The classical PBTK approach by Derks

The most prominent model was published by Derks et al. (1994)^{(Reference Derks, Berende and Olling27)}. It is a classical physiologically based toxicokinetic (PBTK) model that describes the ADME processes of a contaminant in an organism while taking into account various physiological and physico-chemical factors of an individual lactating cow. In a classical PBTK approach, the contaminant is distributed from one compartment to another, whereby the concentration-driven rate terms depend on several characteristics of the animal and contaminant, as well as on the compartments themselves. All the rate terms are combined into a system of mass balance equations that describes the amount of contaminant in each compartment over time, as well as the outflow in the form of metabolised contaminant and milk excretion. The PBTK model of Derks et al. (1994)^{(Reference Derks, Berende and Olling27)} consists of six compartments (Fig. 5): blood, which connects all compartments; liver, in which metabolic degradation occurs; udder (represented only by udder fat), from which continuous excretion via milk fat occurs; body fat as peripheral storage compartment; and the remaining organs, which are divided into slowly (e.g. muscle, skin, bones) and richly blood-perfused (main internal organs except liver, e.g. kidney and gastrointestinal tract). The substance enters the system via the liver, so this model takes first-pass kinetics into account. The distribution between blood and each tissue compartment depends on three variables: the blood flow ${Q_i}$ [L/d], the compartment volume ${V_i}$ [L] (both of which depend on the physiology of the individual cow) and the partition coefficient ${P_i}$ [unitless], which reflects the physico-chemical properties of the contaminant by describing the tissue–blood ratio of the contaminant in equilibrium. In addition, it is assumed that all transitions between the compartments are blood flow limited, except for the fat compartment, which is diffusion limited and is taken into account by multiplying the blood flow ${Q_{\rm{F}}}\;\left[ {{\rm{L}}/{\rm{d}}} \right]$ by a constant ${F_Q}$ ≤ 1. Blood flow limited means that it is assumed that the amount of blood flow into the tissue is the limiting factor in the exchange of substances, that is, the blood within the tissue is immediately in steady state with the tissue. Diffusion limited means that we assume the limiting factor is the exchange of contaminant from blood to tissue and is not instantaneous (and by definition not instantly in steady state). The liver metabolism is accounted for with a first-order rate constant ${k_{{\rm{met}}}}$ [1/d] and the proportion that is absorbed from the GIT via first-pass into the liver is accounted for by a redefined ${F_{{\rm{abs}}}}$ [unitless]. The milk fat yield is now labelled ${\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}$ [L/d], instead of the synonymous ${V_{{\rm{Milk}}}}$ from previous models to underline the fact that this variable serves the function of kinetic clearance of contaminant through the removal of udder fat (identical in concentration to milk fat). The assumption of continuous lactation throughout the day is made. The resulting differential equation system is

(18) $${{{\rm{d}}{A_{{\rm{Blood}}}}} \over {{\rm{d}}t}} = \sum_{i\epsilon T} ({{Q_{i}}{A_{i}} \over {{V_{i}}{P_{i}}}} - {{Q_{i}}{A_{Blood}} \over {{V_{Blood}}}}) + {F_Q}{{{Q_{{\rm{Fat}}}}{A_{{\rm{Fat}}}}} \over {{V_{{\rm{Fat}}}}{P_{{\rm{Fat}}}}}} - {F_Q}{Q_{{\rm{Fat}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}}$$

Fig. 5. Schematic depiction of the original six-compartment model derived in Derks et al. (1994)^{(Reference Derks, Berende and Olling27)}. Here, ${Q_i}_{}$ [L/d] stand for the blood flow rate into/out of the compartment i, ${P_i}$ [unitless] is the (compartment i)/blood partition coefficient and ${V_i}$ [L] is the volume of compartment i. The compartments i are liver, richly perfused tissues, slowly perfused tissues, udder, fat and blood. For fat we have an additional constant ${F_Q}$ [unitless] accounting for the fact that this compartment is diffusion limited. The input into this model happens continuously through the liver with D [ng/d] being the dose of contaminant fed to the cow daily and ${F_{abs}}$ the fraction absorbed into the system. Metabolism of the contaminant takes place in the liver at the rate ${k_{met}}$ [1/d]. Additionally, the contaminant is excreted in the udder via milk proportional to the amount of milk fat excreted $C{L_{Milk}}\left[ {L/d} \right]$ .

with T = {Slow, Rich, Udder, Liver},

(19) $${{{\rm{d}}{A_{{\rm{Fat}}}}} \over {{\rm{d}}t}} = {F_Q}{Q_{{\rm{Fat}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {F_Q}{{{Q_{{\rm{Fat}}}}{A_{{\rm{Fat}}}}} \over {{V_{{\rm{Fat}}}}{P_{{\rm{Fat}}}}}},$$

(20) $${{{\rm{d}}{A_{{\rm{Liver}}}}} \over {{\rm{d}}t}} = {Q_{{\rm{Liver}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} + {F_{{\rm{abs}}}}D - {{{Q_{{\rm{Liver}}}}{A_{{\rm{Liver}}}}} \over {{V_{{\rm{Liver}}}}{P_{{\rm{Liver}}}}}} - {k_{{\rm{met}}}}{A_{{\rm{Liver}}}},$$

(21) $${{{\rm{d}}{A_{{\rm{Rich}}}}} \over {{\rm{d}}t}} = {Q_{{\rm{Rich}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {{{Q_{{\rm{Rich}}}}{A_{{\rm{Rich}}}}} \over {{V_{{\rm{Rich}}}}{P_{{\rm{Rich}}}}}},$$

(22) $${{{\rm{d}}{A_{{\rm{Slow}}}}} \over {{\rm{d}}t}} = {Q_{{\rm{Slow}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {{{Q_{{\rm{Slow}}}}{A_{{\rm{Slow}}}}} \over {{V_{{\rm{Slow}}}}{P_{{\rm{Slow}}}}}},$$

(23) $${{{\rm{d}}{A_{{\rm{Udder}}}}} \over {{\rm{d}}t}} = {Q_{{\rm{Udder}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {{{Q_{{\rm{Udder}}}}{A_{{\rm{Udder}}}}} \over {{V_{{\rm{Udder}}}}{P_{{\rm{Udder}}}}}} - {{{\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}{A_{{\rm{Udder}}}}} \over {{V_{{\rm{Udder}}}}}}.$$

The concentration in milk fat is thus given by

(24) $${C_{{\rm{Milk}}}} = {{{A_{{\rm{Udder}}}}} \over {{V_{{\rm{Udder}}}}}}.$$

Different methods have been used to obtain model parameters. Especially notable is the calculation of the partition coefficients ${P_i}$ , which was discussed in detail by Derks (1994)^{(Reference Derks, Berende and Olling27)} and van Eijkeren (1998)^{(Reference van Eijkeren, Jager and Sips29)}, as we summarise below. Blood flow and organ volume were directly derived from experimental data and ${k_{{\rm{met}}}},\;{F_Q}$ and ${F_{{\rm{abs}}}}$ fitted to experimental data with numerical methods.

The determination of partition coefficients ${P_i}$ was done differently in Derks (1994)^{(Reference Derks, Berende and Olling27)} and van Eijkeren (1998)^{(Reference van Eijkeren, Jager and Sips29)}. While Derks estimated the partition coefficient ${P_i}$ by dividing the tissue concentration of the contaminant by the blood concentration at the end of the study, van Eijkeren et al. (1998) estimated the partition coefficients using the ${K_{{\rm{ow}}}}$ of the contaminant and various generic tissue component fractions^{(Reference van Eijkeren, Jager and Sips29)}. But in MacLachlan 2009^{(Reference MacLachlan30)} it is noted that the latter method produces almost indistinguishable values for contaminants with log $\left( {{K_{{\rm{ow}}}}} \right)$ > 3; since all PCDD/Fs and PCBs fulfill this property, the method incorrectly predicts the same partition coefficients and therefore almost identical distribution for each congener among the compartments. It is thus recommended to use better methods to predict the partition coefficient for PCDD/Fs and PCBs, for example, Graham et al. (2011)^{(Reference Graham, Walker and Jones31)} or Endo et al. (2013)^{(Reference Endo, Brown and Goss32)}.

Derks et al. originally used their model to describe the dynamics of 2,3,7,8-TCDD in lactating cows^{(Reference Derks, Berende and Olling27)}, and other authors have since adapted it to describe other lipophilic contaminants. More recent studies^{(Reference Hoogenboom, Zeilmaker and van Eijkeren2,Reference van Eijkeren, Jager and Sips29,Reference Freijer, van Eijkeren and Sips33)} combined the udder fat and blood compartments into one blood compartment (Fig. 6), as the udder has a high blood flow ${Q_{{\rm{Udder}}}}$ compared with its small volume ${V_{{\rm{Udder}}}}$ , and therefore is almost instantly in equilibrium with the blood^{(Reference van Eijkeren, Jager and Sips29)}; this modification introduces a milk/blood partition coefficient, ${P_{{\rm{Milk}}}}$ , which is conceptually similar to the now missing compartment udder/blood partition coefficient, that is, the concentration in milk fat is then given by

(25) $${C_{{\rm{Milk}}}} = {{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}}{P_{{\rm{Milk}}}}.$$

Fig. 6. Schematic depiction of the modified Derks (1994)^{(Reference Derks, Berende and Olling27)} model with the udder included in the blood compartment. Here ${Q_i}_{}$ [L/d] stands for the blood flow rate into/out of the compartment i, ${P_i}\left[ {unitless} \right]$ is the partition coefficient between blood and compartment i and ${V_i}$ [L] is the volume of compartment i. The compartments i are liver, richly perfused tissues, slowly perfused tissues, body fat, blood and milk. For body fat, there is an additional constant ${F_Q}$ [unitless] accounting for the fact that this compartment is diffusion limited. The input into this model happens continuously through liver with daily contaminant dose D [ng/d] and fraction absorbed ${F_{{\rm{abs}}}}$ [unitless]. Metabolism of the contaminant takes place in the liver at the rate ${k_{{\rm{met}}}}$ [1/d]. Additionally, the contaminant from the blood can be excreted via milk proportional to the amount of milk fat excreted ${\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}\;\left[ {{\rm{L}}/{\rm{d}}} \right]$ .

This only changes the equation system slightly (Supplementary Material Chapters 1–4 and Equation S10). Additionally, it is possible to use this model for beef cattle or calves (non-lactating) by also removing the udder compartment and setting ${\rm{C}}{{\rm{L}}_{{\rm{Milk}}}} = 0$ and therefore having no milk excretion^{(Reference Freijer, van Eijkeren and Sips33,Reference Bogdal, Züst and Schmid34)} . Such a model without milk excretion had already been used by Leung et al. (1990)^{(Reference Leung, Paustenbach and Murray35)} for the description of TCDD kinetics in rats.

The fugacity approach by McLachlan

A different approach was proposed in McLachlan (1992)^{(Reference McLachlan28)}: a fugacity model to describe the dynamics of hydrophobic contaminants in a lactating cow; this was further developed in Rosenbaum et al. (2009)^{(Reference Rosenbaum, McKone and Jolliet36)} and Tremolada et al. (2014)^{(Reference Tremolada, Guazzoni and Parolini13)}. Such models are based on more general multimedia fugacity models (MFM) from environmental chemistry^{(Reference Parnis and Mackay37)}. MFMs are often used to describe the fate of chemical contaminants across whole environmental compartments, and specifically the rates at which they move between phases. The transfer rate is proportional to the fugacity difference between the source and destination phases. The basis of the model is the mass balance equations for each phase including fugacities, fluxes and amounts, in this case, applied to a single organism with inputs and outputs. The fugacity ( $f$ ) has units of pressure [Pa].

A key concept is the fugacity capacity ( ${Z_m}$ ) [mol/(m³Pa)], which is conceptually the capacity of compartment m (a phase) to absorb a solute (contaminant). The fugacity capacities ${Z_m}$ are calculated with the equilibrium partition coefficients of the chemicals, Henry’s law and other physico-chemical equations. The concentration ${C_m}$ of a chemical in compartment m is given by

(26) $${C_m} = {Z_m}{f_m}.$$

Note that conceptually ${Z_m}$ is similar to the partition coefficient of the classical PBTK approach in the sense that

(27) $${{{Z_m}} \over {{Z_i}}} = {P_{mi}}\left( { = {{{C_{m,ss}}} \over {{C_{i,ss}}}}} \right)$$

as in equilibrium among compartments ${f_{m,ss}} = {f_{i,ss}}$ holds true.

The transport coefficients $D$ [mol/(Pa·d)] describe processes, such as advective transport (of a substance by bulk motion, e.g. the ingestion of a contaminant with feed), transformation (e.g. metabolisation) and diffusion. $D$ is defined for advective processes as the product of a volume flow rate [m³/d] and a fugacity capacity $Z$ [mol/(m³Pa)]; $D$ is defined for diffusive processes as the product of a conductance [m/d], an interface area [m²] and a fugacity capacity; and for transformation $D$ is defined as the product of a rate constant [1/d], a compartment volume $V$ [m³] and a fugacity capacity [mol/( ${m^3}$ Pa)]^{(Reference McLachlan38)}. One conceptual core difference to the classical PBTK approach is that blood flow is not considered a limiting factor for the distribution of the contaminant, that is, purely diffusion-limited kinetics are assumed.

The MFM proposed by McLachlan consists of three compartments (Fig. 7): the digestive tract as the entry point into the system; the blood, which distributes the substance throughout the body; and finally, body fat as the storage compartment. The substance can be excreted either from the digestive tract via the faeces or from the blood via milk. In addition, the substance can also be metabolised in the blood compartment or the digestive system.

Fig. 7. Schematic depiction of the fugacity model proposed by McLachlan (1994)^{(Reference McLachlan38)}. Here ${D_{{\rm{Dig}} - {\rm{Blood}}}}$ [mol/(Pa·d)] and ${D_{{\rm{Blood}} - {\rm{Fat}}}}$ [mol/(Pa·d)] are the transport coefficients between the compartments. The input into the system is given by dose [mol/d] into the digestive tract. Excretion can happen via faeces out of the digestive tract or via milk out of the blood with transport coefficients ${D_{{\rm{Exc}}}}$ [mol/(Pa·d)] and ${D_{{\rm{Milk}}}}$ [mol/(Pa·d)], respectively. Additionally, in both these compartments, the contaminant can be metabolised with transport coefficients ${D_{{\rm{Dig}} - {\rm{Meta}}}}$ [mol/(Pa·d)] and ${D_{{\rm{Blood}} - {\rm{Meta}}}}$ [mol/(Pa·d)], respectively.

An additional assumption is made, namely that the system is always in a ‘pseudo-equilibrium’, that is, from the knowledge of the fugacity in one compartment, all other fugacities can be calculated; importantly, only the fat compartment acts dynamically. This results in a mass balance equation system of the form

(28) $${\rm{Dose}} = {D_{{\rm{Exe}}}}{f_{Dig}} + {D_{{\rm{Dig}} - {\rm{Blood}}}}\left( {{f_{{\rm{Dig}}}} - {f_{{\rm{Blood}}}}} \right) + {D_{{\rm{Dig}} - {\rm{Meta}}}}{f_{{\rm{Dig}}}},$$

(29) \begin{align}{D_{{\rm{Dig}} - {\rm{Blood}}}}\left( {{f_{{\rm{Dig}}}} - {f_{{\rm{Blood}}}}} \right) &= {D_{{\rm{Milk}}}}{f_{{\rm{Blood}}}} + {D_{{\rm{Blood}} - {\rm{Fat}}}}\left( {{f_{{\rm{Blood}}}} - {f_{{\rm{Fat}}}}} \right)\\ &\quad + {D_{{\rm{Blood}} - {\rm{Meta}}}}{f_{{\rm{Blood}}}},\end{align}

(30) $${D_{{\rm{Blood}} - {\rm{Fat}}}}\left( {{f_{{\rm{Blood}}}} - {f_{{\rm{Fat}}}}} \right) = {{{\rm{d}}\left( {{V_{{\rm{Fat}}}}{Z_{{\rm{Fat}}}}{f_{{\rm{Fat}}}}} \right)} \over {{\rm{d}}t}}.$$

And therefore the concentration in milk fat is given by

(31) $${C_{{\rm{Milk}}}} = {{{D_{{\rm{Milk}}}}{f_{{\rm{Blood}}}}} \over {{\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}}},$$

where ${\rm{C}}{{\rm{L}}_{{\rm{Milk\;}}}}\left[ {{\rm{mol}}/{\rm{d}}} \right]$ is the amount of milk fat excreted each day.

Owing to the pseudo-equilibrium assumption, there is only one linear differential equation, so the McLachlan (1994)^{(Reference McLachlan38)} model mathematically behaves as a one-compartment model, thereby inducing only one half-life (no biphasic behaviour). With the help of various data sets, McLachlan was able to create formulas for all non-metabolic transport coefficients that depend only on the ${K_{{\rm{ow}}}}$ value and Henry’s law H of the contaminant. To do that, it was assumed that the contaminant has to pass through a water and lipid layer to change from one compartment to another. For the metabolic transport coefficients ${D_{{\rm{Blood}} - {\rm{Meta}}}}$ and ${D_{{\rm{Dig}} - {\rm{Meta}}}}$ , no satisfactory data were available and the respective factors were set to 0 in the simulations.

A similar approach with the same three compartments was later used in Tremolada et al. (2014)^{(Reference Tremolada, Guazzoni and Parolini13)}. Here, the pseudo-equilibrium assumption was dropped so that a biexponential behaviour can be reproduced; the volumes of all three compartments (and not only the volume ${V_{{\rm{Fat}}}}$ of the fat compartment) were additionally considered. Furthermore, the input parameter Dose is also described in terms of fugacity, that is, Dose = ${D_{{\rm{Grass}}}}{f_{{\rm{Grass}}}} + {D_{{\rm{Feed}}}}{f_{{\rm{Feed}}}} + \;{D_{{\rm{Soil}}}}{f_{{\rm{Soil}}}}$ . This results in the differential equation system

(32) \begin{align}& {{{\rm{d}}{f_{{\rm{Dig}}}}} \over {{\rm{d}}t}}{\rm{ }} =\\ &\qquad{\rm{ }}{{{D_{{\rm{Grass}}}}{f_{{\rm{Grass}}}} + {D_{{\rm{Feed}}}}{f_{{\rm{Feed}}}} + \;{D_{{\rm{Soil}}}}{f_{{\rm{Soil}}}} + {D_{{\rm{Blood}} - {\rm{Dig}}}}{f_{{\rm{Blood}}}} - \left( {{D_{{\rm{Exc}}}} + {D_{{\rm{Dig}} - {\rm{Met}}}}} \right){f_{{\rm{Dig}}}}^,} \over {{V_{{\rm{Dig}}}}{Z_{{\rm{Dig}}}}}}\end{align}

(33) \begin{align}& {{{\rm{d}}{f_{{\rm{Blood}}}}} \over {{\rm{d}}t}}{\rm{ }} =\\ &\qquad {\rm{ }}{{{D_{{\rm{Blood}} - {\rm{Dig}}}}\left( {{f_{{\rm{Dig}}}} - {f_{{\rm{Blood}}}}} \right) + {D_{{\rm{Blood}} - {\rm{Fat}}}}({f_{{\rm{Fat}}}} - {f_{{\rm{Blood}}}}) - \left( {{D_{{\rm{Milk}}}} + {D_{{\rm{Blood}} - {\rm{Meta}}}}} \right){f_{{\rm{Blood}}}}^,} \over {{V_{{\rm{Blood}}}}{Z_{{\rm{Blood}}}}}}\end{align}

(34) $${{{\rm{d}}{f_{{\rm{Fat}}}}} \over {{\rm{d}}t}} = {{{D_{{\rm{Blood}}}}\left( {{f_{{\rm{Blood}}}} - {f_{{\rm{Fat}}}}} \right)} \over {{V_{{\rm{Fat}}}}{Z_{{\rm{Fat}}}}}}.$$

And the concentration in milk fat is again given by

(35) $${C_{{\rm{Milk}}}} = {{{D_{{\rm{Milk}}}}{f_{{\rm{Blood}}}}} \over {{\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}}}.$$

Here, the transport coefficients ${D_i}$ were derived similarly as in McLachlan (1994)^{(Reference McLachlan38)}. Additionally, the metabolic rate constants were calculated under the assumption that they are the sole reason for the discrepancy between measured excretion via milk + faeces and input of contaminants. Furthermore, it is assumed that the metabolic rate is also proportional to the lipid volume of the compartment and its fugacity capacity, that is, ${D_{i - {\rm{Meta}}}} = {k_i}{V_i}{Z_{{\rm{oct}}}}$ for a fitted ${k_i}$ , where ${Z_{{\rm{oct}}}}\;$ is the fugacity capacity of octanol.

In this context, the CKow dynamic model of transfer to meat and milk for lipophilic contaminants proposed by Rosenbaum et al. (2009)^{(Reference Rosenbaum, McKone and Jolliet36)} should be mentioned. At its core, CKow is a three-compartment model of the same structure as McLachlan (1994)^{(Reference McLachlan38)}, where the transition terms between the compartments are also derived similarly to McLachlan’s, but instead of the fugacities of each compartment, they work with concentration of the contaminant, thereby eliminating the need of transforming fugacities into concentration in practical applications.

Generalised models for the transfer of lipophilic contaminants into milk

Generalised models for the transfer of lipophilic contaminants into cow’s milk can also be used for PCDD/Fs and PCBs. One such generalised model was developed in MacLachlan (2009)^{(Reference MacLachlan30)}. This is a classic PBTK model with eight compartments (Fig. 8), which is similar in structure to the model developed by Derks in 1994, but with two major differences. The first difference is that the remaining tissues are not divided into poorly and richly perfused, but into muscle, kidney and other tissue compartments. The other difference is the addition of a rumen compartment, which creates a gradual passage (exponentially distributed input) to the intestine following first-pass kinetics via the liver; thereafter, the contaminant follows liver first-pass metabolism. While these generalisations make the model widely applicable, for PCDD/Fs and PCBs (because of their long half-lives), rumen lag before liver first-pass effect may not be so important to model explicitly^{(Reference MacLachlan30)}.

Fig. 8. Schematic depiction of the general eight-compartment model derived in MacLachlan (2009)^{(Reference MacLachlan30)}. Here ${Q_i}$ [L/d] stand for the blood flow rates into/out of the compartment i, ${P_i}$ [unitless] is the (compartment i)/blood partition coefficient, ${V_i}$ [L] is the volume of compartment i. The compartments i are liver, richly perfused tissues, slowly perfused tissues, udder, body fat, blood and milk. For body fat there is an additional constant ${F_Q}$ accounting for the fact that this compartment is diffusion limited. The input into this model happens continuously into the rumen, with D [ng/d] being the dose of contaminants in feed. From the rumen, the fraction ${F_{{\rm{abs}}}}$ [unitless] of contaminant gets absorbed at the rate ${k_a}\;\left[ {1/{\rm{d}}} \right]\;$ into the main part of the system; the rest is excreted via the faeces. Metabolism of the contaminant takes place in the liver with the clearance ${\rm{C}}{{\rm{L}}_{{\rm{Liver}}}}$ [1/d]. Additionally, the contaminant can be excreted from the udder via milk, proportional to the amount of milk fat excreted ${\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}\;\left[ {{\rm{L}}/{\rm{d}}} \right]$ .

The model can be written as the differential equation system

(36) $${{{\rm{d}}{A_{{\rm{Rumen}}}}} \over {{\rm{d}}t}} = \left( {{F_{{\rm{abs}}}} - 1} \right){k_a}{A_{{\rm{Rumen}}}} + {\rm{Dose}},$$

(37) \begin{align}{{{\rm{d}}{A_{{\rm{Liver}}}}} \over {{\rm{d}}t}}{\rm{ }} &= {Q_{{\rm{Liver}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} + {F_{{\rm{abs}}}}{k_a}{A_{{\rm{Rumen}}}} - {{{Q_{{\rm{Liver}}}}{A_{{\rm{Liver}}}}} \over {{V_{{\rm{Liver}}}}{P_{{\rm{Liver}}}}}}\\ &\quad - {{{k_{{\rm{met}}}}{A_{{\rm{Liver}}}}} \over {{P_{{\rm{Liver}}}}}},\end{align}

(38) $${{{\rm{d}}{A_{{\rm{Blood}}}}} \over {{\rm{d}}t}} = \sum_{i \epsilon T}\left({{{Q_{i}{{\it{A_{i}}}}}} \over {{V_{i}{{\it{P_{i}}}}}}} - {Q_{i}A_{Blood}\over{V_{Blood}}}\right) + {F_{Q}{{Q_{{\it{Fat}}}}{A_{{\rm{Fat}}}}} \over {{V_{{\rm{Fat}}}}{P_{{\rm{Fat}}}}}} - F_{Q}Q_{Fat}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} $$

with T = {Kidney, Muscle, Rest, Udder, Liver},

(39) $${{d{A_{{\rm{Fat}}}}} \over {{\rm{d}}t}} = {F_Q}{Q_{{\rm{Fat}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {{{F_Q}{Q_{{\rm{Fat}}}}{A_{{\rm{Fat}}}}} \over {{V_{{\rm{Fat}}}}{P_{{\rm{Fat}}}}}},$$

(40) $${{{\rm{d}}{A_{{\rm{Kidney}}}}} \over {{\rm{d}}t}} = {Q_{{\rm{Kidney}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {{{Q_{{\rm{Kidney}}}}{A_{{\rm{Kidney}}}}} \over {{V_{{\rm{Kidney}}}}{P_{{\rm{Kidney}}}}}},$$

(41) $${{{\rm{d}}{A_{{\rm{Muscle}}}}} \over {{\rm{d}}t}} = {Q_{{\rm{Muscle}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {{{Q_{{\rm{Muscle}}}}{A_{{\rm{Muscle}}}}} \over {{V_{{\rm{Muscle}}}}{P_{{\rm{Muscle}}}}}},$$

(42) $${{{\rm{d}}{A_{{\rm{Udder}}}}} \over {{\rm{d}}t}} = {Q_{{\rm{Udder}}}}{{{A_{{\rm{Blood}}}}} \over {{V_{{\rm{Blood}}}}}} - {{{Q_{{\rm{Udder}}}}{A_{{\rm{Udder}}}}} \over {{V_{{\rm{Udder}}}}{P_{{\rm{Udder}}}}}} - {{{\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}{A_{{\rm{Udder}}}}} \over {{V_{{\rm{Udder}}}}}}.$$

Thus, the concentration in milk fat is again given by

(43) $${C_{{\rm{Milk}}}} = {{{A_{{\rm{Udder}}}}} \over {{V_{{\rm{Udder}}}}}}.$$

Similar to the Derks model^{(Reference Derks, Berende and Olling27)}, the transition between each compartment depends on the blood flows ${Q_i}$ [L/d], the compartment volumes ${V_i}$ [L/d] (both of which depend on the properties of the individual cow) and the partition coefficient ${P_i}$ [unitless], which reflects the physico-chemical properties of the contaminant by describing the tissue–blood ratio of the contaminant in the stationary state. Additionally, the milk excretion model is the same as in Derks, that is, proportional to the amount of milk fat excreted ${\rm{C}}{{\rm{L}}_{{\rm{Milk}}}}\;$ [L/d]; likewise, the metabolism follows linear kinetics with rate ${k_{{\rm{met}}}} = {\rm{C}}{{\rm{L}}_{{\rm{Liver}}}}/{P_{{\rm{Liver}}}}\;$ [1/d], where ${\rm{C}}{{\rm{L}}_{{\rm{Liver}}}}$ [1/d] is the liver clearance.

The parameters should all be taken from the literature, except for the partition coefficient they proposed, which can be calculated using the contaminant’s log $\left( {{K_{{\rm{ow}}}}} \right)$ value if no further information is available. But as mentioned in the classical PBTK approach by Derks, such a method suffers from prediction problems for PCDD/Fs and PCBs. An alternative would be to predict partition coefficients with other methods (see e.g. Graham et al. (2011)^{(Reference Graham, Walker and Jones31)} or Endo et al. (2013)^{(Reference Endo, Brown and Goss32)}).

An even more general model that considers multiple trophic levels for several kinds of contaminants was developed by Hendriks et al. (2001)^{(Reference Hendriks, van der Linde and Cornelissen39)}. It was later adapted to cattle by Hendriks et al. (2007) to calculate the BTF of various contaminants into milk and beef^{(Reference Hendriks, Smítková and Huijbregts40)}. For lactating cows, this latter model essentially boils down to a one-compartment model with multiple input and output sources (Fig. 9), yielding a differential equation of the form

(44) \begin{align}{{{\rm{d}}{C_{{\rm{Cow}}}}\left( t \right)} \over {{\rm{d}}t}}{\rm{ }} &= {k_{{\rm{in}},n}}{C_{{\rm{Feed}}}} + {k_{{\rm{in}},w}}{C_{{\rm{Water}}}}\\ &\quad - \left( {{k_{{\rm{out}},n}} + {k_{{\rm{out}},w}} + {k_p} + {k_{{\rm{met}}}}} \right){C_{{\rm{Cow}}}}\left( t \right).\end{align}

Fig. 9. Schematic description of the multitrophic level model of Hendriks et al. (2001)^{(Reference Hendriks, van der Linde and Cornelissen39)}, adapted to the lactating cow^{(Reference Hendriks, Smítková and Huijbregts40)}. The source of contamination could be feed, divided into water and lipid, or just water. The absorption rate of both, ${k_{{\rm{in}},i}}$ [1/d], is derived assuming that these contaminants must first pass through both water and lipid layers to enter the cow. The excretion of contaminants is divided into urinal excretion represented as water in the model on the one hand, and biomass excretion on the other (e.g. milk), which is further divided into water and lipid. The excretion rates ${k_{{\rm{out}},i}}$ [1/d] from the system are influenced by a water and lipid layer, as was the case for absorption. In addition, the reduction of the contaminant concentration in the cow’s body can occur via metabolism or dilution of the biomass with the rate constants ${k_{{\rm{met}}}}$ [1/d] or ${k_p}$ [1/d].

and the concentration in milk fat is thus given by

(45) $${C_{{\rm{Milk}}}}\left( t \right) = {C_{{\rm{Cow}}}}\left( t \right){{{V_{{\rm{Cow}}}}} \over {{V_{{\rm{Milk}}}}}}{k_{{\rm{Milk}}}}$$

Here, ${k_{{\rm{in}},n}}$ and ${k_{{\rm{out}},n}}$ [1/d] are the input and output rates via feed, where ${k_{{\rm{out}},n}}$ includes the excretion with milk fat at rate ${k_{{\rm{Milk}}}}\;\left[ {1/{\rm{d}}} \right]$ ; ${k_{{\rm{in}},w}}$ and ${k_{{\rm{out}},w}}$ [1/d] are the input and output rates via water (irrelevant for highly hydrophobic contaminants such as PCDD/Fs and PCBs). Additionally, elimination of the substance can happen via metabolism/transformation with rate constant ${k_{{\rm{met}}}}$ , and dilution of biomass (e.g. growth) with rate constant ${k_p}$ . The concentration in food and water are given by ${C_{{\rm{Feed}}}}$ [ng/L] and ${C_{{\rm{Water}}}}$ [ng/L]. Finally, the volumes of the cow and its daily milk fat yield is given by ${V_{{\rm{Cow}}}}\;\left[ {\rm{L}} \right]$ and ${V_{{\rm{Milk}}}}\;\left[ {{\rm{L}}/{\rm{d}}} \right]$ , respectively.

One of the main focuses of Hendriks (2001) was to show how to calculate the rate constants, especially ${k_{{\rm{in}}}}$ and ${k_{{\rm{out}}}}$ ^{(Reference Hendriks, van der Linde and Cornelissen39)}. For these, it was assumed that the contaminant moves in a path through lipid and water layers upon both entering and leaving the animal via feed or water, similarly to the approach by McLachlan (1994)^{(Reference McLachlan38)}. From this, they derived formulas describing ${k_{{\rm{in}}}}$ and ${k_{{\rm{out}}}}$ only depending on the ${K_{{\rm{ow}}}}$ value of the contaminant and the weight of the animal. For the dilution of biomass constant ${k_p}$ , they assume it also scales with the weight of the animal. Lastly, for the elimination via metabolism, the model has to be fitted using experimental data.

As an aside, we note that models related to Hendriks’ have been developed for broader applications. For example, the model for transfer from feed into cow’s milk is only one part of a larger model for PCDD/Fs and PCBs along the human food chain (e.g. ACC-Human)^{(Reference Czub and McLachlan41)}.

Calculating TR, TF and BTF for multicompartment models

Given a multicompartment model with a constant invertible transfer matrix $M$ and input vector $I$ ^{(Reference Klevenhusen, Sudekum and Breves8)}, we first need to calculate the steady-state solution of this system. This is accomplished by inserting both into the formula

(47) $${A_{{\rm{ss}}}} = {M^{ - 1}}I$$

or in the case of fugacity models

(48) $${f_{{\rm{ss}}}} = {M^{ - 1}}I$$

Here ${M^{ - 1}}$ is the inverse of the transfer matrix $M$ , which can be calculated with numerical methods. Then ${A_{{\rm{ss}}}}$ is the amount vector in steady state, that is, the quantity of contaminant in each compartment, and ${f_{{\rm{ss}}}}$ is the fugacity vector in steady state, respectively. In the case of the one compartment model by Hendriks et al. (2001)^{(Reference Hendriks, van der Linde and Cornelissen39)}, the steady state ${C_{{\rm{Cow}},{\rm{ss}}}}\;$ concentration can be directly calculated as

(49) $${C_{{\rm{Cow}},{\it{ss}}}} = {{{k_{{\rm{in}},n}}{C_{{\rm{Feed}}}}} \over {{k_{{\rm{out}},w}} + {k_{{\rm{out}},n}} + {k_p} + {k_{{\rm{met}}}}}}.$$

Here we assume that there is no input via water into the system ( ${k_{{\rm{in}},w}} = 0$ ), as we consider only the transfer from feed. The transfer parameters discussed in the chapter on kinetic parameters to characterise the feed-to-milk transfer behaviour from part I of this review^{(Reference Krause, Moenning and Lamp6)} can now be calculated for each compartment model type presented here using the formulas in Table 2.

Table 2. Formulas for calculating the transfer parameters discussed in part I of the review chapter Kinetic parameters to characterise the feed-to-milk transfer behaviour. Here ${A_{ \cdot ,{\rm{ss}}}}$ [ng] and ${f_{ \cdot ,{\rm{ss}}}}$ [Pa] are the steady-state amounts and fugacities respectively in the respective compartment for each model. Additional ${V_ \cdot }$ [L] is the volume of the respective compartment; ${\rm{C}}{{\rm{L}}_{{\rm{Milk\;}}}}$ [ng/d] is the amount of milk fat excreted each day; ${\rm{Dose}}\;$ [ng/d] or [mol/d] in the fugacity context is the amount of contaminant given to the animal each day; ${\rm{\;Feed}}$ [kg/d] is the amount feed given to cow each day; ${C_{{\rm{Milkfat}}}}$ [unitless] is the milk fat concentration; ${P_ \cdot }$ [unitless] is the partition coefficient for respective compartment and blood; finally ${D_{{\rm{Milk}}}}$ [mol/(Pa·d)] is the milk transport coefficient of the fugacity models; ${k_ \cdot }$ [1/d] are the respective transition rates in Hendriks’ model^{(Reference Hendriks, Smítková and Huijbregts40)}

Calculating the elimination half-lives for multicompartment models

For a given n-compartment model, the half-lives can be also calculated from the n eigenvalues ${\lambda _i}$ of the transition matrix M. For this, we can use numerical algorithms, as a symbolic evaluation becomes involved for transition matrices of models with more than two compartments. Knowing the eigenvalues, the half-lives are

(50) $${\tau _i} = {{{\rm{ln}}\left( 2 \right)} \over { - {\lambda _i}}}{\rm{with \ {\it{i}} \ {\it{in}} \{ 1,}} \ldots {\rm{,n\} }}{\rm{.}}$$

As already mentioned, there are usually more than two half-lives, but most of them are either too short to be relevant for risk assessment or are almost identical to each other. This effectively leaves us with only two of the ${\tau _i}$ ’s being truly different practical observable half-lives: the shorter one (the ${\rm{\alpha }}$ half-life) at the start of the depuration and the longer one ( ${\rm{\beta }}$ ) at the end.