Introduction of random variation in feed ingredient composition and mixing

For the purpose of this study, only ingredient variation that contributes to variation in phytate (oP), NPP and Ca feed content as well as plant and microbial phytase activities (PPhy and MPhy) was considered. We appreciate that the description of feed P as phytate and NPP may be limited, as, for example, it does not take into account the effects of processing on P availability⁽ Reference Spiehs, Whitney and Shurson ^{9 )}. In principle, the model is flexible to incorporate variation in other ingredient resources, provided that such variation has been measured. The NPP in the feed is a combination of plant NPP (pNPP) and inorganic NPP (iNPP). The dietary Ca also derives from plant (pCa) and inorganic Ca (iCa) sources. The iCa was sourced from both limestone and inorganic salts – that is, mono and dicalcium phosphate.

Variation in the composition of each feed ingredient into the feed was introduced for P and Ca, by considering the standard deviation of each ingredient, from the largest publicly available database of composition of feed ingredients⁽ Reference Sauvant, Perez and Tran ^{19 )} (see online Supplementary Appendix Table S1). However, for some feed ingredients, the number of samples used to calculate their mean and standard deviation values is small, and these values should be used with caution, as they may be partly a result of a sampling error. Although the Sauvant et al. ⁽ Reference Sauvant, Perez and Tran ^{19 )} feed tables provided the PPhy activity (FTU) for all ingredients, they did not provide the associated standard deviations. Therefore, variations of ingredient plant phytase activity were derived from elsewhere⁽ Reference Viveros, Centeno and Brenes ^{20 ,} Reference Steiner, Mosenthin and Zimmermann ^{21 )}. In addition, variation in MPhy supplementation was derived from the literature⁽ Reference Akinmusire and Adeola ^{22 )}; an sd of 300 FTU/1000 FTU was assumed to reflect the variation in supplemented MPhy activity.

A stochastic Monte Carlo simulation was used to investigate the effect of ingredient variation. The inputs of the Monte Carlo simulation were as follows: (1) mean and (2) standard deviation, in each investigated chemical component, for each dietary ingredient (oP, pNPP, pCa and PPhy) or supplement (iNPP, iCa and MPhy).

Using the Monte Carlo methodology, 500 feeds for each scenario considered were drawn at random from the above distribution. Once the chemical content of each ingredient (g/kg ingredient or FTU/kg ingredient) for each feed was established, it was multiplied with the ratio of the ingredient’s contribution to the feed. The addition of each chemical content of each ingredient resulted in the oP_i, pNPP_i, iNPP_i, pCa_i, iCa_i g/kg and PPhy_i and MPhy_i contents for each feed.

The goal of feed mixing is to evenly distribute all ingredients and nutrients throughout the entire batch of feed⁽ Reference Groesbeck, Goodband and Tokach ^{6 )}. A uniform mixture will supply the animal with a balanced diet, ensuring proper nutrient consumption and maximising performance. A CV of 10 % or less for salt or another minor feed ingredient has been adopted as the industry standard to represent a uniformly mixed feed⁽ Reference Traylor, Hancock and Behnke ^{5 ,} Reference Herrman and Behnke ^{23 )}. Salt is the most common ingredient used to evaluate mixing efficiency⁽ Reference Groesbeck, Goodband and Tokach ^{6 )} and it usually represents 0·3–0·5 % of ‘conventional’ feeds. Therefore, in theory, ingredients that make up a significant percentage of the feed (e.g. wheat) will have a much lower CV due to mixing, and this needs to be taken into account when formulating rations.

In order to quantify the later statement, it was first necessary to set the target ingredient composition of the selected feed, assuming perfect mixing. Subsequently, based on this feed, a distribution function was specified, where the probability of occurrence of each ingredient equalled its proportion in the target feed. A repeated random sampling from the distribution that specifies the target feed was carried out, and a random feed was constructed from these samples. When the number of samples increased, the actual composition of the random feed automatically moved closer to that of the feed with perfect mixing – that is, low number of samples demonstrated an inefficient mixing process and a high number an efficient mixing process.

The number of samples needed to achieve the required level of mixing was achieved through an iterative Monte Carlo approach. Monte Carlo simulations with the pig model were carried out, where for each run a separate random feed was constructed. After the simulations, the mean and CV of the proportion of each feed ingredient were specified. The CV of some minor ingredients – for example, limestone – was used as an indicator of the efficiency of mixing. Initially we ran the pig model 500 times, and for each simulation we used a random feed, which remained the same throughout a feeding phase, based on 3000 samples. We found that the simulated CV of limestone content in these feeds was approximately 20 %. We considered this as inefficient mixing. To simulate a better mixing process, we ran the pig model 500 times with 6000 feed samples for each simulation. As a result, we got approximately 10 % simulated CV in limestone content, which is considered an efficient mixing according to industry standards⁽ Reference Traylor, Hancock and Behnke ^{5 ,} Reference Herrman and Behnke ^{23 )}.

Introduction of variation in pig growth traits and start weight

The growth parameters considered to vary between the pig phenotypes were protein at maturity (Pr_m), lipid:protein ratio at maturity (LPr_m) and the scaled maturity rate (B*)⁽ Reference Ferguson, Gous and Emmans ^{1 –} Reference Symeou, Leinonen and Kyriazakis ^{3 ,} Reference Knap ^{24 ,} Reference Pomar, Kyriazakis and Emmans ^{25 )}. A justification for the choice of these parameters, the lack of correlation between them and why they are able to account for both growth rate and body composition in individual pigs is given in the study by Symeou et al.⁽ Reference Symeou, Leinonen and Kyriazakis ^{3 )}.

The mean of Pr_m were estimated from the study by Knap et al.⁽ Reference Knap, Roehe and Kolstad ^{26 )} to be 35 and (sd 4·38) kg. The mean of B* were estimated at 0·0392 and (sd 0·0078) kg/d, respectively, from the calculations of Brossard et al.⁽ Reference Brossard, Dourmad and Rivest ^{27 )} for the data of Rivest⁽ Reference Rivest ^{28 )}; the details of how this estimate was derived are also given in the study by Symeou et al. ⁽ Reference Symeou, Leinonen and Kyriazakis ^{3 )}. Finally, the mean of LPr_m were derived from Knap and Rauw⁽ Reference Knap and Rauw ^{29 )} to be 1·50 and (sd 0·315) kg/kg, which were in turn adapted from the study by Doeschl-Wilson et al.⁽ Reference Doeschl-Wilson, Knap and Kinghorn ^{30 )}. The initial BW of the pigs (BW₀) was in accordance with the methodology of Wellock et al.⁽ Reference Wellock, Emmans and Kyriazakis ^{2 )}, having an average BW₀ of 30 kg, and their chemical composition was calculated assuming that the pigs had their ideal composition set by the genotype⁽ Reference Emmans and Kyriazakis ^{31 )}. The values of B*, Pr_m and LPr_m were assumed to be uncorrelated and normally distributed⁽ Reference Ferguson, Gous and Emmans ^{1 –} Reference Symeou, Leinonen and Kyriazakis ^{3 ,} Reference Knap ^{24 ,} Reference Pomar, Kyriazakis and Emmans ^{25 )}.

Simulation scenarios considered

The model was run between 30 and 120 kg average pig BW. The growth parameters that represent a current genotype were used to derive the requirements for net energy (NE) (MJ), standardized ileal digestible (SID) (g) and digestible P (digP) (g/d), in accordance with Symeou et al.⁽ Reference Symeou, Leinonen and Kyriazakis ^{12 )}. The composition of the feed offered to the pigs changed only once during the simulations at 75 kg BW, in order to meet the nutrient and energy requirements of the average pig. In all scenarios used, the average digP requirements were at the mid-point BW of each feeding period, which was 52 kg for the grower period (30–75 kg BW) and 98 kg BW for the finisher period (76–120 kg). The NE and Lys feed contents were chosen so that the feed was first limiting in digP during each period under consideration (see Table 1).

Table 1 Ingredient and calculated chemical composition of feeds based on conventional and co-product ingredients, offered to growing (30–75 kg body weight (BW)) and finishing (76–120 kg BW) pigs

DDGS, distillers’ dry grain solubles.

* Provided sufficient quantities of vitamins and micro-minerals.

† Calculated compositions from Sauvant et al.⁽ Reference Sauvant, Perez and Tran ^{19 )} feed tables.

Simulations for variation in feed ingredient composition and mixing efficiency

We first considered random variation in ingredient composition (e.g. as a result of growing conditions, hybrid or variety differences, planting and harvest dates and storage and processing) and subsequently variation resulting from potentially inefficient feed mixing. The effects of these variations were considered on either a ‘conventional’ feed or a feed based on co-products (Table 1). The ‘co-product’-based feed was chosen in order to consider the consequences of higher inherent variation in ingredient composition⁽ Reference Sauvant, Perez and Tran ^{19 )}. These feeds were used as a case point to investigate the effect of ingredient variation and/or mixing on P retention and excretion.

The experimental design addressed by the simulations was a 2×2×3 factorial design of two feed compositions (‘conventional’ or ‘co-product’-based feeds), variation in ingredient composition (with or without) and variation in mixing (no mixing effect, efficient or inefficient mixing). At this stage, no variation in the pig growth parameters was included. Therefore, 500 Monte Carlo iterations were used to generate each scenario described above.

For the ‘conventional’ feed scenario, the grower and finisher feeds were formulated on a least-cost formulation (LCF) basis. For each feeding phase, requirements were specified for thirteen nutritional parameters, with the most important being NE (MJ/kg), crude protein, SID Lys and minerals including total Ca, total P and digP (g/kg). In all, seventeen typical ingredients used in UK feed mills were considered; the Sauvant et al.⁽ Reference Sauvant, Perez and Tran ^{19 )} feed tables were used to determine nutritional composition and digestibility values of these ingredients. Information on ingredient prices for most ingredients was obtained from the Public Ledger^{( 32 )}, with specific information on prices for minerals and amino acids provided by Premier Nutrition.

An Excel solver-based linear optimisation tool was used to formulate separate feeds when optimising for LCF. Using the solver function, the inclusion of all ingredients added to 100 %, and the derived feed reached or exceeded the target nutrient values specified at the lowest possible price, without exceeding the specified inclusion limits. The ‘co-product’-based feed did not follow a least-cost methodology, because it was forced to contain ingredients with large inherent variation in P and Ca, irrespective of the cost. Therefore, DDGS and potato protein concentrate were used. This ‘co-product’ feed formulation had a similar chemical composition with the ‘conventional’ one (see Table 1).

Simulations for variation in both feed composition and pig growth traits

The experimental design addressed was a 2×2×3 factorial design of two feed compositions (‘conventional’ or ‘co-product’-based feeds), variation in feed due to mixing process efficiency and ingredient composition (with or without variation in feed composition) and different degrees of variation in pig phenotypic traits (no variation, ‘low’ and ‘normal’ variation). The main difference of this experimental design in comparison with the previous one was that phenotypic variation and variation in feed were included for both the ‘conventional’ and ‘co-product’-based feed.

According to the methodology of Pomar et al.⁽ Reference Pomar, Kyriazakis and Emmans ^{25 )}, we compared populations with different between-animal phenotypic variation. Three populations were generated having 0, 0·5 and 1 times the estimated phenotypic variation of the above reference population. Reducing variation in the growth parameters to 0·5 of the current estimates is consistent with industry desire to increase uniformity among commercial pigs⁽ Reference Sullivan ^{33 )}. A 500 Monte Carlo iteration was applied for each scenario, having a unique combination of the parameters BW₀, Pr_m, LPr_m and B*. The populations addressed in the 0·5 and 1 scenarios differed only in the standard deviation of the distribution of the means of the growth parameters.

Simulation outputs

From the generated simulated populations, which were fed according to the above scenarios, the following outputs were calculated: the population means and standard deviation for total P digested, excreted and retained per day, and the percentage of the population that had their digP requirements met throughout the BW period 30–120 kg of the population. Detailed descriptions of the latter calculations can be found in the study by Symeou et al. ⁽ Reference Symeou, Leinonen and Kyriazakis ^{3 )}.