Prediction

In ruminants, fractional passage rates in the rumen determine the availability of substrates for degradation by microorganisms, as well as the efficiency of microbial growth. Several studies conducted using markers of the liquid and particulate fractions have shown that the fractional passage rate of digesta largely depends on intake level. It also differs between liquid and particulate phases, forage v. concentrate particles, size of particles (Owens and Goetsch, Reference Owens and Goetsch1986), and according to the nature of components (protein, starch, cell wall).

In the initial version of the PDI system (INRA, 1978 and 1988 and 2007), the fractional passage rate (kpt) was fixed at 6%/h for potentially degradable particles, and was not considered for soluble fractions that were assumed to be immediately degraded. In the DVE/OEB system, fractional passage rate was fixed at 4.5%/h for forages (kft) and 6%/h for concentrates (kct; Tamminga et al., Reference Tamminga, Vanstraalen, Subnel, Meijer, Steg, Wever and Blok1994). Rather similar equations based on DMI, % forage and NDF fraction were proposed by NRC with a difference between wet and dry forages (NRC, 2001). In the NorFor system (Volden, Reference Volden2011), fractional passage rates were dissociated between forages and concentrates and dependent on the level of DMI/BW^0.75 and the proportion of forage in the diet; they used, as did the Cornell Net Carbohydrate and Protein System (CNCPS) (Sniffen et al., Reference Sniffen, Oconnor, Vansoest, Fox and Russell1992), and Feed into Milk (FiM) systems (Thomas, Reference Thomas2004), the equations initially proposed in 1990 by Sauvant and Archimède, cited by Sauvant et al. (Reference Sauvant, Giger-Reverdin and Meschy1995). In these equations the prediction of kct was indexed on the kft values. In contrast, in the proposals of NRC (2001) and Seo et al. (Reference Seo, Tedeschi, Schwab, Garthwaite and Fox2006), both kft and kct calculations were based on DMI/BW and on the proportion of forage in the diet. Moreover, in NorFor (Volden, Reference Volden2011) there is a specific equation to predict the low outflow rates of the non-digestible NDF fractions of forages and concentrates. In the current DVE/OEB₂₀₁₀ system (Van Duinkerken et al., Reference Van Duinkerken, Blok, Bannink, Cone, Dijkstra, Van Vuuren and Tamminga2011), separate fractional passage rates were proposed for CP, starch, NDF and remainder non starch polysaccharides, in addition to the distinction between liquids, concentrate and forage particles. Contrasting with other proposals, the Dutch one did not include any influence of DMI and proportion of forage, they only used predictions based on feed density. We did not retain the feed density because it is poorly documented in the literature.

Using the BoviDig database, the FL (varying from 1 to 4.5 g DM/100 g BW) and the proportion of concentrate (0<PCO<1) were found to be the main predictive factors for fractional passage rates (%/h) of forage particles (kft=3.38±1.29, min=1.18, max=7.1%/h), concentrate particles (kct=5.97±1.88, min=2.05, max=11.2%/h), and liquids (klt=10.23±3.54, min=3.00, max=22.30%/h), actually measured using markers. The predictive equations are:

(1) $$\eqalignno{&#x0026;{\rm kft\,\,{=}\,\,2}{\rm .02{\plus}0}{\rm .88 \,FL - 3}{\rm .13 \,PCO}^{{\rm 2}} \cr \quad \left( {n\,{=}\,{\rm 236},{\rm }n\,{\rm exp}\,{=}\,{\rm 95},{\rm RSD}\,{=}\,0.{\rm 41}\&#x0025;/{\rm h}} \right)$$

(2) $$\eqalignno{&#x0026;{\rm kct\,{=}\,2}{\rm .53{\plus}1}{\rm .22 \,FL - 2}{\rm .61 \,PCO}^{{\rm 2}} \cr \quad \left( {n\,{=}\,{\rm 115},{\rm }n\,{\rm \,exp}\,{=}\,{\rm 46},{\rm RSD}\,{=}\,0.{\rm 51}\&#x0025;/{\rm h}} \right)$$

(3) $$\eqalignno{&#x0026;{\rm klt\,{=}\,5}{\rm .35{\plus}2}{\rm .18 \,FL - 3}{\rm .71 \,PCO}^{{\rm 2}} \cr \quad \left( {n\,{=}\,{\rm 582},{\rm }n\,{\rm exp}\,{=}\,{\rm 236},{\rm RSD}\,{=}\,0.{\rm 87}\&#x0025;/{\rm h}} \right)$$

The mean fractional passage rate of particles (kpt) within a given diet can be calculated from kft, kct and PCO.

(4) $${\rm kpt\,{=}\,kft }\left( {{\rm 1{\minus}PCO}} \right){\rm {\plus}kct \,PCO}$$

These equations, illustrated in Figure 1 in the case of a mean value of PCO, show that within a given diet fractional passage rate is lower for forage particles that require more mastication, than for concentrate particles. They also reflect the finding that the motility of the rumen decreases when PCO increases, as already observed by Owens and Goetsch (Reference Owens and Goetsch1986). Equations (1) and (2) illustrate that the value of 6%/h fixed in the PDI₁₉₈₈ system is never reached by forage particles, and only reached by concentrate particles when FL exceeds ~3.5 g/100 g BW. This means that compared to the PDI₁₉₈₈ system, the residence time of feed fractions (i.e. nitrogen) in the rumen is supposed to be longer, resulting in a lower fraction escaping microbial degradation. We have checked that the values of fractional passage rates calculated by equations (1) to (3) are close (<1%/h of difference) to the values calculated by the similar equations proposed in Sauvant et al. (Reference Sauvant, Giger-Reverdin and Meschy1995), NRC (2001), NorFor (Volden, Reference Volden2011), FiM (Thomas, Reference Thomas2004) and Seo et al. (Reference Seo, Tedeschi, Schwab, Garthwaite and Fox2006).

Figure 1

Intra-experiment relationship between dry matter intake in cattle and (a) transit outflow rates of liquids and particles; (b) outflow rates of forages and concentrates.

Implications on revised feed tables

To account for the effect of FL and PCO on fractional passage rate and therefore on digestion and nutritive values, each feedstuff is classified either as a forage, or as a concentrate, as already described in INRA (2007) except that dehydrated forages are considered as forages. Moreover, each feedstuff is characterized in the revised feed tables by a reference FL (FLref, in g DMI/100 g BW). For forages, the FLref corresponds to the ad libitum intake of DM of a given forage by standard castrated sheep, which has been used for decades at INRA for measurement of forage digestibility and energy value (Demarquilly and Weiss, Reference Demarquilly and Weiss1970; Andrieu et al., Reference Andrieu, Demarquilly and Sauvant1988; Baumont et al., Reference Baumont, Dulphy, Sauvant, Meschy, Aufrère and Peyraud2007). This value ranges from 1.1 (low-quality hays) to 3.4 (early fresh grass); the only exception is corn silage, for which the calculations are performed with a constant FLref of 1.44 as suggested by Andrieu et al. (Reference Andrieu, Demarquilly and Sauvant1988). For concentrates and co-products, it is considered in the tables that FLref=2, that is the average value for the most commonly used forages.

The in situ approach

For proteins and starch, the prediction of the digestion in the rumen is often based on the integration of in situ degradation kinetics obtained by the method of nylon bags incubated in the rumen and removed after various incubation times (Michalet-Doreau et al., Reference Michalet-Doreau, Vérité and Chapoutot1987). In contrast, this approach has not been retained for NDF because the in situ degradation of NDF is highly sensitive to the ruminal environment (Nozière et al., Reference Nozière, Besle, Martin and Michalet-Doreau1996; Archimède et al., Reference Archimède, Sauvant and Schmidely1997), and because data are less numerous than for protein and starch.

The effective degradability (ED in g/100 g) of proteins and starch results from the combination of the fractional passage rate, and the fractional degradation rate of their different fractions:

(5) $${\rm ED\,{=}\,a }\left[ {{\rm 100/}\left( {{\rm 100{\plus}klt}} \right)} \right]{\rm {\plus}b }\left[ {{\rm kd/}\left( {{\rm kd{\plus}kpt}} \right)} \right]$$

In this equation, a (g/100 g) is the washable and rapidly degradable fraction; it is assumed to be degraded at a fractional rate of 100%/h, and to outflow the rumen with the liquid phase at the fractional rate klt (equation (3)). This fractional degradation rate is not easy to know precisely; therefore the current FUS adopted a common high value (either 100, or 150 or 200) for all feeds. The fraction b (g/100 g) is the potentially degradable one; it is assumed to be degraded at a fractional rate kd (%/h), and to outflow the rumen with the particulate phase at the fractional rate kft for forage (equation (1)) or kct for concentrate (equation (2)).

In order to estimate a, b and kd, degradation (D(t), in g/100 g) as a function of time (t, in h), is fitted using a first-order exponential model (Ørskov and McDonald, Reference Ørskov and McDonald1979):

(6) $${\rm D}\left( t \right){\rm \,{=}\,a{\plus}b}\,{\times}\,\left( {{\rm 1}-{\rm exp}^{{-{\rm kd}\,{\rm {\times}}\,t}} } \right)$$

when a, b and kd are not known and when the effective degradability (g/100 g) is calculated from in situ degradation using the step by step method (Kristensen et al., 1982) assuming a transit outflow rate of 6%/h (ED₆). It is possible to predict ED from ED₆ as described by Sauvant and Nozière (Reference Sauvant and Giger-Reverdin2013).

The in vivo validation for nitrogen

For nitrogen, the BoviDig_PDI database was used for validation of the equation (5). The measured duodenal flow of non-microbial CP (NMCPduo=47.0±22.3, min=11.6, max=125.4 g/kg DMI), that represents the sum of undegraded dietary CP and endogenous CP at duodenum, was used. It was compared to the duodenal flow of undegraded CP estimated from in situ data of ED_N calculated with equation (5) (67.7±8.5, min=39.9, max=88.7%), using a within-experiment regression (Figure 2a):

(7) $$\eqalignno{&#x0026;{\rm NMCPduo\,{=}\,14}{\rm .2{\plus}0}{\rm .96}\,{\rm CP}\,\left( {{\rm 1-0}{\rm .01}\,{\rm ED\_N}} \right) \cr \quad \left( {n\,{\rm {=}311;\,}n\,{\rm exp\,{=}\,121;\,}\,{\rm RSD\,{=}\,8}{\rm .8}} \right)$$

The intercept of 14.2 is significantly different from 0, and represents the duodenal endogenous CP (EndoCP, in g/kg DMI). The slope of 0.96 of equation (6) does not differ from the value 1 (Student’s test) and the 0.01 is applied as ED is expressed as a percentage. This validates the use of the equation 5, which integrates the effects of FL and PCO on fractional passage rate applied to in situ data to provide an unbiased prediction of digestion of dietary proteins in the rumen. The following simplified equation can thus be retained to calculate the flows of rumen degraded protein (RDP, in g/kg DM) and undegraded protein flowing at duodenum (RUP, in g/kg DM):

(8) $${\rm RDP\,{=}\,CP}\,{\rm 0}{\rm .01}\,{\rm ED\_N}$$

(9) $${\rm RUP\,{=}\,CP}\,\left( {{\rm 1-0}{\rm .01}\,{\rm ED\_N}} \right)$$

Figure 2

Intra-experiment relationship between (a) non microbial CP flow at duodenum and non-degradable CP in sacco (experiments focused on effects of quantity and quality of protein); (b) starch flow at duodenum and non-degradable starch in sacco (experiments focused on influence of quantity and quality of starch).

The in vivo validation for starch

For starch, the BoviDig_Starch database was used for validation of the equation (5). The measured duodenal flow of starch, that represents ruminally undegraded starch (RUSt=102.2±49.6, min=2.7, max=280 g/kg DMI) was compared to the duodenal flow of starch estimated from in situ data, calculated using equation (5) for ED_Starch (72.8±8.1, min=52.9, max=90.6%, using a within-experiment regression (Figure 2b):

(10) $$\eqalignno{&#x0026;{\rm RUSt\,{=}\,}-{\rm 3}{\rm .95{\plus}1}{\rm .08}\,{\rm Starch}\,\left( {{\rm 1}-{\rm 0}{\rm .01}\,{\rm ED\_Starch}} \right)\; \cr \quad \left( {n{\rm \,{=}\,283,}\,n\,{\rm exp\,{=}\,116,}\,{\rm RSD\,{=}\,22}{\rm .1}} \right)$$

The intercept does not differ from 0 and the slope does not differ from 1, moreover no effect of FL or PCO is observed on the residuals of this equation. As was the case for nitrogen, this validates the use of the equation 5 applied to in situ data to provide an unbiased prediction of digestion of starch in the rumen. However, equation (10) was much less accurate than equation (7). The following simplified equations can thus be retained to calculate the flow of starch at duodenum (RUSt, g/kg DMI) and the flow of starch digested in the rumen (RDSt, g/kg DMI):

(10’) $${\rm RUSt\,{=}\,Starch}\,\left( {{\rm 1-0}{\rm .01}\,{\rm ED\_Starch}} \right)$$

(11) $${\rm RDSt\,{=}\,Starch}\,{\times}\,{\rm 0}{\rm .01}\,{\rm ED\_Starch}$$

Implications on feed values

The updated values of ED_N and ED_Starch of feedstuffs are now calculated using equation 5. For a given feedstuff, the a, b, kd values are considered to be constant (Sauvant et al., Reference Sauvant, Giger-Reverdin, Serment and Broudiscou2002). The fractional passage rates of particulate fractions of forages (kpf), concentrate (kpc) and soluble phase (ktl), are calculated using equations 1, 2 and 3, respectively. For tabulated values, it is assumed FL=FLref, and PCO=0. For the values of the feed within a diet, we use the values of FL and PCO corresponding to the diet. These principles constitute a first justification that the nutritive value of a given feedstuff varies depending on the diet in which it is included.

Definition and biological significance

The rumen protein balance (RPB, g/kg DMI) represents the difference between CP intake and non-ammonia CP (i.e. undegraded dietary CP+microbial CP+endogenous CP) flowing out at the duodenum.

(12) $${\rm RPB\,{=}\,CP\,-}\left( {{\rm RUP{\plus}MicCP{\plus}EndoCP}} \right)$$

with RUP, MicCP and EndoCP defined according to equations (9), (41’) and (7), respectively. Equation (12) can be rearranged into equation (12’):

(12’) $${\rm RPB\,{=}\,RDP-MicCP-EndoCP}$$

The RPB is commonly measured using animals canulated at the duodenum. Across the overall BoviDig database, the measured values of RPB range between approximately −50 and +100 g CP/kg DMI (11±32 g/kg DMI). It primarily, and linearly, depends on the dietary CP with CP ranging across diets from <50 to >250 g/kg DM. Within-experiment, the relationship is accurate:

(13) $$\eqalignno{&#x0026;{\rm RPB\,{=}\,}-{\rm 84}{\rm .5{\plus}0}{\rm .61}\,{\rm CP}\cr &#x0026;\quad\left( {n{\rm \,{=}\,735, }\,n\,{\rm exp\,{=}\,285, RSD\,{=}\,8}{\rm .6}} \right)$$

This relationship illustrates that the dietary CP content corresponding to RPB=0 is almost 140 g/kg DM, and that when data are expressed on a DMI basis, on average ~60% of changes in CP intake do not reach the duodenum as non-NH3 CP. This accounts for the net balance between NH3 absorption and urea recycling through gut wall and saliva. Using 220 available experiments, it was found that RPB values have a large influence on the NH3-N content of the rumen fluid (121.5±55.7, min=5, max=393 mg/l), the within-experiment regression is:

(14) $$\eqalignno{&#x0026;{\rm NH3{\minus}N\,{=}\,105}{\rm .2{\plus}1}{\rm .45}\,{\rm RPB}\cr &#x0026;\quad\left( {n{\rm \,{=}\,570,}\,n\,{\rm exp\,{=}\,220,}\,{\rm RSD\,{=}\,20}{\rm .8}} \right)$$

Moreover, RPB expressed in N/kg DMI is the first factor accounting for urinary N losses (UN 9.2±3.5, min=2.0, max=23.5 in g/kg DMI), as also observed in sheep and goats (Nozière et al., Reference Nozière, Giger-Reverdin, Chapoutot and Sauvant2013).

(15) $$\eqalignno{&#x0026;{\rm UN\,{=}\,7}{\rm .72{\plus}0}{\rm .62}\,{\rm RPB\_N}\cr &#x0026;\quad\left( {n{\rm \,{=}\,109,}\,n\,{\rm exp\,{=}\,35,}\,{\rm RSD\,{=}\,1}{\rm .0}} \right)$$

In several systems (NRC, DVE/OEB, NorFor), the RPB is already used as an index of the difference between the microbial protein synthesis permitted from available degradable CP in the rumen and that permitted from energy extracted from rumen fermented organic matter. In these systems, recommendations to ensure that RPB is close to zero and not negative are provided. In the initial version of the PDI system, RPB was not used but a fairly similar quantity was the calculated index Rmic=(PDIN-PDIE)/UF (Agabriel et al., Reference Agabriel, Pomiès, Nozières and Faverdin2007), that is highly correlated to RPB, but is neither measurable nor additive. In Systali project, the RPB, that is additive and measurable, has been considered as a relevant criterion not only to assess the equilibrium between degradable N and available energy in the rumen, but also to integrate quantitative effects of energy×nitrogen interactions on digestive processes, and particularly on OM digestibility (OMd) and microbial growth (see following paragraphs). Moreover it will be used to predict N urinary losses.

Prediction

Given that in equation (12’) the difference RDP-MicCP reflects the degradable CP that is not recovered as microbial CP, RPB can be calculated from the criteria of the PDI system:

(12’’) $${\rm RPB\,{=}\,}-{\rm 14}{\rm .2{\plus}}\left( {{\rm PDIMN{\minus}PDIME}} \right){\rm /}\left( {{\rm 0}{\rm .8}{\times}{\rm 0}{\rm .8}} \right)$$

where PDIMN and PDIME are the digestible microbial protein when nitrogen and energy are limiting, respectively, assuming that microbial protein accounts for 0.8 of MicCP, and is digested at 80%. Due to the endogenous CP at the duodenum of 14.2 g/kg DMI (cf equation (7)), the strict equilibrium between energy and nitrogen supply to microbes for microbial synthesis in the rumen is not obtained when RPB=0, but when RPB=−14.2 g/kg DM. The external evaluation of equation (12’’) on the database OviDig (34 exp, 102 trt) shows an unbiased prediction of actually measured RPB (Nozière et al., Reference Nozière, Giger-Reverdin, Chapoutot and Sauvant2013).

Definition and implication in current feed evaluation systems

The phenomena of digestive interactions have long been known in ruminants. They are responsible for the non-additivity of feed values (FV) of feedstuffs within a ration:

(16) $${\rm FV}_{r} {\rm \,{=}\,\Sigma }i\,\left( {{\rm FV}_{i} {\times}\,{\rm P}_{i} } \right){\rm \,\pm\,DI}$$

where FV _r is the feed value of the ration, FV _i is the feed value of the feedstuff i, P _i is the proportion of the feedstuff i within the ration (Σ _i P _i =1), and DI is the term for the digestive interaction that can be negative or positive. A first challenge was to identify the main factors involved in these digestive interactions, to quantify their respective effects, and to include them in a model that is compatible with a feed evaluation system.

Current FUS for ruminants use different ways to account for these digestive interactions. In the NRC (2001), a multiplicative factor (discount factor) based on the level of production is applied to the digestibility of the diet (Total Digestible Nutrient, TDN). In NorFor (Volden, Reference Volden2011), the interaction is calculated with a mechanistic model of cell wall digestion in the rumen. In the FiM system, a global interaction was directly applied at the level of metabolizable energy (Thomas, Reference Thomas2004). It appears that the FUS used in Finland (http://www.mtt.fi/rehutaulukot/) offers the most advanced model, and considers respectively influences of the FL, the dietary energy content, the proportion of concentrate and the CP content of the ration, quantified from meta-analyses of many literature data (Huhtanen et al., Reference Huhtanen, Rinne and Nousiainen2009; Nousiainen et al., Reference Nousiainen, Rinne and Huhtanen2009). So far, in the INRA net energy system (UF), digestive interactions were taken into account through an overall correction of the NE value of the ration for dairy cows (Faverdin et al., Reference Faverdin, Delagarde, Delaby and Meschy2007), or of the NE requirements for the dairy goats (Sauvant et al., Reference Sauvant and Nozière2007). This correction has been derived from feeding trials without measurement of any digestibility (Vermorel et al., Reference Vermorel, Coulon and Journet1987; Vermorel and Coulon, Reference Vermorel and Coulon1998), moreover no impact of digestive interactions have so far been taken into account in the INRA MP system (PDI).

Evaluation of digestive interactions on organic matter digestibility

Given that the OMd is the major component of NE value and microbial protein supply, and that it can easily be measured in vivo and/or predicted from chemical composition of feedstuffs or from laboratory methods, it is systematically indicated in feed tables associated to the INRA feed evaluation systems. Consequently, OMd appeared as the best measure of feed value and thus the best criteria with which to assess digestive interactions. According, equation (17) was derived from equation (16) by substituting OMd for FV.

(17) $${\rm \Delta OMd\,{=}\,}\left[ {{\rm \Sigma }_{i} \left( {{\rm OMd}_{i} {\times}{\rm POM}_{i} } \right)} \right]{\rm -OMdm}$$

ΔOMd is the digestive interaction, OMd _i is the tabulated OMd of the feedstuff i, POM _i is the proportion of OM of the feedstuff i into the dietary OM (Σ _i POM _i =1), and OMdm is the OMd of the ration actually measured in vivo. With this expression, ΔOMd>0 when DI<0, and reciprocally.

The digestive interactions on OMd mainly occur at the ruminal level; using the BoviDig database they appeared to be related to three major causes: (i) an increased passage rate of digesta that reduces availability of substrates to microorganisms when intake increases; (ii) a decreased pH that inhibits cellulolytic microorganisms when the proportion of concentrate in the diet increases; (iii) a change in microbial activity depending on nitrogen availability. The principle of the approach has been to study and quantify the effects of FL, PCO and RPB on ΔOMd (i.e. the difference, for the same rations, between OMd calculated by additivity from INRA feed tables, and OMdm actually measured in vivo) through three sub-databases pooling experiments respectively focused on the influences of FL, PCO and RPB.

Effect of FL

To quantify the effect of FL on OMd, data from digestibility trials in which the experimental factor was the FL of the same diet were extracted from BoviDig and Rumener databases. To overcome the differences between species, the FL was expressed as % of BW and not BW^0.75 (Sauvant et al., Reference Sauvant and Nozière2006). Statistics were the following for OMd (70.9±7.2, min=45.8, max=87.3) and FL (1.7±0.7, min=0.4, max=4.0), and a within-experiment regression (Figure 3a) was calculated:

(18) $$\hskip20pt\eqalignno{&#x0026;{\rm OMdm\,{=}\,76}{\rm .0}-{\rm 2}{\rm .74}\,{\rm FL} \cr \quad\left( {n{\rm \,{=}\,400,}\,{n\,{\rm exp\,{=}\,152,}\,{\rm RSD\,{=}\,1}{\rm .6}} \right)\hskip28pt$$

The very low RSD compared to the precision of in vivo OMd measurement (Charlet-Lery, Reference Charlet-Lery1969) emphasizes the good quality of the present relationship. A comparable equation was already proposed by Sauvant and Giger-Reverdin (Reference Sauvant, Assoumaya, Giger-Reverdin and Archimède2009). The negative slope illustrates the effect of the increased digesta passage rate when FL increases, as discussed previously. This slope is lower than the corresponding slope proposed by Weiss (Reference Weiss1998) and used in the NRC (2001). The slope of the equation (18) was not affected either by the CP content, or by the average OMd of the diets. In contrast, NRC (2001) assumed that the response of TDN to FL increased with the average TDN value of the diet, but this was established on only 17 treatments.

Figure 3

Intra-experiment relationship between (a) dry matter intake and OM digestibility of the diet (experiments focused on influence of feeding level); (b) proportion of concentrate in the diet and the difference between OM digestibility (OMd) calculated from tables INRA (2007) and actual in vivo OMd (experiments focused on influence of level of concentrate); (c) rumen protein balance (RPB) and the difference between OM digestibility (OMd) calculated from tables INRA (2007) and actual in vivo OMd.

Assuming that for a given feedstuff, the tabulated OMd has been measured at its reference FL (as discussed previously), the ΔOMd related to FL (ΔOMd_FL) can be calculated as:

(19) $${\rm \Delta OMd\_FL\,{=}\,2}{\rm .74}\,\left( {{\rm FL}-{\rm FLref}} \right)$$

Effect of proportion of concentrate

To quantify the effect of PCO on digestive interactions (ΔOMd_CO), data from digestibility trials where the PCO varied a lot within-experiment, were extracted from the BoviDig_PDI database. ΔOMd, that represents ΔOMd_CO with this data set, was calculated. The within-experiment regression (Figure 3b) was then estimated as:

(20) $$\eqalignno{\Delta {\rm OMd\_CO\,{=}\,6}{\rm .5/}\left( {1{\plus}\left( {0.35/{\rm PCO}} \right)^{3} } \right)\; \cr\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\!\! \left( {n\,{=}\,72,\,n\exp \,{=}\,30,\,{\rm RSD\,{=}\,1}{\rm .2}} \right)$$

This relationship was not affected by any other factors of interaction hidden in the between experiment variability. Again, RSD was low compared to the precision of OMd measurements. This equation (20) illustrates that calculation of OMd from tabulated data assuming additivity of DOM of feed tables leads to an overestimation of the actual OMd of diets with high PCO, with a theoretical maximal interaction effect of 6.5 points when PCO=1. It also illustrates that when PCO>0.4, the marginal effect of an increase in PCO is less marked, probably due to the stabilization of the new balance in the ruminal ecosystem and/or to the low proportion of forage, which is the main component of the diet affected by this interaction.

Effect of the rumen protein balance

To quantify the effect of RPB on OMd, data from digestibility trials where the experimental factor was the dietary level of degradable CP were extracted from the BoviDig_PDI database. The digestive interaction on OMd due to RPB (ΔdMO_RPB) was calculated as ΔOMd (equation (17)) corrected for the concomitant effects of FL (equation (19)) and PCO (equation (20)):

(21) $${\rm \Delta OMd\_RPB\,{=}\,\Delta OMd}-{\rm \Delta OMd\_FL}-{\rm \Delta OMd\_CO}$$

The within-experiment regression (Figure 3c) was then calculated:

(22) $$\eqalignno{&#x0026;{\rm \Delta OMd\_RPB\,{=}\,}-{\rm 0}{\rm .26-0}{\rm .060}\,{\rm RPB}\cr &#x0026;\quad\left( {n\,{=}\,{\rm 334},\,n\,{\rm exp}\,{=}\,{\rm 133},\,{\rm RSD}\,{=}\,{\rm 2}.{\rm 2}} \right)$$

This relationship, with an intercept that does not differ from 0, and which is linear across the large range in RPB (from approximately −50 and +100 g CP/kg DMI) indicates that with diets deficient in RDP (RPB<0), the OMd value calculated by additivity from INRA feed tables overestimates measured OMd, whereas the opposite trend occurs for diets rich in RDP (RPB>0). With urea-supplemented low N diets, this effect on OMd appears limited to RPB<20 (Chapoutot et al., Reference Chapoutot, Nozière and Sauvant2013b). Based on this relationship (equation (22)), it becomes possible to account for the effects of energy×protein interactions in the rumen on OMd. So far, only the recent Finnish FUS system includes such an effect, based on the CP content of the diet. Both corrections based on CP according to the Finnish system, or based on RPB according to the present approach, have globally a similar impact on the NE of diets.

In practice, each feedstuff will be characterized in tables by a reference RPB (RPBref, in g CP/kg DM), representative of RPB during the in vivo measurement of OMd retained for the tables. Within a diet, ΔOMd_RPB of each ingredient is thus indexed on the difference between RPB of the diet and RPBref.

(23) $${\rm \Delta OMd\_RPB\,{=}\,-0}{\rm .060}\,\left( {{\rm RPB}-{\rm RPBref}} \right)$$

For corn silage and straws RPBref is assumed to be 0, because tabulated OMd measurement for these materials was carried out using urea N supplementation to compensate for the deficit in RDP. If these forages are given alone or with insufficient RDP supplementation, there is a decrease of −0.06 OMd per g of decrease of RPB compared to the tabulated OMd value. This principle could be applied to all forages that are of low protein content (RPB<0) if it is certain that tabulated in vivo OMd measurement has been made with the right level of RDP supplementation. If it is not the case, it is possible to predict from equation (23), assuming RPBref=RPB calculated according to equation (12’’), the potential gain in OMd expected from a given protein supplementation. For all other forages, tabulated OMd is determined in vivo using the forage given alone, thus RPBref=RPB (with RPB calculated according to equation (12’’)). For concentrate and by-products, it is necessary to associate a forage and at least two levels of inclusion to measure OMd. The procedure used varies in terms of the forage/concentrate ratio and the nature of forage, but all procedures tend to converge towards approximately RPBref=0.3 RPB (with RPB calculated according to equation (12’’)) which corresponds approximately to a dietary CP content comprised between 120 and 180 g/kg DM for OMd measurement. Therefore, this value of RPBref=0.3 RPB was applied for all concentrates and by-products. With this way of calculation, ΔOMd_RPB is globally and curvilinearly related to RBP, reaching a plateau corresponding to a maximum of 2 points of OMd.

Additivity of the effects

The additivity of effects related to the application of the equations (19), (20) and (23) was assessed on the 346 treatments from the BoviDig_PDI data set. With this data set, ΔOMd_FL, ΔOMd_CO and ΔOMd_RPB averaged 4.1, 3.9 and −0.9, respectively, reflecting that FL and concentrate proportions are the main causes of digestive interaction encountered in practice. The OMd of the ration was calculated (OMdc) from feed tables and application of interactions, assuming their additivity:

(24) $${\rm OMdc\,{=}\,}\left[ {{\rm \Sigma }_{i} \left( {{\rm OMd}_{i} {\times}{\rm POM}_{i} } \right)} \right]-{\rm \Delta OMd}$$

(25) $${\rm with\,\,\Delta OMd\,{=}\,\Delta OMd\_FL{\plus}\Delta OMd\_CO{\plus}\Delta OMd\_RPB}$$

The relationship between predicted OMdc and the measured OMdm did not significantly differ from 1 (Y=X), with a RSD of 4.6, which was reduced to 2.2 when the experiment effect is taken into account (Figure 4). This means that in practice the interactions can be calculated and applied separately, and can be considered as additive. The external evaluation of the equation (24) from OviDig (83 exp, 234 trt) and Caprinut (128 exp, 381trt), shows an unbiased prediction of variation in actually measured OMd, but suggests that ΔOMd_CO needs to be slightly attenuated for application of small ruminants (Nozière et al., Reference Nozière, Giger-Reverdin, Chapoutot and Sauvant2013).

Figure 4

Relationship between measured and calculated OM digestibility taking into account the three digestive interactions.

Evaluation in current FUS, and limitations

The prediction of the OM truly digested in the rumen (OMtDR, g/kg DMI) is a key issue in the future of FUS for ruminants. Indeed, OMtDR not only supports the production of microbial protein, that is a major source of AA for the host, but also conditions the loss in energy as CH4, and the supply of volatile fatty acids to the host. The OMtDR can be experimentally measured in vivo, but due to the relative imprecision, the difficulty and the cost of such measurements, more simple criteria more or less representative of OMtDR are actually used in FUS.

In the first version of the PDI system, the digestible OM in the total tract (DOM), that was already well documented as it is the main component of the NE value, was taken as a predictor of OMtDR (INRA, 1978), and this principle has also been used in other systems, particularly the NRC (2001). In the first revision of the PDI system (Vérité et al., Reference Verité, Rulquin, Pisulewski and Guinard-Flament1987), the FOM was defined as the DOM minus the fractions of DOM that are not fermented in the rumen, that is fermentation products of silage (FP), crude fat (estimated by ether extract) and the fraction of CP undegraded in situ (RUP, calculated using ED₆_N). This principle was also adopted in the OEB/DVE system (Tamminga et al., Reference Tamminga, Vanstraalen, Subnel, Meijer, Steg, Wever and Blok1994), that also subtracted the fraction of starch undegraded in situ (RUSt, calculated using ED₆_St). This last principle has also been applied in INRA feed tables since 2002 (INRA-AFZ, 2002). Despite these revisions, the actual OMtDR remained inaccurately predicted by these derivations from FOM, due to several simplifications in the hypotheses of calculation, namely: (i) the ruminal passage rate of CP and Starch was supposed constant, and RUP and RUSt were assumed to be totally digestible in the intestines; (ii) CF was assumed to be totally indigestible in the rumen and totally digestible in the intestines; (iii) digestible NDF was assumed to be totally digested in the rumen; (iv) the OMD that does not account for CP, starch, NDF, CF or FP, was assumed to be totally fermented in the rumen; (v) no digestive interactions were integrated in the calculation of OMD.

Other FUS (CNCPS, NorFor, FiM) estimated OMtDR using an approach based on summation of rumen degraded fractions, estimated with the in situ approach. Despite being more mechanistic and a priori more dynamic, the main limitations of this approach is the small number of publications with in situ degradation of NDF, moreover this criteria is very sensitive to the ruminal environment, as discussed previously. This limitation is not negligible given the high contribution of NDF digestion in the rumen to the OMtDR (35±21% on 492 treatments in BoviDig).

A new proposal to calculate FOM

In the Systali project, the basic principle of basing FOM on the subtraction from DOM of the digestible but non fermented fractions, already adopted by INRA since 1988, was maintained. However, given the limits described above, new proposals have been developed to refine the quantification of each fraction involved in the following generic equation:

(26) $$\eqalign{{\rm FOM\,{=}\,DOM}-{\rm DOMint-FP\,{=}\,DOM} \cr\qquad\quad-{\rm \Sigma a}_{i} {\rm {\times}}\left( {{\rm Fduo}_{i} -{\rm Ffec}_{i} } \right)-{\rm FP} (26)$$

This equation relates the OM fermented in the rumen (FOM), apparently digested in the total tract (DOM), digested in the intestines (DOMint), the duodenal flows (Fduo _i ) and the faecal flows (Ffec _i ) of the components i (dietary CP, starch, NDF, fatty acids). For each fraction, the coefficients a _i were statistically compared to 1 (see below).

OM apparently digested in the total tract

This is calculated from OM and OMd as defined in equation (24), and thus accounts for digestive interaction.

(27) $${\rm DOM\,{=}\,OM}\,{\times}\,{\rm 0}{\rm .01}\,{\rm OMd}$$

Dietary CP apparently digested in the intestines

This fraction was considered to be quantitatively close to the dietary CP truly digested in the small intestines with a true digestibility of dr (%), thus it was equated with the PDIA (alimentary protein digestible in the intestines) fraction.

(28) $${\rm Dietary \,CPDint \approx PDIA\,{=}\,CP}\,\left( {{\rm 1-0}{\rm .01}\,{\rm ED\_N}} \right)\,{\rm \cdot}\,{\rm 0}{\rm .01dr}$$

Starch apparently digested in the intestines

This fraction (StDint=80.0±55.0, min=1.2, max=267.1 g/kg DM) mainly depends on the duodenal flow of starch. Data from digestion trials reporting duodenal and fecal flows of starch were extracted from the BoviDig_starch database. The within-experiment regression was then calculated:

(29) $$\eqalignno{&#x0026;{\rm StDint\,{=}\,0}{\rm .21{\plus}0}{\rm .826}\,{\rm RUSt}\,\cr &#x0026;\quad\left( {n{\rm \,{=}\,375,}\,n\,{\rm exp\,{=}\,144,}\,{\rm RSD\,{=}\,4}{\rm .4}} \right)$$

Given that the intercept does not differ from 0, and that in situ data provide an unbiased prediction of RUSt (cf equations (10) and (10’)), StDint can be directly calculated from ED_Starch:

(29’) $${\rm StDint\,{=}\,0}{\rm .826}\,{\rm Starch}\,\left( {{\rm 1}-{\rm 0}{\rm .01}\,{\rm ED\_Starch}} \right)$$

NDF apparently digested in the intestines

As discussed below, we assumed that duodenal flow of NDF could not be accurately predicted from in situ data. In contrast, given that the fecal NDF (NDNDF=174.3±56.1, min=32.6, max=468.9 g/kg DM) accounts for a large part of fecal OM, prediction of intestinal digestion of NDF was assessed from OMd. Data from digestion trials reporting duodenal and/or fecal flows of NDF and OM were extracted from the BoviDig database. The within-experiment regression (Figure 5) was then calculated:

(30) $$\eqalignno{&#x0026;{\rm NDNDF\,{=}\,591}-{\rm 6}{\rm .09}\,{\rm OMd}\cr &#x0026;\quad\left( {n{\rm \,{=}\,1170,}\,n\,{\rm exp\,{=}\,459,}\,{\rm RSD\,{=}\,13}} \right)$$

The slope of the equation (30) was very stable (−7.03 v. –6.09) when only treatments corresponding to 100% forage diets were considered (n=118). With a set of 91 treatments on sheep fed 100% temperate forage diets, Baumont et al. (Reference Baumont, Dulphy, Sauvant, Meschy, Aufrère and Peyraud2007) reported a slope of −8.63. With a set of 752 treatments on ruminants fed tropical diets (Assoumaya et al., Reference Assoumaya, Sauvant and Archimede2007), a slope of −8.45 was obtained. Despite slight differences in slopes between these equations, all lead to very similar results when they were applied to their respective range of validity.

Figure 5

Intra-experiment relationship between OM digestibility and the non-digestible NDF content of the diet.

The flow of NDF at the duodenum (NDFduo=198.1±59.7, min=56.5, max=463.4 g/kg DM) can be accurately predicted from NDNDF with a slope not different from 1:

(31) $$\eqalignno{&#x0026;{\rm NDFduo\,{=}\,11}{\rm .4{\plus}1}{\rm .08}\,{\rm NDNDF}\cr &#x0026;\quad\left( {n\,{=}\,{\rm 591},\,n\,{\rm exp}\,{=}\,{\rm 225},\,{\rm RSD}\,{=}\,{\rm 13}} \right)$$

The intestinal digestion of NDF is then calculated from equations (30) and (31):

(32) $${\rm NDFDint\,{=}\,NDFduo}-{\rm NDNDF}$$

Fatty Acids apparently digested in the intestines

The prediction of total FA at the duodenum (FAduo=46.5±19.7, min=14.2, max=101.5 g/kg DM) and apparently digested in the intestines (FADint=33.7±11.7, min=13.9, max=61.3 g/kg DM) are based on equations already published by Schmidely et al. (Reference Schmidely, Glasser, Doreau and Sauvant2008). These equations have been derived by meta-analysis (Glasser et al., Reference Glasser, Schmidely, Sauvant and Doreau2008; Schmidely et al., Reference Schmidely, Glasser, Doreau and Sauvant2008). The database used concerned digestion trials where intake, duodenal and fecal flows of FA were measured in experiments where dietary FA (=44.5±20.5, min=9.1, max=99.4 g/kg DM) was an experimental factor. The within-experiment regressions were then calculated:

(33) $$\eqalignno{&#x0026;{\rm FAduo\,{=}\,9}{\rm .7{\plus}0}{\rm .75\,\,FA}\;\,\cr &#x0026;\quad\left( {n\,{=}\,{\rm 194},\,n\,{\rm exp}\,{=}\,{\rm 6}0,\,{\rm RSD}\,{=}\,{\rm 3}.{\rm 6}} \right)$$

(34) $$\eqalignno{&#x0026;{\rm FADint\,{=}\,6}{\rm .0{\plus}0}{\rm .599}\,{\rm FAduo}\;\;\cr &#x0026;\quad\left( {n\,{=}\,{\rm 136},\,n\,{\rm exp}\,{=}\,{\rm 4}0,{\rm RSD}\,{=}\,{\rm 3}.0} \right)$$

The high value of the intercept of equation (33) can be interpreted as the microbial FA flow at duodenum. It is known that rumen microbes, particularly attached bacteria, are rich in lipids (Bauchart et al., Reference Bauchart, Legay-Carmier, Doreau and Gaillard1990). The total FA content of concentrates and by-products can be calculated from their ether extract (EE), considering FA=a EE, with 0.45<a <0.90 depending on the feedstuff (INRA-AFZ, 2002). For forages, the FA content can be predicted from their CP content, according to Glasser et al. (Reference Glasser, Doreau, Maxin and Baumont2013) and Maxin et al. (Reference Maxin, Glasser, Doreau and Baumont2013).

Evaluation of the new proposal

This new proposal is based on the hypothesis that the summation of dietary fractions apparently digested in the intestines corresponds to the differences between measured DOM and OMtDR (cf equation (26)). To evaluate this assumption, for each of the four fractions digested in the intestines (FracDint, i.e. PDIA, StDint, NDFDint, and FADint), we calculated the slope of the following within-experiment relationship, using data from experiments specifically focused on the dietary content or quality of the considered fraction (N, starch, NDF and FA, respectively):

(35) $$\left( {{\rm OM}\,{\times}\,{\rm OMdm\cdot}\,{\rm 0}{\rm .01}} \right)-{\rm OMtDR\,{=}\,a{\plus}b}\,{\rm FracDint}$$

For the four relationships which correspond to the four fractions, slopes did not differ from 1 (Table 1), showing that FOM can be predicted by subtracting from DOM the dietary fractions digested in the intestines:

(26’) $${\rm FOM\,=\,DOM-PDIA- StDint}\atop \quad \quad \quad \quad-{\rm NDFDint-FADint-FP}$$

The external evaluation of the equation (26’) from OviDig (27 exp, 84 trt) shows an unbiased prediction of variation in actually measured OMtDR (Nozière et al., Reference Nozière, Giger-Reverdin, Chapoutot and Sauvant2013).

Table 1

Within-experiment relationships between the measured digested OM not accounting for OM truly digested in the rumen ([DOMm−OMtDR], in g/kg DM) and the dietary fractions digested in the intestines (FracDint, in g/kg DM)

Relationships established using data from experiments specifically focused on the dietary content of considered fraction: DOMm−OMtDR=a+b FracDint (cf equation (35)).

Evaluation in current FUS, and limitations

The production of microbial CP (MicCP) has always been a sticking point of FUS due to the uncertainty of measurements, and to the difficulty in extracting the main sources of variation from a limited number of experiments. In the PDI system, MicCP was first considered equal to 120 g/kg DOM (INRA, 1978), then to 145 g/kg FOM (Vérité et al., Reference Verité, Rulquin, Pisulewski and Guinard-Flament1987). Other FUS adopted quite similar assumptions: 130 g/kg TDNcor in the NRC (2001), 150 g/kg FOM in the Dutch DVE/OEB (Tamminga et al., Reference Tamminga, Vanstraalen, Subnel, Meijer, Steg, Wever and Blok1994). All these estimates represent an average value which, apart from the FOM, ignores the effects of other factors known to affect the efficiency of microbial growth. Some of them have been incorporated in recent proposals. In NorFor, based on a previous meta-analysis by Archimède et al. (Reference Archimède, Sauvant and Schmidely1997), the fermented substrates (starch, NDF, proteins and other carbohydrates) are assumed to have a differential efficiency of transformation into MicCP. In FiM (Thomas, Reference Thomas2004) it was assumed that the efficiency of substrate use for microbial growth was driven by the pattern of rumen fermentation and it was different for small particles, particles of concentrate and of forage. In DVE/OEB₂₀₁₁, the system is much more detailed, the calculation involves 21 different substrates differing according to the nature of the constituents (proteins, starch, soluble sugars, NDF), the nature of the feedstuff (forage v. concentrate) and the types of fractions (soluble v. degradable v. non-degradable). For each of these fractions, the fractional passage rates and efficiency of transformation in MicCP are considered to be different (Van Duinkerken et al., Reference Van Duinkerken, Blok, Bannink, Cone, Dijkstra, Van Vuuren and Tamminga2011). A major limitation of these approaches, a priori more mechanistic than previous proposals, is their degree of complexity given that an increased accuracy in predicting MicCP in this way has not yet been demonstrated. In the present study, we did not consider the yield of ATP transferred from FOM into microbial mass (YATP concept), even though this has been integrated in recent systems (Thomas, Reference Thomas2004; Van Duinkerken et al., Reference Van Duinkerken, Blok, Bannink, Cone, Dijkstra, Van Vuuren and Tamminga2011). The reason for our choice is that taking ATP into account leads to a substantially more complicated system based on parameters which are often not accurately known (i.e. maintenance ATP requirement of microbes), and thus do not guarantee an improved accuracy at the level of applications. In the Systali project, we have tried to build a ‘top-down’ prediction that is less analytical but integrates key factors that have been experimentally demonstrated, and leads to a more accurate prediction.

Factors causing variation in the production of microbial protein

In the Systali project, we assumed that OMtDR, which represents the energy available for microorganisms, is the main factor responsible for microbial growth. To quantify this effect, data from digestion trials reporting both OMtDR (543±110, min=253, max=880 g/kg DM) and MicCP (83.8±26.0, min=17.1, max=174.3 g/kg DM) measurements were extracted from the BoviDig database. The within-experiment regression was then calculated:

(37) $$\eqalignno{&#x0026;{\rm MicCP\,{=}\,45}{\rm .2{\plus}73}{\rm .31{\times}10}^{{{\rm {\minus}3}}} {\rm OMtDR}\;\;\; \cr &#x0026;\quad \left ( {n\,{=}\,{\rm 7}0{\rm 7},\,n\,{\rm exp}\,{=}\,{\rm 27}0,\,{\rm RSD}\,{=}\,{\rm 7}.{\rm 6}} \right)$$

This relationship (Figure 6), exhibits a positive intercept that differs from 0, and a slope that is half that used in the previous PDI or DVE/OEB systems. This shows that in these systems, the hypothesis of a constant efficiency of the transformation of FOM to MicCP leads to underestimation of microbial synthesis with low levels of FOM, and vice versa at high levels of FOM. This effect could be the outcome of more efficient recycling or better conditions of pH in the rumen of animals receiving diets with low OMtDR.

Figure 6

Intra-experiment relationship between microbial CP production and the fermented OM in the rumen.

We investigated whether components of the OMtDR could influence the relationship between OMtDR and MicCP, as has been proposed in the newly revised DVE/OEB₂₀₁₁(Van Duinkerken et al., Reference Van Duinkerken, Blok, Bannink, Cone, Dijkstra, Van Vuuren and Tamminga2011) and in NorFor (Volden, Reference Volden2011). To do this, in a first step the measured OMtDR was separated into three fractions: (i) the fermentable CP (FCP=NMCPduo−EndoCP), which is the smallest and the less variable fraction (200±60 g/kg DM); (ii) the NDF digestible in the rumen (NDFDru=NDF–NDFduo, 350±200 g/kg DM); (iii) and the residual OMtDR (resOMtDR=OMtDR–FCP–NDFDru), which is the largest fraction (450±220 g/kg DM) and mainly accounts for easily fermentable carbohydrates in the rumen. Both resOMtDR and NDFDru are closely and negatively correlated (inter- as well as within-experiment). This illustrates the substitution of these two major fractions across the wide variety of diets that precludes an easy statistical separation into their respective effects on microbial synthesis. However, using a within-experiment multiple regression approach including these three fractions, MicCP appeared to be mainly related to resOMtDR, and at a lesser extent to FCP, but not to NDFDru. These data confirm the influence of the nature of the fermented substrate to sustain microbial growth (Archimède et al., Reference Archimède, Sauvant and Schmidely1997). In particular, it confirms the lower efficiency of proteins compared to carbohydrates for sustaining microbial growth, a factor already included in the FiM system (Thomas, Reference Thomas2004). This underlines the dominant role of easily fermentable carbohydrates, and the very limited role of fermented NDF, to support microbial growth. In contrast, if NDFDru is replaced by NDFduo, the role of cell wall constituents to carry attached microbes out of the rumen can be clearly shown:

(38) $$\eqalignno{ {\rm MicCP\,{=}\,} &#x0026; {\rm 38}{\rm .7{\plus}0}{\rm .23\,FCP{\plus}55}{\rm .3{\times}10}^{{-{\rm 3}}} {\rm resOMtDR} \cr &#x0026; {\rm {\plus}42}{\rm .7{\times}10}^{{-{\rm 3}}} {\rm\,NDFduo}\;\,\cr &#x0026;\left( {n{\rm \,{=}\,446,}\,n\,{\rm exp\,{=}\,174,}\,{\rm RSD\,{=}\,6}{\rm .5}} \right) $$

This relationship, based on three few related criteria, reflects the respective roles of the dietary components that support microbial growth (FCP and resOMtDR) and those that allow outflow of rumen microbes from the rumen to the duodenum (NDFduo).

The positive effect of passage rate of digesta on the efficiency of microbial growth in the rumen (the ‘chemostat’ effect) has been clearly shown in vitro (Hespell, Reference Hespell1979; Demeyer and Van Nevel, Reference Demeyer and Van Nevel1986). To quantify this effect in vivo, data from digestion trials reporting both digesta passage rate, and microbial synthesis in the rumen, were extracted from the Bovidig database. A significant effect of kpt on MicCP was shown through a curvilinear overall regression fitted by a Michaelis type model.

(39) $$\eqalignno{&#x0026;{\rm MicCP\,{=}\,152}{\rm .5/}\left( {{\rm 1{\plus}}\left( {{\rm 3}{\rm .0/kpt}} \right)} \right)\cr &#x0026;\quad \left( {n\,{=}\,{\rm 234},\,{\rm RSD}\,{=}\,{\rm 28}.{\rm 7}} \right)$$

This relationship is very close to the one reported in vitro (Demeyer and Van Nevel, Reference Demeyer and Van Nevel1986), and suggests a theoretical maximal production of MicCP of 152.5 g/kg DMI. When data are corrected from the experiment effect, the RSD decreases substantially (RSD=1.1).

The proposal for the new INRA FUS

Several prediction equations, all based on FOM as the main driving force of microbial growth, but integrating the various other factors described above have been developed using within-experiment regressions on data from the Bovidig database. Three of these equations were considered to be satisfactory to predict MicCP, based on the fact that they included independent predictors, and that they presented a low RSD<7. These equations are: equation (38), based on the positive effects of fermented CP, residual FOM and duodenal NDF; the following equation (40) based on the positive effects of FOM, fermented CP and particulate passage rate; the following equation (41) based on the positive effects of FOM and proportion of concentrate, and on the negative relationship with the rumen protein balance, as discussed previously.

(40) $$\eqalignno{ {\rm MicCP\,{=}\,} &#x0026; -{\rm 0}{\rm .85{\plus}63}{\rm .1{\times}10}^{{-{\rm 3}}} {\rm OMtDR{\plus}0}{\rm .22}\,{\rm FCP}\cr\quad{{\plus}11}{\rm .44}\,{\rm kpt} {\rm \,-\,0}{\rm .88}\,{\rm kpt}^{{\rm 2}} \cr \quad \left( {n\,{=}\,{\rm 2}0{\rm 3},\,n\,{\rm exp}\,{=}\,{\rm 83},\,{\rm RSD}\,{=}\,{\rm 6}.{\rm 8}} \right) $$

(41) $$\eqalignno{ {\rm MicCP\,{=}\,} &#x0026; {\rm 40}{\rm .7}-{\rm 0}{\rm .114}\,{\rm RPB{\plus}75}{\rm .6}{\times}{\rm 10}^{{-{\rm 3}}} {\rm OMtDR} {\rm {\plus}8}{\rm .07}\,{\rm PCO}\cr &#x0026;\quad \left( {n\,{=}\,{\rm 637},\,n\,{\rm exp}\,{=}\,{\rm 245},\,{\rm RSD}\,{=}\,{\rm 6}.{\rm 7}} \right) $$

These three within-experiment equations ((38), (40), (41)) presented a similar RSD (on average 6.7), lower than that of equation (37) based on FOM alone (7.6). These four equations were then compared in their ability to predict MicCP, using a global regression approach (observed MicCP=a+b predicted MicCP) with all data of the Bovidig database. Only equation (41) led to a regression slope non-significantly different from one (Y=X), with the intercept a=4 (not different from 0) and the slope b=0.95. The predicted changes in MicCP related to the plausible range of variation in the three explanatory variables are: 40, 15 and 5 g MicCP/kg DM for OMtDR, RPB and PCO, respectively, confirming the major role of OMtDR in promoting microbial growth.

In the Systali project, the equation of prediction of microbial CP is thus based on equation (41’):

(41’) $$\hskip-6pt\scale91%{{\rm MicCP\,{=}\,40}{\rm .7}\,-\,{\rm 0}{\rm .114}\,{\rm RPB}\:{\rm \cr &#x0026; {\plus}}\:{\rm 75}{\rm .6} {\times}{\rm 10}^{{-{\rm 3}}} {\rm FOM}\,{\rm {\plus}}\,{\rm 8}{\rm .07}\,{\rm PCO}}$$

with RPB and FOM calculated as indicated in equation (12’’) and (26’), respectively. A negative relationship between MicCP and RPB had already been identified in the protein chapter of NRC (2001). For the feed values in the tables, MicCP is considered to depend only on FOM, with RPB and PCO fixed to 0. With urea supplemented diets, the increase in MicCP appears to occur only through the increase in FOM (via ΔOMd_RPB), with no additional, specific, negative effect of urea-induced RPB (Chapoutot et al., Reference Chapoutot, Nozière and Sauvant2013b). The external evaluation of equation (41) from OviDig (43 exp, 123 trt) shows an unbiased prediction of actually measured MicCP (Nozière et al., Reference Nozière, Giger-Reverdin, Chapoutot and Sauvant2013).

Proteins in the small intestine

The principles of calculation of the PDI have been maintained, with a true digestibility (dr) fixed to 80% for microbial proteins and variable among feedstuffs for RUP. With this value, the mean dietary MP from microbial origin (PDIME, g/kg DM) for more than 1000 diets calculated for dairy cows remains the same (47.0 in the present study v. 48.2 for the previous version). However, the slope between the two data sets is different from 1, as a consequence of the slope presented in Figure 6. The dr of feed by-pass protein (RUP) is based on the results of measurements obtained with mobile nylon bags in the intestines. However, when no in situ data is available, dr can be predicted, from the flow of non-digestible dietary CP in the small intestine (NDCPSI):

(42) $${\rm dr\,{=}\,}\left( {{\rm RUP}-{\rm NDCPSI}} \right){\rm /RUP}\,{\rm {\times}}\,{\rm 100}$$

This principle of calculation was developed in the previous versions of the PDI system (INRA, 1978; Vérité et al., Reference Verité, Rulquin, Pisulewski and Guinard-Flament1987), were NDCPSI was estimated from DOM and non-digestible OM, although these criteria were correlated. The prediction of NDCPSI has been updated with the Bovidig database, using a much larger set of measurements of duodenal flows, to better describe the intestinal digestive phenomena. Several predictors of non-digestible protein (NDCP) were tested using a multiple regression approach. A combination of RUP and MicCP appeared satisfactory to predict NDCP (52.6±12.6, min=5.2, max=107.4 g/kg DM), that is to account for the respective contribution of dietary and microbial fractions to fecal CP.

(43) $${\rm NDCP\,{=}\,2}{\rm .95{\plus}0}{\rm .196}\,{\rm RUP{\plus}0}{\rm .109}\,{\rm MicCP}\quad \left( {n\,{=}\,{\rm 588},\,{\rm RSD}\,{=}\,0.{\rm 9}0} \right)$$

The coefficients remained stable and the prediction was improved by adding non digestible NDF (NDNDF=174.3±56.2, min=56.2, max=468.9 g/kg DM), to account for the contribution of the endogenous fraction.

(44) $$\eqalignno{ {\rm NDCP\,{=}\,} &#x0026; {\rm 2}{\rm .69{\plus}0}{\rm .193}\,{\rm RUP{\plus}0}{\rm .106}\,{\rm MicCP} \cr &#x0026; {\rm {\plus}0}{\rm .022}\,{\rm NDNDF}\quad \left( {n{\rm \,{=}\,484, RSD\,{=}\,0}{\rm .83}} \right) $$

In the Systali project, the prediction of NDCPSI is based on equation (45), directly derived from equation (44):

(45) $${\rm NDCPSI\,{=}\,NDCP-2}{\rm .69-0}{\rm .106}\,{\rm MicCP}\atop {-0}{\rm .022}\,{\rm NDNDF}$$

Other FU systems have suggested predicting the NDCP of the feed from the content of ADIN, or the nitrogen fraction entrapped in ADF (CNCPS, FiM). Even if in some specific situations ADIN presents interest within a specific category of feed which could be over-heated (dried grains, etc.), there appeared to be no satisfactory relationship across feeds between NDCP and feed ADIN.

Starch and fatty acids in the small intestine

The fraction of these components digested in the small intestine mainly depends on their respective duodenal flows. Data from digestion trials reporting duodenal and ileal flows of starch, or FA, were extracted from the Bovidig database. For starch digested in the small intestine (StDsi=54.7± 47.2, min=0.0, max=236.4 g/kg DM), these confirmed the within-experiment regressions calculated by Offner and Sauvant (Reference Offner and Sauvant2004a) for starch (equation (46)).

(46) $$\eqalignno{&#x0026;{\rm StDsi\,{=}\,74}{\rm .05-0}{\rm .122}\,{\rm RUSt}\cr &#x0026;\quad\left( {n\,{=}\,{\rm 51},\,n\,{\rm exp}\,{=}\,{\rm 18},\,{\rm RSD}\,{=}\,{\rm 1}0.{\rm 8}} \right)$$

This equation permits calculation of the glucose that is available in the lumen of small intestine. The RUSt was defined above in equation (10’). This equation (46) has been evaluated using external data of glucose portal appearance measurements (Loncke et al., Reference Loncke, Ortigues-Marty, Vernet, Lapierre, Sauvant and Nozière2009). For fatty acids digestible in small intestine (FADsi=33.7±11.7, min=13.9, max=61.3 g/kg DM) it is suggested to follow the proposal of Schmidely et al. (Reference Schmidely, Glasser, Doreau and Sauvant2008) issued from a meta-analysis of the literature (equation (47)):

(47) $$\eqalignno{&#x0026;{\rm FADsi\,{=}\,0}{\rm .83}\,{\rm FAduo-0}{\rm .0011}\,{\rm FAduo}^{{\rm 2}} \cr &#x0026;\quad \left( {n\,{=}\,{\rm 61},\,n\,{\rm exp}\,{=}\,{\rm 16},\,{\rm RSD}\,{=}\,\,{\rm 2}.{\rm 8}0} \right)$$

In this equation, FAduo is calculated as defined in equation (33). By a similar meta-analytic approach, predictions of the profile of the duodenal and absorbed flows of the major LCFA, including isomers of C18, have been proposed (Glasser et al., Reference Glasser, Schmidely, Sauvant and Doreau2008; Schmidely et al., Reference Schmidely, Glasser, Doreau and Sauvant2008).

Digestion in the large intestine

There is usually a loss of N between the ileum and feces, which averages 10 g CP/kg DM in the Bovidig database. It primarily depends on the amount of CP entering the large intestine, and represents on average 50% of the ileal flow. This apparent absorption of N is not accounted for the calculation of PDI since it occurs mainly as ammonia N, which will join, after processing by the liver, the body urea pool to be ejected in the urine or recycled.

The fraction of OM apparently disappearing in the large intestine is quite low (on average of the 112 measurements in BoviDig, 65.1±33.6 g/kg DMI) and represents ~10% of the DOM throughout the digestive tract. This fraction should be taken into account for further prediction of the VFA and gas produced in the distal part of the digestive tract.

Energy losses in methane

Losses of energy through enteric CH4 are largely determined by the amount of digested OM, and both CH4 and DOM have been widely and precisely measured using calorimetric chambers. Moreover, CH4 emission is also affected by digestive interactions due to FL and PCO (Sauvant and Giger-Reverdin, Reference Sauvant, Assoumaya, Giger-Reverdin and Archimède2009). Consequently, the ratio CH4/DOM (34.0±9.1, min=10.9, max=72.6 g CH4/kg DOM) was used as the relevant basis for expressing losses in CH4. The effects of FL and PCO on CH4/DOM have been quantified from results of calorimetric measurements gathered in the Rumener database. The following within-experiment regression, already reported by Sauvant et al. (Reference Sauvant, Schmidely, Daudin and St-Pierre2011) was calculated:

(48) $$\eqalignno{ &#x0026; {\rm CH4} {\rm \,/\,DOM\,{=}\,45}{\rm .42}-{\rm 6}{\rm .66}\,{\rm FL{\plus}0}{\rm .75}\,{\rm FL}^{{\rm 2}} {\rm {\plus}19}{\rm .65}\,{\rm PCO} \cr &#x0026; \quad\quad\quad\quad\quad-{\rm 35}{\rm .0}\,{\rm PCO}^{{\rm 2}} -{\rm 2}{\rm .69}\,{\rm FL{\times}PCO} \cr \quad\quad\quad\quad\quad (n\,{=}\,450,\,n\exp \,{=}\,158,\,{\rm RSD}\,{=}\,2.3) $$

This equation shows that methane emission (per unit DOM) is lower for high concentrate diets ingested at a high level. The interaction between FL and PCO is illustrated in Figure 7a. These results show that diets having high levels of DMI and PCO, which have more digestive interactions at the level of OMd (or Ed), induce less loss of energy as CH4. This constitutes a relative compensation.

Figure 7

CH4 and urinary energy losses: (a) curves of iso-production response of CH4 (g/kg DOM) in function of the combined influences of feeding level and proportion of concentrate in the diet; (b) intra-experiment relationship between dietary CP and urinary energy expressed in percentage of the gross energy.

Energy losses in urine

Losses of energy in urines are largely determined by the urinary N and thus depend on dietary N level, which is most precisely expressed by rumen protein balance, as discussed previously. However, given that RPB is never measured in calorimetric chambers, CP was chosen as a relevant base against which to predict losses of energy through urine. Data from experiments using CP content as an experimental factor were extracted from the Rumener database. The within-experiment regression between dietary CP content and urinary energy expressed in % of gross energy (UE=4.0±1.4, min=0.7, max=10.3%GE) was calculated, and significant effects of FL and PCO on residuals were found, leading to the following within-experiment equation, illustrated by the Figure 7b for mean values of FL and PCO:

(49) $$\eqalignno{ {\rm UE\,\&#x0025;\,GE\,{=}\,} &#x0026; {\rm 2}{\rm .9{\plus}0}{\rm .017}\,{\rm CP-0}{\rm .47}\,{\rm FL} {\rm -1}{\rm .64}\,{\rm PCO}\cr &#x0026;\!\!\!\!\!\!\!\!\! \left( {n\,{=}\,{\rm 337},\,n\,{\rm exp}\,{=}\,{\rm 1}0{\rm 9},\,{\rm RSD}\,{=}\,0.{\rm 56}} \right) $$

Thus, as for CH4, there is a relative compensation at urinary level due to the digestive interactions impacting OMd values. Compared with the previous approach based on the prediction of the ratio ME/DE from dietary CP, crude fibre and the level of production (Vermorel et al., Reference Vermorel, Coulon and Journet1987) the present one results in a lesser loss of energy as CH4 and urine with increasing intake [ECH4+EU=2.00±0.50 MJ/kg DM, n=1178, Rumener database] for DE values greater than approximately 1.67 MJ/kg DM. Interestingly, this compensatory effect has previously been used in the derivation of Effective Energy units, for which the energy value was estimated to be independent of FL (Emmans,Reference Emmans1994).

Ultimately, on a set of more than 1000 treatments on dairy cows, the dietary ME content decreases by 0.61±0.27 MJ/kg DM for the ME calculated with the presented equations in comparison with the previous INRA system (mean decrease of 5.8%). This difference is mainly the outcome of the digestive interactions that were not taken into consideration so far in the calculation of dietary ME.