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On solving an isotope dilution model for the partition of phenylalanine and tyrosine uptake by the liver of lactating dairy cows

Published online by Cambridge University Press:  08 August 2022

L. A. Crompton
Affiliation:
Department of Animal Sciences, School of Agriculture, Policy and Development, University of Reading, Whiteknights, Reading RG6 6EU, UK
L. L. McKnight
Affiliation:
Centre for Nutrition Modelling, Department of Animal Biosciences, University of Guelph, Guelph, Ontario N1G 2W1, Canada Trouw Nutrition AgResearch Canada, 150 Research Lane, Guelph, ON N1G 4T2, Canada
C. K. Reynolds
Affiliation:
Department of Animal Sciences, School of Agriculture, Policy and Development, University of Reading, Whiteknights, Reading RG6 6EU, UK
J. L. Ellis
Affiliation:
Centre for Nutrition Modelling, Department of Animal Biosciences, University of Guelph, Guelph, Ontario N1G 2W1, Canada
J. Dijkstra
Affiliation:
Animal Nutrition Group, Wageningen University & Research, 6700 AH Wageningen, The Netherlands
J. France*
Affiliation:
Centre for Nutrition Modelling, Department of Animal Biosciences, University of Guelph, Guelph, Ontario N1G 2W1, Canada
*
Author for correspondence: J. France, E-mail: [email protected]
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Abstract

An isotope dilution model for partitioning phenylalanine and tyrosine uptake by the liver of the lactating dairy cow is constructed and solved in the steady state. An original ten-pool model is adopted and solved by cleaving it into two five-pool sub-models, one representing phenylalanine and the other tyrosine. If assumptions are made, model solution permits calculation of the rate of phenylalanine and tyrosine uptake from portal vein and hepatic arterial blood supply, hydroxylation, and synthesis and degradation of constitutive protein. The model requires the measurement of plasma flow rate through the liver in combination with amino acid concentrations and plateau isotopic enrichments in arterial and portal and hepatic vein plasma during a constant infusion of [1-13C]phenylalanine and [2,3,5,6-2H]tyrosine tracers. It also requires estimates of the rate of oxidation and protein export secretion. Analysis of measurement errors in experimental enrichments and infusion rates on model solutions indicated that accurate values of the intracellular and extracellular enrichments are central to minimising errors in the calculated flows. Solving the model by cleaving into two five-pool schemes rather than solving the ten-pool scheme directly is preferred as there appears to be less compounding of errors and the results consistently appear to be more biologically feasible. The model provides a means for assessing the impact of hepatic metabolism on amino acid availability to peripheral tissues such as the mammary gland.

Type
Modelling Animal Systems Research Paper
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution and reproduction, provided the original article is properly cited.
Copyright
Copyright © The Author(s), 2022. Published by Cambridge University Press

Introduction

The overall efficiency of milk protein production relative to dietary nitrogen (N) intake in dairy cows is typically low compared to simple stomach animals at approximately 25–35% (Dijkstra et al., Reference Dijkstra, Reynolds, Kebreab, Ellis, France and van Vuuren2013). Not only is there an economic cost to the producer associated with this inefficiency, N losses from livestock production contribute significantly to greenhouse gas emissions and water course and air pollution (Dijkstra et al., Reference Dijkstra, Bannink, Bosma, Lantinga and Reijs2018; Uwizeye et al., Reference Uwizeye, de Boer, Opio, Schulte, Falcucci, Tempio, Teillard, Casu, Rulli, Galloway, Leip, Erisman, Robinson, Henning Steinfeld and Gerber2020). Milk protein synthesis is sensitive to essential amino acid supply, in particular to group 1 essential amino acids where mammary gland rate of uptake matches output in milk protein, whereas group 2 amino acids have greater flexibility in use for different purposes by the gland (Nichols et al., Reference Nichols, Bannink and Dijkstra2019). Among the group 1 essential amino acids, milk protein synthesis is sensitive to particularly phenylalanine (PHE) when dietary supply is low (Rulquin and Pisulewski, Reference Rulquin and Pisulewski2000) or as shown by studies where PHE-deficient infusion mixtures were administered (Doepel et al., Reference Doepel, Hewage and Lapierre2016). In the post-absorptive state, the liver is the major site of PHE metabolism and catabolism and as such net removal from portal vein and hepatic arterial blood typically accounts for substantial proportions of the net absorption of PHE by the portal-drained viscera (Reynolds, Reference Reynolds2002, Reference Reynolds, Sejrsen, Hvelplund and Nielsen2006). The liver balances supply from absorption and demand from peripheral tissues.

Several in vivo studies have examined the net flow of PHE across the liver of dairy cows using arterio-venous difference techniques (Hristov et al., Reference Hristov, Bannink, Crompton, Huhtanen, Kreuzer, McGee, Nozière, Reynolds, Bayat, Yáñez-Ruiz, Dijkstra, Kebreab, Schwarm, Shingfield and Yu2019) and reported a negative measurement (e.g. Raggio et al., Reference Raggio, Lobley, Berthiaume, Pellerin, Allard, Dubreuil and Lapierre2007; Cantalapiedra-Hijar et al., Reference Cantalapiedra-Hijar, Lemosquet, Rodriguez-Lopez, Messad and Ortigues-Marty2014; Larsen et al., Reference Larsen, Galindo, Ouellet, Maxin, Kristensen and Lapierre2015), suggesting the liver is a major site of PHE utilization. In general, PHE has two metabolic fates, incorporation into protein or conversion to tyrosine (TYR) via PHE hydroxylase (oxidation). PHE catabolism, as a result, follows the pathway of TYR catabolism. Therefore, the simultaneous infusion of PHE and TYR stable isotope tracers is preferred when examining PHE metabolism experimentally, and mathematical models are needed to resolve the kinetic data generated by such isotope infusion studies.

In a previous publication (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018), we presented a ten-pool compartmental model describing PHE and TYR metabolism in the liver of lactating dairy cows. The model describes the partitioning of PHE and TYR between constitutive and export protein synthesis and other metabolic fates such as hydroxylation of PHE to TYR. It was solved in the steady state as a single integrated model, i.e. as one set of simultaneous algebraic equations. Initial solutions to the model for each cow were found to be infeasible, i.e. some flows had negative values and were therefore non-physiological. Therefore, error bands of ±25% were placed around the values of any prescribed intracellular enrichments and any measured extracellular enrichments close to minimum detection levels, and the solution space mapped out by these bands was searched to find the best feasible solution for each cow. This best feasible solution was obtained using a sum of squares minimization procedure (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). The present study is a progression of this work and our previous model of leucine metabolism in the bovine liver (France et al., Reference France, Hanigan, Reynolds, Dijkstra, Crompton, Maas, Bequette, Metcalf, Lobley, MacRae and Beever1999). The objective herein was to investigate an alternative approach to solving the ten-pool PHE-TYR model. The approach involves cleaving the model at the PHE hydroxylation flow to create two five-pool sub-models (one for PHE and one for TYR), then solving the two sub-models sequentially (first PHE then TYR) and linking the two solutions algebraically to re-create an integrated model solution. A similar cleaving approach was recently applied successfully to an eight-pool model of the mammary gland for the same amino acids (Crompton et al., Reference Crompton, McKnight, Reynolds, Ellis, Dijkstra and France2022).

The model

Overall scheme

The scheme adopted is shown in Fig. 1. It contains four intracellular and six extracellular pools. The intracellular pools are free PHE (pool 6), PHE in export protein (pool 5), free TYR (pool 7) and TYR in export protein (pool 8), while the extracellular ones represent portal vein PHE and TYR (pools 1 and 3), hepatic artery PHE and TYR (pools 2 and 4) and hepatic vein PHE and TYR (pools 9 and X, where X represents the Roman numeral ten). The flows of PHE and TYR between pools and into and out of the system are shown as arrowed lines. The export protein-bound PHE pool has a single inflow: from free PHE, F 56, and two outflows: secretion of export protein, F 05, and degradation, F 65. The intracellular free PHE pool has four inflows: from the degradation of constitutive liver protein, F 60, from the extracellular portal vein pool, F 61, from the hepatic artery pool, F 62, and from degradation of export protein, F 65. The pool has four outflows: synthesis of constitutive liver protein, F 06, incorporation into export protein, F 56, hydroxylation to the intracellular free TYR pool, F 76, and outflow to the extracellular hepatic vein PHE pool, F 96. The intracellular free TYR pool has five inflows: from the degradation of constitutive liver protein, F 70, from the extracellular portal vein TYR pool, F 73, from the hepatic artery TYR pool, F 74, from the intracellular PHE pool, F 76, and from the degradation of export protein, F 78. The pool has four outflows: oxidation and TYR degradation products, $F_{07}^{( {\rm o} ) }$, synthesis of constitutive liver protein, $F_{07}^{( {\rm s} ) }$, incorporation into export protein, F 87, and outflow to the extracellular hepatic vein TYR pool, FX 7. The export protein-bound TYR pool has one inflow: from the intracellular free TYR pool, F 87, and two outflows: secretion of export protein, F 08, and degradation, F 78. The extracellular portal vein PHE pool has a single inflow: entry into the pool, F 10, and two outflows: uptake by the liver, F 61, and release into the extracellular hepatic vein PHE pool, F 91. The extracellular hepatic artery PHE pool has a single inflow: entry into the pool, F 20, and two outflows: uptake by the liver, F 62, and release into the extracellular hepatic vein PHE pool, F 92. The same description applies to the corresponding TYR pools, i.e. pools 3 and 4 with flows F 30, F 73, FX 3, F 40, F 74 and FX 4, respectively. The extracellular hepatic vein PHE pool has three inflows: bypass from the portal vein PHE pool, F 91, bypass from the hepatic artery PHE pool, F 92, and release from the intracellular PHE pool, F 96, and one outflow out of the system, F 09. The same description applies to the corresponding TYR pool with flows FX 3, FX 4, FX 7 and F 0X respectively.

Fig. 1. Scheme for the uptake and utilization of PHE and TYR by the liver of lactating dairy cows as described by Crompton et al. (Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). The small circles in Fig. 1 indicate flows out of the system which need to be measured experimentally.

As noted above, this scheme can be solved as a ten-pool model (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). Alternatively, it can also be solved by decomposing it into two five-pool schemes (i.e. a PHE sub-model and a TYR sub-model), then linking the two schemes. The PHE and TYR sub-models are both similar structurally to the model of LEU kinetics presented by France et al. (Reference France, Hanigan, Reynolds, Dijkstra, Crompton, Maas, Bequette, Metcalf, Lobley, MacRae and Beever1999). In the present study, labelled [1-13C]PHE and [2,3,5,6-2H]TYR were infused into the jugular vein at a constant rate, and enrichment in several pools were measured.

PHE sub-model

The schemes adopted for the movement of total and labelled PHE in the PHE sub-model are shown in Figs 2(a) and (b) respectively. The fundamental equations are (mathematical notation is defined in Table 1):

(1)$$\displaystyle{{{\rm d}Q_1} \over {{\rm d}t}} = F_{10}-F_{61}-F_{91}$$
(2)$$\displaystyle{{{\rm d}Q_2} \over {{\rm d}t}} = F_{20}-F_{62}-F_{92}$$
(3)$$\displaystyle{{{\rm d}Q_5} \over {{\rm d}t}} = F_{56}-F_{05}-F_{65}$$
(4)$$\displaystyle{{{\rm d}Q_6} \over {{\rm d}t}} = F_{60} + F_{61} + F_{62} + F_{65}-F_{06}-F_{56}-F_{76}-F_{96}$$
(5)$$\displaystyle{{{\rm d}Q_9} \over {{\rm d}t}} = F_{91} + F_{92} + F_{96}-F_{09}$$

and for [1-13C] PHE:

(6)$$\displaystyle{{{\rm d}q_1} \over {{\rm d}t}} = I_1-e_1( {F_{61} + F_{91}} ) $$
(7)$$\displaystyle{{{\rm d}q_2} \over {{\rm d}t}} = I_2-e_2( {F_{62} + F_{92}} ) $$
(8)$$\displaystyle{{{\rm d}q_5} \over {{\rm d}t}} = e_6F_{56}-e_5( {F_{05} + F_{65}} ) $$
(9)$$\displaystyle{{{\rm d}q_6} \over {{\rm d}t}} = e_1F_{61} + e_2F_{62} + e_5F_{65}-e_6( {F_{06} + F_{56} + F_{76} + F_{96}} ) $$
(10)$$\displaystyle{{{\rm d}q_9} \over {{\rm d}t}} = e_1F_{91} + e_2F_{92} + e_6F_{96}-e_9F_{09}$$

Fig. 2. Scheme for the uptake and utilization of PHE by the liver of lactating dairy cows: (a) total PHE, (b) [13C] labelled PHE. The small circles in Fig. 2(a) indicate flows out of the system which need to be measured experimentally.

Table 1. Principle symbols used for the kinetic model

a Total material (i.e. tracee + tracer).

When the system is in steady state with respect to both total and labelled PHE, the derivative terms in these ten differential equations are zero. For the scheme assumed, the enrichment of the intracellular protein-bound pool equalizes with that of the free pool as steady state is approached (i.e. e 5 = e 6). After equating intracellular enrichments and eliminating redundant equations, the five differential equations for labelled PHE, Eqns (6)–(10), yield the following four identities:

(11)$$I_1-e_1( {F_{61} + F_{91}} ) = 0$$
(12)$$I_2-e_2( {F_{62} + F_{92}} ) = 0$$
(13)$$e_1F_{61} + e_2F_{62}-e_6( {F_{06} + F_{56} + F_{76} + F_{96}-F_{65}} ) = 0$$
(14)$$e_1F_{91} + e_2F_{92} + e_6F_{96}-e_9F_{09} = 0$$

To obtain steady-state solutions to the sub-model, it is assumed that PHE secreted in export protein and its removal from the hepatic vein pool (i.e. F 05 and F 09, respectively) can be measured experimentally. Further, it is mathematically convenient (and physiologically acceptable) to assume that percentage PHE extraction by the liver is the same from the portal vein and hepatic artery supplies, giving:

(15)$$\displaystyle{{F_{91}} \over {F_{92}}}\left({ = \displaystyle{{F_{61}} \over {F_{62}}}} \right) = \displaystyle{{F_{10}} \over {F_{20}}}$$

Algebraic manipulation of Eqns (1)–(5) with the derivatives set to zero, together with Eqns (11)–(15), gives:

(16)$$F_{10} = I_1/e_1$$
(17)$$F_{20} = I_2/e_2$$
(18)$$\overline {F_{56}-F_{65}} = \tilde{F}_{05}$$
(19)$$F_{91} = \displaystyle{{( {e_9-e_6} ) {\tilde{F}}_{09}} \over {( {e_1-e_6} ) + ( {e_2-e_6} ) \displaystyle{{F_{20}} \over {F_{10}}}}}$$
(20)$$F_{92} = \displaystyle{{F_{20}} \over {F_{10}}}F_{91}$$
(21)$$F_{96} = \tilde{F}_{09}-F_{91}-F_{92}$$
(22)$$F_{61} = F_{10}-F_{91}$$
(23)$$F_{62} = F_{20}-F_{92}$$
(24)$$\overline {F_{06} + F_{76}} = \displaystyle{{e_1} \over {e_6}}F_{61} + \displaystyle{{e_2} \over {e_6}}F_{62}-\overline {F_{56}-F_{65}} -F_{96}$$
(25)$$F_{60} = \overline {F_{06} + F_{76}} + \overline {F_{56}-F_{65}} + F_{96}-F_{61}-F_{62}$$

where for these equations the italics denote steady-state values of flows and enrichments, the tilde identifies a measured flow, and the over-lining indicates coupled flows (which cannot be separately estimated within the model). The coupled flow $\overline {F_{06} + F_{76}}$ is separated when the sub-models are linked back together.

TYR sub-model

The schemes adopted for the movement of total and labelled TYR in the TYR sub-model are shown in Figs 3(a) and (b) respectively. The fundamental equations are:

(26)$$\displaystyle{{{\rm d}Q_3} \over {{\rm d}t}} = F_{30}-F_{73}-F_{X3}$$
(27)$$\displaystyle{{{\rm d}Q_4} \over {{\rm d}t}} = F_{40}-F_{74}-F_{X4}$$
(28)$$\displaystyle{{{\rm d}Q_7} \over {{\rm d}t}} = F_{70} + F_{73} + F_{74} + F_{76} + F_{78}-F_{07}^{( {\rm o} ) } -F_{07}^{( {\rm s} ) } -F_{87}-F_{X7}$$
(29)$$ \hskip-11.5pc \displaystyle{{{\rm d}Q_8} \over {{\rm d}t}} = F_{87}-F_{08}-F_{78}$$
(30)$$ \hskip-8.8pc \displaystyle{{{\rm d}Q_X} \over {{\rm d}t}} = F_{X3} + F_{X4} + F_{X7}-F_{0X}$$

and for [2,3,5,6-2H]TYR:

(31)$$\displaystyle{{{\rm d}\phi _3} \over {{\rm d}t}} = {\rm \Phi }_3-\varepsilon _3( {F_{73} + F_{X3}} ) $$
(32)$$\displaystyle{{{\rm d}\phi _4} \over {{\rm d}t}} = {\rm \Phi }_4-\varepsilon _4( {F_{74} + F_{X4}} ) $$
(33)$$\displaystyle{{{\rm d}\phi _7} \over {{\rm d}t}} = \varepsilon _3F_{73} + \varepsilon _4F_{74} + \varepsilon _8F_{78}-\varepsilon _7( {F_{07}^{( {\rm o} ) } + F_{07}^{( {\rm s} ) } + F_{87} + F_{X7}} ) $$
(34)$$\displaystyle{{{\rm d}\phi _8} \over {{\rm d}t}} = \varepsilon _7F_{87}-\varepsilon _8( {F_{08} + F_{78}} ) $$
(35)$$\displaystyle{{{\rm d}\phi _X} \over {{\rm d}t}} = \varepsilon _ 3F_{X3} + \varepsilon _4F_{X4} + \varepsilon _7F_{X7}-\varepsilon _XF_{0X}$$

Fig. 3. Scheme for the uptake and utilization of TYR by the liver of lactating dairy cows: (a) total TYR, (b) [2H] labelled TYR. The small circles in Fig. 3(a) indicate flows out of the system which need to be measured experimentally.

When the system is in steady state with respect to both total and labelled TYR, the derivative terms in these ten differential equations are zero. For the scheme assumed, the enrichment of the intracellular protein-bound pool equalizes with that of the free pool as steady state is approached (i.e. ɛ 7 = ɛ 8). After equating intracellular enrichments and eliminating redundant equations, the five differential equations for labelled TYR, Eqns (31)–(35), yield the following four identities:

(36)$${\rm \Phi }_3-\varepsilon _3( {F_{73} + F_{X3}} ) = 0$$
(37)$${\rm \Phi }_4-\varepsilon _4( {F_{74} + F_{X4}} ) = 0$$
(38)$$\varepsilon _3F_{73} + \varepsilon _4F_{74}-\varepsilon _7( {F_{07}^{( o ) } + F_{07}^{( s ) } + F_{87} + F_{X7}-F_{78}} ) = 0$$
(39)$$\varepsilon _ 3F_{X3} + \varepsilon _4F_{X4} + \varepsilon _7F_{X7}-\varepsilon _XF_{0X} = 0$$

To obtain steady-state solutions to the sub-model, it is assumed that oxidation, TYR secreted in export protein and its removal from the hepatic vein pool (i.e. $F_{07}^{( {\rm o} ) }$, F 08 and F 0X, respectively) can be measured experimentally. Further, it is mathematically convenient to assume that percentage TYR extraction by the liver is the same from the portal vein and hepatic artery supplies, giving:

(40)$$\displaystyle{{F_{X3}} \over {F_{X4}}}\left({ = \displaystyle{{F_{73}} \over {F_{74}}}} \right) = \displaystyle{{F_{30}} \over {F_{40}}}$$

Algebraic manipulation of Eqns (26)–(30) with the derivatives set to zero, together with Eqns (36)–(40), gives:

(41)$$F_{30} = \Phi _3/\varepsilon _3$$
(42)$$F_{40} = \Phi _4/\varepsilon _4$$
(43)$$\overline {F_{87}-F_{78}} = \tilde{F}_{08}$$
(44)$$F_{X3} = \displaystyle{{( {\varepsilon_X-\varepsilon_7} ) {\tilde{F}}_{0X}} \over {( {\varepsilon_3-\varepsilon_7} ) + ( {\varepsilon_4-\varepsilon_7} ) \displaystyle{{F_{40}} \over {F_{30}}}}}$$
(45)$$F_{X4} = \displaystyle{{F_{40}} \over {F_{30}}}F_{X3}$$
(46)$$F_{X7} = \tilde{F}_{0X}-F_{X3}-F_{X4}$$
(47)$$F_{73} = F_{30}-F_{X3}$$
(48)$$F_{74} = F_{40}-F_{{\rm X}4}$$
(49)$$F_{07}^{( {\rm s}) } = \displaystyle{{\varepsilon _3} \over {\varepsilon _7}}F_{73} + \displaystyle{{\varepsilon _4} \over {\varepsilon _7}}F_{74}-\tilde{F}_{07}^{( {\rm o}) } -\overline {F_{87}-F_{78}} -F_{X7}$$
(50)$$\overline {F_{70} + F_{76}} = \tilde{F}_{07}^{( {\rm o}) } + F_{07}^{( {\rm s}) } + \overline {F_{87}-F_{78}} + F_{X7}-F_{73}-F_{74}$$

where for these equations the italics denote steady-state values of flows and enrichments, the tilde identifies a measured flow, and the over-lining indicates coupled flows (which cannot be separately estimated). The coupled flow $\overline {F_{70} + F_{76}}$ is separated when the sub-models are linked back together.

Linking the PHE and TYR sub-models

The two sub-models can be linked by considering constitutive liver protein. Assuming a fixed protein composition for constitutive liver tissue, then the ratios of TYR to PHE in protein synthesized and protein degraded (μmol TYR/μmol PHE) are equal:

(51)$$\displaystyle{{F_{70}} \over {F_{60}}} = \displaystyle{{F_{07}^{( {\rm s}) } } \over {F_{06}}}$$

This assumption allows Eqns (24) and (50) to be uncoupled. Differencing these coupled flows:

(52)$$\overline {F_{06} + F_{76}} -\overline {F_{70} + F_{76}} = F_{06}-F_{70} = b$$

Using Eqn (51) to substitute for F 70 in the above equation:

$$F_{06}-\displaystyle{{F_{60}F_{07}^{( {\rm s}) } } \over {F_{06}}} = b$$
$$[ {F_{06}} ] ^2-bF_{06}-F_{60}F_{07}^{( {\rm s}) } = 0$$

Solving this quadratic:

(53)$$F_{06} = \displaystyle{{b + \sqrt {b^2 + 4F_{60}F_{07}^{( {\rm s}) } } } \over 2}$$

Note that only positive roots of this quadratic are permissible, so any negative roots must be discarded. Therefore:

(54)$$F_{70} = F_{06}-b$$
(55)$$F_{76} = \overline {F_{06} + F_{76}} -F_{06}$$

The overall scheme can now be solved by computing Eqns (16)–(25), (41)–(50) and (52)–(55) sequentially.

Application

Application of the model is illustrated using data from experiments conducted at the University of Reading in the UK with multi-catheterized Holstein-Friesian dairy cows (Hanigan et al., Reference Hanigan, Crompton, Reynolds, Wray-Cahen, Lomax and France2004). In the study herein, animals were in mid-lactation (average live-weight 656 kg) fed total mixed ration (TMR) diets consisting of a 50:50 mixture on a dry matter (DM) basis of forage and concentrate with the forage comprised of grass silage and chopped dried Lucerne in a 25:75 ratio on a DM basis. Concentrates were formulated to provide crude protein levels of approximately 110 and 200 g/kg concentrate DM, such that average TMR crude protein concentration were 128 and 175 g/kg DM. Diets were fed hourly using automatic feeders to establish pseudo-steady state. The average daily DM intake and milk yield for the four animals were 21.8 kg/d and 30.5 litres/d, respectively. The cows were given constant abomasal infusions of water (18 litres/d) for 4 d, followed by a buffered mixture of essential amino acids for a further 6 d, administered at a daily rate equivalent to the essential amino acids in 800 g milk protein. On the last day of each water or essential amino acid infusion period, the animals received a primed, continuous jugular vein infusion of [1-13C]PHE (350 mg/h) and [2,3,5,6-2H]TYR (100 mg/h) in sterile saline at a constant rate for 8 h. Throughout the infusion, hourly sets of blood samples were taken simultaneously from catheters in the dorsal aorta and the portal and hepatic veins for the measurement of blood flow rate (by dye dilution) and nutrient metabolism by the portal drained viscera and liver. The steady-state values used for model inputs were the average of the final four blood samples taken 5–8 h after the infusion started.

The relevant experimental measurements are given in Table 2. They are reported for three animals during the amino acid infusion (1 low protein diet; 2 high protein) and one animal during the water infusion (high protein diet). They are based on plasma rather than whole blood values. PHE and TYR measurements are based on free rather than total (i.e. free plus bound) plasma PHE and TYR. The effective isotope infusion rates to the liver, I 1, I 2 and Φ3, Φ4, were obtained from portal vein and arterial concentration and enrichment of PHE and TYR and plasma flow rate in the portal vein and hepatic artery. The flows F 09 and F 0X were determined from hepatic vein PHE and TYR concentration and plasma flow rate in the hepatic vein. The intracellular enrichments e 6 and ԑ 7 and the flows F 05 and F 08 were not measured experimentally and had to be prescribed. Unpublished observations from our laboratories demonstrated an intracellular to extracellular enrichment ratio of 0.3 (n = 4; SD 0.07; range 0.19–0.38) for PHE and TYR. Therefore, the missing intracellular free PHE and TYR enrichments, e 6 and ԑ 7 were calculated as 0.3 times the corresponding arterial enrichments e 2 and ԑ 4 respectively. The export protein flows F 05 and F 08 were assigned values of 33.8 μmol/min and 25.0 μmol/min respectively based on Raggio et al. (Reference Raggio, Lobley, Berthiaume, Pellerin, Allard, Dubreuil and Lapierre2007) and the relative proportion of PHE and TYR in bovine serum albumin as a representative export protein (UniProt Consortium, 2017). The flow $F_{07}^{( {\rm o}) }$ was obtained from labelled CO2 elevation in plasma flow across the liver and hepatic vein PHE enrichment (Harris et al., Reference Harris, Skene, Buchan, Milne, Calder, Anderson, Connell and Lobley1992). Calculated flows are presented in Table 2.

Table 2. Experimental and other inputs

CP, crude protein.

a Essential amino acid infusion.

The solutions to the split model described herein are shown in Table 3. All initial calculated flows were biologically feasible, in contrast to when the model was solved as an integrated ten-pool scheme (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). Combining input data reported herein and those reported by Crompton et al. (Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018) enabled comparison of the solutions from the two five-pool schemes with corresponding solutions obtained using the integrated ten-pool model (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). The averaged flows from both models are shown in Table 4 and highlight some major differences in the values of the flows emanating from the intracellular pools, in particular flows F 06, F 60,$F_{07}^{( {\rm s} ) }$ and F 70 representing constitutive protein synthesis and degradation and flows F 96, FX 7, F 73, representing movement of PHE and TYR out of and into the intracellular pools. Therefore, to assess the differences in calculated flows between the combined model of Crompton et al. (Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018) and the split model described herein, a sensitivity analysis was undertaken to examine the effect of varying experimental enrichments and infusion rates on model solutions. Input data in Table 2 and inputs reported by Crompton et al. (Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018) were averaged to provide initial unperturbed values for e 1, e 2, e 6, e 9, ɛ 3, ɛ 4, ɛ 7, ɛx, I 1, I 2, Φ3, Φ4, F 05, $F_{07}^{( {\rm o} ) }$, F 08, F 09, F 0X. Inputs to the split model were perturbed sequentially by 0, ±10% and ±20%. The perturbed input (x, %), was plotted against each calculated flow (y, μmol/min) and a linear five-point regression of y on x performed to determine the slope of the line produced. The average slope was subsequently scaled by its corresponding unperturbed average flow value, giving the scaled slopes dimensions of % change in y per % change in x. Results of the sensitivity analysis are presented in Table 5. In general, errors in infusion rates and prescribed flows had less impact on the sensitivity of model solutions than errors in the measurement of isotopic enrichment and in assumed intracellular enrichment values. Measuring intracellular enrichment directly would require a sample of liver tissue at the end of the isotope infusion (e.g. Connell et al., Reference Connell, Calder, Anderson and Lobley1997).

Table 3. Phenylalanine and tyrosine uptake and partition by the liver for four lactating dairy cows obtained using the two five-pool models (symbols are defined in the text and Table 1)

Table 4. Phenylalanine and tyrosine uptake and partition by the liver of lactating dairy cows obtained using the two five-pool models (symbols are defined in the text and Table 1) and the corresponding solutions obtained using the ten-pool model of Crompton et al. (Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018)

Values are means across data sets (both those reported here and those reported by Crompton et al. (Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018)). Figures in parentheses are standard error of the mean.

Table 5. Average slope (%) for each of the flows calculated by the model obtained by perturbing each input in turna

a The slope for each flow is expressed relative to the value of the flow obtained when no perturbation is made. Only slopes which differ from zero are shown

b Model solved by perturbing each input in turn by 0, ±10 and ±20%

c Values calculated from the mean of inputs reported in Table 2 and inputs reported by Crompton et al. (Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018)

Discussion

Increasing the efficiency of conversion of feed N into milk and meat N in ruminant production is an integral part of the effort to increase global food production while decreasing agriculture's environmental impact (Dijkstra et al., Reference Dijkstra, Bannink, Bosma, Lantinga and Reijs2018; Grossi et al., Reference Grossi, Goglio, Vitali and Williams2018). Improving N utilization in the ruminant is dependent on a clear understanding of post-absorptive amino acid metabolism (Reynolds, Reference Reynolds, Sejrsen, Hvelplund and Nielsen2006). The present model described the partitioning of the indispensable amino acid PHE (and TYR) in the bovine liver and provided estimates of PHE and TYR flow across the liver, rates of PHE and TYR incorporation into constitutive and export protein synthesis, and the rate of hydroxylation of PHE to TYR. The scheme presented herein (Fig. 1) and evaluated for dairy cows should be readily applicable to other mammals and birds, including farm livestock, pets and humans.

PHE and TYR enter the liver via the portal vein, the main blood supply to liver, and the hepatic artery. Amino acids in the portal vein represent recently absorbed or released amino acids from the portal drained viscera and amino acids present in the mesenteric arterial supply. The total flow of amino acids in the arterial supply to the portal-drained viscera is considerably greater than the amount added by absorption and any net uptake by the same tissues. Amino acids in hepatic and mesenteric arterial blood reflect the impact of peripheral tissue nutrient utilization on amino acid availability in the arterial pool (Reynolds, Reference Reynolds, Sejrsen, Hvelplund and Nielsen2006). The model demonstrated a greater flow of PHE and TYR from the portal vein (80% of total inflow) than that from the hepatic artery, which was expected as the portal vein accounted for the majority (75%) of liver blood flow in the four animals. In vivo studies have observed a negative net flow (net removal) of PHE across the bovine liver, suggesting the liver is a major site of catabolism (e.g. Larsen et al., Reference Larsen, Galindo, Ouellet, Maxin, Kristensen and Lapierre2015). In agreement, model solutions indicated a net negative flow of PHE and TYR across the liver (outflow minus inflow, −651 and −329 μmol/min PHE and TYR respectively).

Within the liver PHE may either be used for protein synthesis or be converted to TYR, the conversion of which is catalysed by PHE hydroxylase. TYR is not considered essential, because it can be synthesized from PHE in addition to that provided by the diet. On average the model estimated that 36% of inflow of PHE from blood (sum of hepatic artery and portal vein inflows) to the liver was converted to TYR. Outflows of PHE and TYR from the liver include oxidation and incorporation into secreted hepatic proteins. Oxidation rates varied greatly in individual animals (range 339–650 μmol/min), the lowest value observed in the animal receiving the water infusion and in our previous work the highest rate of oxidation (525 μmol/min) was observed in the one animal receiving the essential amino acid infusion (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). Higher rates of oxidation in animals receiving additional PHE via the essential amino acid infusions reflect an increased supply relative to requirements. The oxidation rate in the animal receiving the control water infusion was similar to those previously reported in lactating dairy cows fed a high protein diet (Raggio et al., Reference Raggio, Lobley, Berthiaume, Pellerin, Allard, Dubreuil and Lapierre2007). Oxidation rates used in the present model accounted for 28% of total PHE and TYR inflow to the liver. Measuring TYR oxidation directly represents a challenge experimentally. In general, deuterium labelled PHE is inadequate for quantifying PHE kinetics and oxidation, which requires the use of carbon labelled PHE and by default, deuterium labelled TYR (Matthews, Reference Matthews2007).

The liver makes several export proteins of various functions. Albumin is important for the maintenance of intravascular colloid osmotic pressure. Due to this critical role, albumin synthesis is maintained across various mild physiological challenges, although in more severe situations of nutrient shortage, albumin synthesis may decrease. Raggio et al. (Reference Raggio, Lobley, Berthiaume, Pellerin, Allard, Dubreuil and Lapierre2007) determined export plasma protein synthesis rate in lactating dairy cows and assumed that export plasma protein contained 5% PHE. The value thus obtained was used in the present model to represent the flow of PHE into export protein. Since plasma proteins are also derived from sources other than the liver, the assumption that total plasma export protein synthesis is all hepatic in origin might overestimate the flow of PHE into export protein in the current model, however, given export protein PHE flow is minor (33.8), overestimation will have negligible impact on other PHE flows. The incorporation of TYR into albumin was unknown and assumed equivalent to that of PHE after correcting for the relative proportions of PHE and TYR in albumin. This assumption is recognized as a limitation of the current modelling exercise. Specifically, the incorporation of individual amino acids depends on the type of export protein; some export proteins may require proportionally higher or lower amounts of PHE or TYR.

Model solutions representing the rate of constitutive protein synthesis for PHE and TYR enable the ratio of PHE:TYR in constitutive liver protein to be estimated. The ratio was variable and ranged from 1.1 to 2.4. with a mean value of 1.63, this compares with a mean of 1.30 (range 1.06–1.66) using the ten-pool solution (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018) and are comparable to the ratio calculated from the measured amino acid composition of calf liver of 1.36 (range 1.22–1.43) reported by Rius et al. (Reference Rius, Weeks, Cyriac, Akers, Bequette and Hanigan2012).

A feature of the present model is the description of intracellular PHE and TYR partitioning. Constitutive hepatic protein degradation, for example, was a larger contributor to the free PHE and TYR pools than portal vein and hepatic artery delivery, with delivery being 76 and 96% of degradation in the case of PHE and TYR, respectively. Model estimates of intracellular PHE and TYR partitioning must be interpreted with caution due to methodological limitations and imposed assumptions. For example, samples were taken from whole blood and free PHE and TYR concentrations were quantified and considered in the model. Therefore, the extent to which peptide-bound PHE and TYR contribute to constitutive protein synthesis and degradation flows cannot be determined. As hepatic tissues were not sampled, isotopic enrichment of the intracellular pools was estimated based on the sampled precursor pools. The choice of precursor pool enrichment is central in the present model as with any measurement of protein synthetic rate in the whole body or tissues (Waterlow, Reference Waterlow2006). The assumption that intracellular enrichments were 0.30 of plasma was based on unpublished observations from an unrelated in vivo trial from our laboratory. Using the same isotopes as the present study, average liver homogenate-free enrichment for PHE and TYR was 0.30 (s.d. 0.07; range 0.19–0.38) of plasma enrichment in lactating dairy cattle. Besides, the actual precursor pool for various constitutive and export proteins may differ. Lack of homogeneity in activity at various parts of the liver indicates that intracellular enrichment is not uniform throughout the liver, and enrichment in export protein and constitutive protein therefore may differ. In particular, the precursor enrichment for constitutive protein synthesis may be lower than that for export protein synthesis (Connell et al., Reference Connell, Calder, Anderson and Lobley1997). Due to the lack of specific measurements, export protein precursor enrichment could not be included in the present model.

The two sub-models described herein are based on compartmental analysis and isotope tracer methods for kinetic studies in vivo. Conservation of mass principles are applied to each pool to generate differential equations which describe the behaviour of the system in steady state. This is the same approach as used in our previous work on amino acid uptake by the bovine liver (France et al., Reference France, Hanigan, Reynolds, Dijkstra, Crompton, Maas, Bequette, Metcalf, Lobley, MacRae and Beever1999; Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). However, splitting the original 10-pool model reduces the number of inter-linked pools and the number of unknowns within each scheme. Solving the PHE and TYR sub-models sequentially, then linking the two solutions algebraically to re-create the integrated model, eliminates the necessity of having to use [13C]TYR enrichment in pools 3, 4, 6 and X for model solution. Enrichment of [13C]TYR was on average only 12% of the corresponding [13C]PHE enrichment and was close to minimum detection levels. Sensitivity analysis of model solutions has shown that measured isotopic enrichment and assumed intracellular enrichment values have the greatest impact on calculated flows, highlighting the importance of precise isotopic enrichment analysis and measuring intracellular enrichment directly. Solving the original model as two five-pool schemes yielded biologically feasible solutions, i.e. the computed flows were all non-negative, consequently there was no requirement to map the solution space iteratively with error bands of ±25% for prescribed intracellular and measured extracellular enrichments to find best feasible solutions as for the ten-pool model (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). Solving the model by cleaving into two five-pool schemes rather than solving the ten-pool scheme directly is therefore preferred as there appears to be less compounding of errors. Accurate values of the intracellular and extracellular enrichments are central to minimising errors in the calculated flows.

Conclusion

Herein, a ten-pool model of liver PHE and TYR metabolism was solved by cleaving into two five-pool sub-models (one for PHE and one for TYR), solving them separately, and linking the two solutions by assuming the ratios of TYR to PHE in protein synthesized and protein degraded are equal. The sensitivity analysis conducted on enrichments, infusion rates and prescribed flows indicated model solutions were most sensitive to values of the enrichments. Previously, the model was solved as a single ten-pool scheme (Crompton et al., Reference Crompton, McKnight, Reynolds, Mills, Ellis, Hanigan, Dijkstra, Bequette, Bannink and France2018). Initial solutions for each of the cows reported were non-physiological as some of the derived flows gave negative values. The solutions reported herein derived using two five-pool schemes without the use of iteration were biologically feasible, i.e. the computed flow values are all non-negative. Solving the model by cleaving into two five-pool schemes rather than solving the ten-pool scheme directly is therefore preferred as there appears to be less compounding of errors. Accurate values of the intracellular and extracellular enrichments are central to minimising errors in the calculated flows.

Author contributions

Conceptualization: LAC, CKR and JF; methodology: LAC, CKR, JD and JF; formal analysis: LAC, LAM, JLE and JF; writing – original draft preparation: LAC and JF; writing – review and editing: LAC, LAM, CKR, JLE, JD and JF. All authors have read and agreed to the published version of the manuscript.

Financial support

This work was funded, in part, through DEFRA project LS3656 and the Canada Research Chairs Program. The experimental work was funded by a consortium of DEFRA, BBSRC, the Milk Development Council, Purina Mills LLC and NUTRECO Inc.

Conflict of interest

None.

Ethical standards

All experimental procedures used were licensed, regulated and inspected by the UK Home Office under the Animals (Scientific Procedures) Act, 1986.

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Figure 0

Fig. 1. Scheme for the uptake and utilization of PHE and TYR by the liver of lactating dairy cows as described by Crompton et al. (2018). The small circles in Fig. 1 indicate flows out of the system which need to be measured experimentally.

Figure 1

Fig. 2. Scheme for the uptake and utilization of PHE by the liver of lactating dairy cows: (a) total PHE, (b) [13C] labelled PHE. The small circles in Fig. 2(a) indicate flows out of the system which need to be measured experimentally.

Figure 2

Table 1. Principle symbols used for the kinetic model

Figure 3

Fig. 3. Scheme for the uptake and utilization of TYR by the liver of lactating dairy cows: (a) total TYR, (b) [2H] labelled TYR. The small circles in Fig. 3(a) indicate flows out of the system which need to be measured experimentally.

Figure 4

Table 2. Experimental and other inputs

Figure 5

Table 3. Phenylalanine and tyrosine uptake and partition by the liver for four lactating dairy cows obtained using the two five-pool models (symbols are defined in the text and Table 1)

Figure 6

Table 4. Phenylalanine and tyrosine uptake and partition by the liver of lactating dairy cows obtained using the two five-pool models (symbols are defined in the text and Table 1) and the corresponding solutions obtained using the ten-pool model of Crompton et al. (2018)

Figure 7

Table 5. Average slope (%) for each of the flows calculated by the model obtained by perturbing each input in turna