NS rams used in a given scenario. (iii) costs of AI: cAI=pAI×pAIc where pAI is the number of AI doses and pAIc is the cost per dose. (iv) costs related to progeny testing: ctest=Test×(testc _b +testc _m ), where testc _b and testc _m are the costs per ram of progeny testing for meat and maternal traits, respectively, and Test the number of male progeny tested per year.

Table 2 lists the decisional variables with their unit costs (cv _i ) as well as the cost categories affected by these variables and shows which selection scenarios they have an impact on. Optimal values of decision variables corresponding to the maximum genetic gain described in Shumbusho et al. (Reference Shumbusho, Raoul, Astruc, Palhiere and Elsen2013) are detailed in F. Shumbusho’s PhD dissertation (2014). On the basis of these values, and using the above formulae and unit costs, variable costs associated with classic and GS strategies were estimated (Table 3).

Table 2 Decision variables, related costs and impact of the different costs on selection scenarios

¹ Classic=phenotypic selection and progeny testing with index selection; GS=pure genomic selection; GS-Pheno=combined selection on genomic information and a meat phenotype; GS-PT-index=genomic selection and progeny testing with index selection.

Table 3 Optimal values of decision variables for the modeled scenarios, at different optimization levels

¹ Classic=phenotypic selection and progeny testing with index selection; GS=pure genomic selection; GS-pheno=combined selection on genomic information and a meat phenotype; GS-PT-index=enomic selection and progeny testing with index selection.

² Current=decision variables were those currently used in the breeding program except for genomic information; Optirest=decisional variables were optimized but AI constrained to its current level of use in the breeding unit; Optifull=all decision variables were optimized.

³ Defined in Table 2.

Economic returns and efficiency of different selection strategies

Returns from genetic improvement depend on (i) the magnitude of genetic change (e.g. annual genetic gain expressed in physical or monetary units) and (ii) the extent of each individual’s expression of genetic value on both nucleus and production farms. In the case of the Mouton Ile de France breeding program where selection targets to improve meat and maternal traits, the genetic change is reflected by the number of culled lambs on nucleus (NAn) and production (NAh) farms and breeding females on nucleus (NFn) and production (NFh) farms. The extra genetic value of a lamb attributable to selection is only expressed once in meat traits, but, for maternal traits, the extra genetic value of a female may be expressed more than once because dams are generally used for several years. For females, this multiple expression is quantified by the factor $\mathop{\sum}\limits_{i\,=\,{\equals}a_{1} }^{a_{1} {\plus}n} {\left( {{1 \over {1{\plus}d}}} \right)^{i} } $ , where a ₁ is the age (number of time units) at which females start expressing genetic superiority, n the number of times dams are used as reproducers and d a discounting rate. Table 4 gives population parameters related to the number of animals used to achieve genetic progress. (iii) The time lag between the creation and start of expression of genetic superiority. On nucleus farms, this time lag was approximated by the mean generation interval $(\bar{L})$ . On production farms, the time lag was linked to the rate of replacement from the nucleus (rh) and was approximated by $\overline{{Lh}} {\,=\,}{{\bar{L}} \over {rh}}$ , that is, the asymptotic mean generation interval between a selected cohort in the nucleus and its first descendants born on the production farms (a proportion rh of these descendants are offspring, rh(1−rh) grand offspring, etc.) This approximation is rather conservative because it neglects the erratic results observed over the first few years (Elsen and Mocquot, Reference Elsen and Mocquot1974; Hill, Reference Hill1974). (iv) The time horizon T that is, the moment when any prediction about the organization of the selection scheme looks too fragile (here 30 years).

Table 4 Parameters related to the number of animals used to estimate the genetic gain and to calculate revenues for the selection strategies

The returns from selection on maternal traits (R _m ) and on meat traits (R _b ) are given as:

$$\eqalignno{ & R_{m} {\,=\,}AMGG_{m} \left\{ {\mathop{\sum}\limits_{i\,=\,{\rm }a_{{\rm 1}} }^{a_{1} {\plus}n} {\left( {{1 \over {1{\plus}d}}} \right)^{i} } } \right\} \cr&{\hskip 18pt}\left \{\!{NFn\mathop{\sum}\limits_{t{\,=\,}\bar{L}}^T {\left( {{1 \over {1{\plus}d}}}\right)}^{\!\!\!t} {\plus}NFh\mathop{\sum}\limits_{t{\rm {\,=\,}}\overline{{Lh}} }^T {\left( {{1 \over {1{\plus}d}}} \right)^{\!\!\!t} } } \right\} \cr&R_{b} {\,=\,}AMGG_{b} \left\{\!\!{NAn\mathop{\sum}\limits_{t{\,=\,}\bar{L}}^T {\left( {{1 \over {1{\plus}d}}} \right)^{\!\!\!t} {\plus}NAh} \mathop{\sum}\limits_{t{\rm {\,=\,}}\overline{{Lh}} }^T {\left( {{1 \over {1{\plus}d}}} \right)^{\!\!\!t} }\! } \right\} $$

which result in a total return R=R _m +R _b and a contribution margin CM=R−C. Similarly to Shumbusho et al. (Reference Shumbusho, Raoul, Astruc, Palhiere and Elsen2013), the costs, returns and contribution margins were compared across scenarios in three different situations: (1) with the current values of the decision variables (‘Current’ situation), (2) with all the decision variables in the nucleus optimized except the proportion of AI (‘Optirest’ situation), and (3) with all decisions variables optimized (‘Optifull’ situation). Situation 3 allows a fair comparison between scenarios. Changes from situation 1 to 3 demonstrate the interest of optimization within scenario v. full reorganization of selection schemes adopting GS. Scenario 2 is an alternative to scenario 3 when avoiding changes in AI use, as the development of this technics is still limited by many factors, such as its cost and use of fresh semen in sheep. In Shumbusho et al. (Reference Shumbusho, Raoul, Astruc, Palhiere and Elsen2013), this procedure was applied using AMGG as the objective function, submitted to constraints between decision variables. In the present study, two approaches were followed: assessment of the economic efficiency of these technically optimized schemes (variable levels given in Table 3) and estimation of the maximum profitability (using either maximum R or CM) at a given C level. The second approach was justified by the observation that, when costs are not taken into account in the maximization program, the optimal scheme that are obtained leads to very different total variable cost. It is hence interesting to analyze how these results are affected when maximizing the AMGG at given level of variable costs.

At the time when this work was done, the cost of genotyping an individual with the OvineSNP50 BeadChip array was ∼123 euros; therefore, the 123 euros costs was considered when estimating in the section dealing with optimized returns at given total variable costs. However, a lower cost of 70 euros was also considered when comparing scenario technically optimized.