A control coefficient^[10][11][12] measures the relative steady state change in a system variable, e.g. pathway flux (J) or metabolite concentration (S), in response to a relative change in a parameter, e.g. enzyme activity or the steady-state rate (${\displaystyle v_{i}}$ ) of step ${\displaystyle i}$ . The two main control coefficients are the flux and concentration control coefficients. Flux control coefficients are defined by

${\displaystyle C_{v_{i}}^{J}=\left({\frac {dJ}{dp}}{\frac {p}{J}}\right){\bigg /}\left({\frac {\partial v_{i}}{\partial p}}{\frac {p}{v_{i}}}\right)={\frac {d\ln J}{d\ln v_{i}}}}$ 

and concentration control coefficients by

${\displaystyle C_{v_{i}}^{S}=\left({\frac {dS}{dp}}{\frac {p}{S}}\right){\bigg /}\left({\frac {\partial v_{i}}{\partial p}}{\frac {p}{v_{i}}}\right)={\frac {d\ln S}{d\ln v_{i}}}}$ 

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Summation theorems edit

The flux control summation theorem was discovered independently by the Kacser/Burns group^[10] and the Heinrich/Rapoport group^[11] in the early 1970s and late 1960s. The flux control summation theorem implies that metabolic fluxes are systemic properties and that their control is shared by all reactions in the system. When a single reaction changes its control of the flux this is compensated by changes in the control of the same flux by all other reactions.

${\displaystyle \sum _{i}C_{v_{i}}^{J}=1}$ 

${\displaystyle \sum _{i}C_{v_{i}}^{s}=0}$ 

Elasticity coefficients edit

The elasticity coefficient measures the local response of an enzyme or other chemical reaction to changes in its environment. Such changes include factors such as substrates, products, or effector concentrations. For further information, please refer to the dedicated page at elasticity coefficients.

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Connectivity theorems edit

The connectivity theorems^[10][11] are specific relationships between elasticities and control coefficients. They are useful because they highlight the close relationship between the kinetic properties of individual reactions and the system properties of a pathway. Two basic sets of theorems exists, one for flux and another for concentrations. The concentration connectivity theorems are divided again depending on whether the system species ${\displaystyle S_{n}}$  is different from the local species ${\displaystyle S_{m}}$ .

${\displaystyle \sum _{i}C_{i}^{J}\varepsilon _{s}^{i}=0}$ 

${\displaystyle \sum _{i}C_{i}^{s_{n}}\varepsilon _{s_{m}}^{i}=0\quad n\neq m}$ 

${\displaystyle \sum _{i}C_{i}^{s_{n}}\varepsilon _{s_{m}}^{i}=-1\quad n=m}$ 

Kacser and Burns^[10] introduced an additional coefficient that described how a biochemical pathway would respond the external environment. They termed this coefficient the response coefficient and designated it using the symbol R. The response coefficient is an important metric because it can be used to assess how much a nutrient or perhaps more important, how a drug can influence a pathway. This coefficient is therefore highly relevant to the pharmaceutical industry.^[15]

The response coefficient is related to the core of metabolic control analysis via the response coefficient theorem, which is stated as follows:

${\displaystyle R_{m}^{X}=C_{i}^{X}\varepsilon _{m}^{i}}$ 

where ${\displaystyle X}$  is a chosen observable such as a flux or metabolite concentration, ${\displaystyle i}$  is the step that the external factor targets, ${\displaystyle C_{i}^{X}}$  is the control coefficient of the target steps, and ${\displaystyle \varepsilon _{m}^{i}}$  is the elasticity of the target step with respect to the external factor ${\displaystyle m}$ .

The key observation of this theorem is that an external factor such as a therapeutic drug, acts on the organism's phenotype via two influences: 1) How well the drug can affect the target itself through effective binding of the drug to the target protein and its effect on the protein activity. This effectiveness is described by the elasticity ${\displaystyle \varepsilon _{m}^{i}}$  and 2) How well do modifications of the target influence the phenotype by transmission of the perturbation to the rest of the network. This is indicated by the control coefficient ${\displaystyle C_{i}^{X}}$ .

A drug action, or any external factor, is most effective when both these factors are strong. For example, a drug might be very effective at changing the activity of its target protein, however if that perturbation in protein activity is unable to be transmitted to the final phenotype then the effectiveness of the drug is greatly diminished.

If a drug or external factor, ${\displaystyle m}$ , targets multiple sites of action, for example ${\displaystyle n}$  sites, then the overall response in a phenotypic factor ${\displaystyle X}$ , is the sum of the individual responses:

${\displaystyle R_{m}^{X}=\sum _{i=1}^{n}C_{i}^{X}\varepsilon _{m}^{i}}$ 

It is possible to combine the summation with the connectivity theorems to obtain closed expressions that relate the control coefficients to the elasticity coefficients. For example, consider the simplest non-trivial pathway:

${\displaystyle X_{o}\rightarrow S\rightarrow X_{1}}$ 

We assume that ${\displaystyle X_{o}}$  and ${\displaystyle X_{1}}$  are fixed boundary species so that the pathway can reach a steady state. Let the first step have a rate ${\displaystyle v_{1}}$  and the second step ${\displaystyle v_{2}}$ . Focusing on the flux control coefficients, we can write one summation and one connectivity theorem for this simple pathway:

${\displaystyle C_{v_{1}}^{J}+C_{v_{2}}^{J}=1}$ 

${\displaystyle C_{v_{1}}^{J}\varepsilon _{s}^{v_{1}}+C_{v_{2}}^{J}\varepsilon _{s}^{v_{2}}=0}$ 

Using these two equations we can solve for the flux control coefficients to yield

${\displaystyle C_{v_{1}}^{J}={\frac {\varepsilon _{s}^{2}}{\varepsilon _{s}^{2}-\varepsilon _{s}^{1}}}}$ 

${\displaystyle C_{v_{2}}^{J}={\frac {-\varepsilon _{s}^{1}}{\varepsilon _{s}^{2}-\varepsilon _{s}^{1}}}}$ 

Using these equations we can look at some simple extreme behaviors. For example, let us assume that the first step is completely insensitive to its product (i.e. not reacting with it), S, then ${\displaystyle \varepsilon _{s}^{v_{1}}=0}$ . In this case, the control coefficients reduce to

${\displaystyle C_{v_{1}}^{J}=1}$ 

${\displaystyle C_{v_{2}}^{J}=0}$ 

That is all the control (or sensitivity) is on the first step. This situation represents the classic rate-limiting step that is frequently mentioned in textbooks. The flux through the pathway is completely dependent on the first step. Under these conditions, no other step in the pathway can affect the flux. The effect is however dependent on the complete insensitivity of the first step to its product. Such a situation is likely to be rare in real pathways. In fact the classic rate limiting step has almost never been observed experimentally. Instead, a range of limitingness is observed, with some steps having more limitingness (control) than others.

We can also derive the concentration control coefficients for the simple two step pathway:

${\displaystyle C_{v_{1}}^{s}={\frac {1}{\varepsilon _{s}^{2}-\varepsilon _{s}^{1}}}}$ 

${\displaystyle C_{v_{2}}^{s}={\frac {-1}{\varepsilon _{s}^{2}-\varepsilon _{s}^{1}}}}$ 

Consider the simple three step pathway:

${\displaystyle X_{o}\rightarrow S_{1}\rightarrow S_{2}\rightarrow X_{1}}$ 

where ${\displaystyle X_{o}}$  and ${\displaystyle X_{1}}$  are fixed boundary species, the control equations for this pathway can be derived in a similar manner to the simple two step pathway although it is somewhat more tedious.

${\displaystyle C_{e_{1}}^{J}=\varepsilon _{1}^{2}\varepsilon _{2}^{3}/D}$ 

${\displaystyle C_{e_{2}}^{J}=-\varepsilon _{1}^{1}\varepsilon _{2}^{3}/D}$ 

${\displaystyle C_{e_{3}}^{J}=\varepsilon _{1}^{1}\varepsilon _{2}^{2}/D}$ 

where D the denominator is given by

${\displaystyle D=\varepsilon _{1}^{2}\varepsilon _{2}^{3}-\varepsilon _{1}^{1}\varepsilon _{2}^{3}+\varepsilon _{1}^{1}\varepsilon _{2}^{2}}$ 

Note that every term in the numerator appears in the denominator, this ensures that the flux control coefficient summation theorem is satisfied.

Likewise the concentration control coefficients can also be derived, for ${\displaystyle S_{1}}$ 

${\displaystyle C_{e_{1}}^{S_{1}}=(\varepsilon _{2}^{3}-\varepsilon _{2}^{2})/D}$ 

${\displaystyle C_{e_{2}}^{S_{1}}=-\varepsilon _{2}^{3}/D}$ 

${\displaystyle C_{e_{3}}^{S_{1}}=\varepsilon _{2}^{2}/D}$ 

And for ${\displaystyle S_{2}}$ 

${\displaystyle C_{e_{1}}^{S_{2}}=\varepsilon _{1}^{2}/D}$ 

${\displaystyle C_{e_{2}}^{S_{2}}=-\varepsilon _{1}^{1}/D}$ 

${\displaystyle C_{e_{3}}^{S_{2}}=(\varepsilon _{1}^{1}-\varepsilon _{1}^{2})/D}$ 

Note that the denominators remain the same as before and behave as a normalizing factor.

Control equations can also be derived by considering the effect of perturbations on the system. Consider that reaction rates ${\displaystyle v_{1}}$  and ${\displaystyle v_{2}}$  are determined by two enzymes ${\displaystyle e_{1}}$  and ${\displaystyle e_{2}}$  respectively. Changing either enzyme will result in a change to the steady state level of ${\displaystyle x}$  and the steady state reaction rates ${\displaystyle v}$ . Consider a small change in ${\displaystyle e_{1}}$  of magnitude ${\displaystyle \delta e_{1}}$ . This will have a number of effects, it will increase ${\displaystyle v_{1}}$  which in turn will increase ${\displaystyle x}$  which in turn will increase ${\displaystyle v_{2}}$ . Eventually the system will settle to a new steady state. We can describe these changes by focusing on the change in ${\displaystyle v_{1}}$  and ${\displaystyle v_{2}}$ . The change in ${\displaystyle v_{2}}$ , which we designate ${\displaystyle \delta v_{2}}$ , came about as a result of the change ${\displaystyle \delta x}$ . Because we are only considering small changes we can express the change ${\displaystyle \delta v_{2}}$  in terms of ${\displaystyle \delta x}$  using the relation

${\displaystyle \delta v_{2}={\frac {\partial v_{2}}{\partial x}}\delta x}$ 

where the derivative ${\displaystyle \partial v_{2}/\partial x}$  measures how responsive ${\displaystyle v_{2}}$  is to changes in ${\displaystyle x}$ . The derivative can be computed if we know the rate law for ${\displaystyle v_{2}}$ . For example, if we assume that the rate law is ${\displaystyle v_{2}=k_{2}x}$  then the derivative is ${\displaystyle k_{2}}$ . We can also use a similar strategy to compute the change in ${\displaystyle v_{1}}$  as a result of the change ${\displaystyle \delta e_{1}}$ . This time the change in ${\displaystyle v_{1}}$  is a result of two changes, the change in ${\displaystyle e_{1}}$  itself and the change in ${\displaystyle x}$ . We can express these changes by summing the two individual contributions:

${\displaystyle \delta v_{1}={\frac {\partial v_{1}}{\partial e_{1}}}\delta e_{1}+{\frac {\partial v_{1}}{\partial x}}\delta x}$ 

We have two equations, one describing the change in ${\displaystyle v_{1}}$  and the other in ${\displaystyle v_{2}}$ . Because we allowed the system to settle to a new steady state we can also state that the change in reaction rates must be the same (otherwise it wouldn't be at steady state). That is we can assert that ${\displaystyle \delta v_{1}=\delta v_{2}}$ . With this in mind we equate the two equations and write

${\displaystyle {\frac {\partial v_{2}}{\partial x}}\delta x={\frac {\partial v_{1}}{\partial e_{1}}}\delta e_{1}+{\frac {\partial v_{1}}{\partial x}}\delta x}$ 

Solving for the ratio ${\displaystyle \delta x/\delta e_{1}}$  we obtain:

${\displaystyle {\frac {\delta x}{\delta e_{1}}}={\dfrac {-{\dfrac {\partial v_{1}}{\partial e_{1}}}}{{\dfrac {\partial v_{2}}{\partial x}}-{\dfrac {\partial v_{1}}{\partial x}}}}}$ 

In the limit, as we make the change ${\displaystyle \delta e_{1}}$  smaller and smaller, the left-hand side converges to the derivative ${\displaystyle dx/de_{1}}$ :

${\displaystyle \lim _{\delta e_{1}\rightarrow 0}{\frac {\delta x}{\delta e_{1}}}={\frac {dx}{de_{1}}}={\dfrac {-{\dfrac {\partial v_{1}}{\partial e_{1}}}}{{\dfrac {\partial v_{2}}{\partial x}}-{\dfrac {\partial v_{1}}{\partial x}}}}}$ 

We can go one step further and scale the derivatives to eliminate units. Multiplying both sides by ${\displaystyle e_{1}}$  and dividing both sides by ${\displaystyle x}$  yields the scaled derivatives:

${\displaystyle {\frac {dx}{de_{1}}}{\frac {e_{1}}{x}}={\frac {-{\dfrac {\partial v_{1}}{\partial e_{1}}}{\dfrac {e_{1}}{v_{1}}}}{{\dfrac {\partial v_{2}}{\partial x}}{\dfrac {x}{v_{2}}}-{\dfrac {\partial v_{1}}{\partial x}}{\dfrac {x}{v_{1}}}}}}$ 

The scaled derivatives on the right-hand side are the elasticities, ${\displaystyle \varepsilon _{x}^{v}}$  and the scaled left-hand term is the scaled sensitivity coefficient or concentration control coefficient, ${\displaystyle C_{e}^{x}}$ 

${\displaystyle C_{e_{1}}^{x}={\frac {\varepsilon _{e_{1}}^{1}}{\varepsilon _{x}^{2}-\varepsilon _{x}^{1}}}}$ 

We can simplify this expression further. The reaction rate ${\displaystyle v_{1}}$  is usually a linear function of ${\displaystyle e_{1}}$ . For example, in the Briggs–Haldane equation, the reaction rate is given by ${\displaystyle v=e_{1}k_{cat}x/(K_{m}+x)}$ . Differentiating this rate law with respect to ${\displaystyle e_{1}}$  and scaling yields ${\displaystyle \varepsilon _{e_{1}}^{v_{1}}=1}$ .

Using this result gives:

${\displaystyle C_{e_{1}}^{x}={\frac {1}{\varepsilon _{x}^{2}-\varepsilon _{x}^{1}}}}$ 

A similar analysis can be done where ${\displaystyle e_{2}}$  is perturbed. In this case we obtain the sensitivity of ${\displaystyle x}$  with respect to ${\displaystyle e_{2}}$ :

${\displaystyle C_{e_{2}}^{x}=-{\frac {1}{\varepsilon _{x}^{2}-\varepsilon _{x}^{1}}}}$ 

The above expressions measure how much enzymes ${\displaystyle e_{1}}$  and ${\displaystyle e_{2}}$  control the steady state concentration of intermediate ${\displaystyle x}$ . We can also consider how the steady state reaction rates ${\displaystyle v_{1}}$  and ${\displaystyle v_{2}}$  are affected by perturbations in ${\displaystyle e_{1}}$  and ${\displaystyle e_{2}}$ . This is often of importance to metabolic engineers who are interested in increasing rates of production. At steady state the reaction rates are often called the fluxes and abbreviated to ${\displaystyle J_{1}}$  and ${\displaystyle J_{2}}$ . For a linear pathway such as this example, both fluxes are equal at steady-state so that the flux through the pathway is simply referred to as ${\displaystyle J}$ . Expressing the change in flux as a result of a perturbation in ${\displaystyle e_{1}}$  and taking the limit as before we obtain

${\displaystyle C_{e_{1}}^{J}={\frac {\varepsilon _{x}^{1}}{\varepsilon _{x}^{2}-\varepsilon _{x}^{1}}},\quad C_{e_{2}}^{J}={\frac {-\varepsilon _{x}^{1}}{\varepsilon _{x}^{2}-\varepsilon _{x}^{1}}}}$ 

The above expressions tell us how much enzymes ${\displaystyle e_{1}}$  and ${\displaystyle e_{2}}$  control the steady state flux. The key point here is that changes in enzyme concentration, or equivalently the enzyme activity, must be brought about by an external action.

The control equations can also be derived in a more rigorous fashion using the systems equation:

${\displaystyle {\dfrac {\bf {dx}}{dt}}={\bf {N}}{\bf {v}}({\bf {x}}(p),p)}$ 

where ${\displaystyle {\bf {N}}}$  is the stoichiometry matrix, ${\displaystyle {\bf {x}}}$  is a vector of chemical species, and ${\displaystyle {\bf {p}}}$  is a vector of parameters (or inputs) that can influence the system. In metabolic control analysis the key parameters are the enzyme concentrations. This approach was popularized by Heinrich, Rapoport, and Rapoport^[16] and Reder and Mazat.^[17] A detailed discussion of this approach can be found in Heinrich & Schuster^[18] and Hofmeyr.^[19]

A linear biochemical pathway is a chain of enzyme-catalyzed reaction steps. The figure below shows a three step pathway, with intermediates, ${\displaystyle S_{1}}$  and ${\displaystyle S_{2}}$ . In order to sustain a steady-state, the boundary species ${\displaystyle X_{o}}$  and ${\displaystyle X_{1}}$  are fixed.

At steady-state the rate of reaction is the same at each step. This means there is an overall flux from X_o to X_1.

Linear pathways possess some well-known properties:^[20][21][22]

1. Flux control is biased towards the first few steps of the pathway. Flux control shifts more to the first step as the equilibrium constants become large.
2. Flux control is small at reactions close to equilibrium.
3. Assuming reversibly, flux control at a given step is proportional to the product of the equilibrium constants. For example, flux control at the second step in a three step pathway is proportional to the product of the second and third equilibrium constants.

In all cases, a rationale for these behaviors is given in terms of how elasticities transmit changes through a pathway.

There are a number of software tools that can directly compute elasticities and control coefficients:

• COPASI (GUI)
• PySCeS^[23] (Python)
• SBW^[24] (GUI)
• libroadrunner^[25] (Python)
• VCell

Classical Control theory is a field of mathematics that deals with the control of dynamical systems in engineered processes and machines. In 2004 Brian Ingalls published a paper^[26] that showed that classical control theory and metabolic control analysis were identical. The only difference was that metabolic control analysis was confined to zero frequency responses when cast in the frequency domain whereas classical control theory imposes no such restriction. The other significant difference is that classical control theory^[27] has no notion of stoichiometry and conservation of mass which makes it more cumbersome to use but also means it fails to recognize the structural properties inherent in stoichiometric networks which provide useful biological insights.

• Branched pathways
• Biochemical systems theory
• Control coefficient (biochemistry)
• Flux (metabolism)
• Moiety conservation
• Rate-limiting step (biochemistry)

• The Metabolic Control Analysis Web