Linear pathway: minimal model.

To elucidate the main findings of our mathematical analysis, we first consider a minimal metabolic circuit (Fig. 1A) in which an input flux of magnitude leads to growth at rate via one metabolite with pool size . This analysis, while somewhat redundant with prior careful treatments of linear pathways [27], [28], lays out the nomenclature and logic that will be used subsequently for the other modules, where the conclusions are less immediately apparent. For our purpose, we include no intermediates in the linear pathway. The lack of intermediates in the pathway is equivalent to one of the steps of the linear pathway being rate limiting for product formation. In general, input fluxes are limited by nutrient availability, transport, and catabolism, all lumped here into an inequality constraint . This is an unbranched pathway and thus, at steady-state and assuming no futile cycling, the input flux should equal the efflux leading to growth (e.g., the pathway could make an amino acid, with the efflux being its consumption by protein synthesis leading to growth). The input flux and efflux should both accordingly be proportional to growth rate. Assuming all other components required for growth are freely available, the optimal flux-balance growth rate would be set by the maximum input flux , where reflects the stoichiometry between the input flux and growth rate. As is merely a scaling factor, in all future equations we set it to for simplicity. When the maximum input flux become sufficiently high, then growth rate becomes limited by other factors (e.g. other factors in growth medium used to culture cells), never exceeding some maximum . Thus, the optimal flux-balance growth increases linearly with the input flux until it reaches the maximum growth rate (gray curve in Fig. 1B). In general, to calculate the FBA growth rate one maximizes the steady-state growth rate consistent with the stoichiometric and linear constraints on the various input, output, and internal fluxes.

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Figure 1. Analysis of metabolic modules: (A) minimal linear pathway and (D) bidirectional pathway, two different regulation schemes are considered – Min-FI scheme: feedbacks only on the input nutrient fluxes (dashed lines), and Full-FI scheme: feedbacks on all the fluxes.

(B,C) Results for linear pathway from Eq. 3: (B) , the optimal growth rate given by flux-balance analysis (FBA) (gray curve), and growth rate as a function of (solid and dashed curves). (C) Metabolite pool size as a function of . The parameters for numerical solutions are (solid curves) and (dashed curves). (E,F) Results for bidirectional pathway from Eq. 5: (E) (gray curve), and growth rate as a function of (solid, dotted, and dashed curves). (F) Metabolite pool sizes and as a function of . The parameters for FBA and numerical solutions: the maximum input flux, , the maximum interconversion flux, , for the Min-FI scheme, (solid curves) and (dashed curves), and for the Full-FI scheme, (dotted curves).

https://doi.org/10.1371/journal.pcbi.1000802.g001

To go beyond FBA and explicitly consider the regulation of fluxes, we assume product-feedback inhibition acts on the input flux such that(1)where is a Hill coefficient and is an inhibition constant. Since the feedback could also be transcriptional, more generally can be interpreted as an effective inhibition constant and as an effective Hill coefficient. models simple feedback inhibition, while represents ultrasensitive feedback inhibition. Note that Eq. 1 always satisfies the linear constraint .

In our simple linear pathway model, the growth rate depends exclusively on the size of the metabolite pool . In general, the growth rate as a function of the pool sizes of essential metabolites should satisfy the following constraints: is a monotonically increasing function of each pool, approaches zero if any pool approaches zero, and becomes asymptotically independent of each pool above a certain saturating pool size . Throughout this work, we use as a growth-rate function(2)which satisfies the above constraints. This function was obtained as the growth rate of a heteropolymer made from equal stoichiometries of monomers with pool sizes [29]. A pool is called “growth limiting” if .

Combining Eqs. 1 and 2 (with ) we obtain the kinetic equation for the metabolite pool ,(3)The steady-state metabolite-pool size is obtained by setting the above time derivative to zero, and the growth rate is then calculated using Eq. 2. Intuitively, as long as input flux is limiting for growth (), feedback inhibition should be inactive so that there is no reduction of the flow of nutrients into the cell. Therefore, the feedback-inhibition system should be designed such that the feedback remains minimal until , i.e. until the ability to produce metabolite exceeds demand for it. This design can be achieved by choosing parameters in Eq. 3 such that a much larger metabolite pool is required for significant feedback inhibition than is required for saturated growth, that is by choosing . Indeed, the growth rate approaches its optimum as the feedback-inhibition constant increases (see Text S1). As expected, a large feedback-inhibition constant, , is advantageous for maximizing production of and thus growth rate in the regime where metabolite is growth-limiting.

However, there is a trade-off between the growth rate and the metabolite-pool size (Fig. 1C). For non-cooperative feedback (), the steady-state pool size is given by(4)In the asymptotic limit of small input flux, (-limited regime), the resulting pool size is small, , but in the asymptotic limit of large input flux, (-limited regime), the pool size becomes large, , and continues to grow with increasing . Importantly, in this -limited regime, the pool size is proportional to the feedback-inhibition constant . Therefore, while large values of yield nearly optimal growth rates, they also lead to very high metabolite-pool sizes in the -limited regime. (Note that for , i.e. in the absence of feedback inhibition, there is no steady-state solution of Eq. 3 for and the pool size grows without limit. In reality, other processes, e.g. leakage, degradation, or constraints, e.g. thermodynamics [11], may limit steady-state intracellular metabolite-pool sizes).

Cooperative or ultrasensitive feedback () can restrict the metabolite-pool size without sacrificing growth rate. In the -limited regime, ultrasensitive feedback leads to a sub linear increase of pool size as increases, . In addition, in the -limited regime ultrasensitive feedback significantly decreases the growth-rate deficit, , for a given value of , . Intuitively, for a given small pool size , a higher Hill coefficient means weaker feedback inhibition thereby allowing more input flux and thus a higher growth rate. Consequently, for a higher Hill coefficient, a smaller inhibition constant is enough to achieve a similar growth rate. Therefore, for a given growth-rate deficit , increasing the Hill coefficient substantially reduces the metabolite-pool size in the -limited regime, , as shown for in Fig. 1B,C. Note that in Fig. 1B,C we chose feedback constants such that the resulting growth-rate is similar for the two Hill coefficients .

Simple feedback regulation without ultrasensitivity has two important features: (1) simple product-feedback inhibition is enough to approach the optimal flux-balance growth rate, and (2) metabolite-pool sizes are small when growth limiting but become large when not growth limiting. These large non-growth-limiting metabolite pools can be restricted by more complex ultrasensitive feedback regulation. We test the generality of these features for various metabolic modules drawn from real metabolism.

Bidirectional pathway.

Bidirectional pathways, such as glycolysis/gluconeogenesis, are used for switching between different nutrient sources, e.g. glucose (a 6-carbon unit) and lactate (a 3-carbon unit). At the heart of these bidirectional pathways are metabolites that are linked by two different enzymatic reactions (or pathways) of differing energetics due to different cofactor requirements, e.g. fructose-6-phosphate and fructose-1,6-bisphosphate, linked by phosphofructokinase in glycolysis and fructose-bisphosphatase in gluconeogenesis. Since these interconversions may allow cycling, limiting futile cycles between these metabolites is essential for achieving optimal growth.

Here we consider a simple module of two interconverting metabolites shown in Fig. 1D. The module has two input nutrient fluxes, and , representing different sources for the same elemental nutrient (e.g. glucose and lactate for carbon), feeding into their respective intermediate metabolite pools and . The metabolite pools can interconvert, albeit at a cost: two molecules of make one molecule of and vice versa, making futile cycling wasteful of nutrients. (For mass balance and thermodynamic consistency a low-energy waste product has to be released in each such reaction.) The interconversion fluxes between and are represented by and , with the order of indices indicating the direction of conversion. We further assume that both metabolite pools and are required for growth with equal stoichiometry.

Limited availability of interconversion enzymes is modeled by the constraint on the interconversion fluxes (the same constraint is used for both fluxes for simplicity). Depending on these constraints and on the maximum input fluxes, and , the optimal flux-balance growth rate will be limited either by the input nutrient fluxes, by the interconversion fluxes, or by the maximum growth rate . For smaller input flux into metabolite , , the optimal flux is non-zero, , while the optimal flux remains zero to avoid futile cycling, . As increases so that , the interconversion is reversed with flux going from . As increases further, is limited either by the maximum interconversion flux or by . In the case when limits growth, is just high enough to maximize the interconversion flux . In Fig. 1E, we chose flux constraints that result in being limited by for high (gray lines). In all cases, the maximum growth rate is achieved by eliminating futile cycling, i.e. at least one of the interconversion fluxes is zero.

We compare two different regulatory schemes for this module. The simpler of the two schemes, minimal product-feedback inhibition (Min-FI) assumes feedbacks only on the input nutrient fluxes (the minimum number of feedbacks required to have a stable-steady state solution), while full product-feedback inhibition (Full-FI) assumes feedbacks on all the fluxes. Full-FI yields the following kinetic equations for the metabolite pools and ,(5)where is a Hill coefficient (assumed for simplicity to be the same for all feedbacks), the , with , are feedback-inhibition constants, the , with , are Michaelis-Menten constants for the enzyme-substrate complexes, the exponent 2 on models the stoichiometry of the reactions: , and the growth rate is given by Eq. 2. Note that the presence of the additional feedback terms in the Full-FI scheme (given in square brackets) makes the interconversion flux depend on a ratio of the two pool sizes, , resulting in tight control of the interconversion fluxes (see below).

To achieve optimal growth, the feedback-inhibition constants are chosen according to the logic of flux-balance analysis, i.e. to avoid futile cycling while allowing adequate flux from non-growth-limiting metabolite pool to growth-limiting metabolite pool. To avoid futile cycling, the interconversion flux should preferentially flow from the non-growth limiting pool to the growth-limiting pool. This is achieved by choosing the Michaelis-Menten constant for each outgoing interconversion flux to be much larger than the growth-saturating substrate pool size, e.g. . Availability of adequate input flux is accomplished by choosing the feedback constant, , from each pool on its input flux to be much larger than the Michaelis-Menten constant, for that pool's outgoing interconversion flux, e.g. .

Numerical solutions for the steady-state growth rate and metabolite-pool sizes for the two alternative regulatory schemes are shown in Fig. 1E,F. For simplicity, we have chosen parameters to make the network symmetric with respect to the two metabolites. The growth-rate deficit and the metabolite pools for the Min-FI scheme follow the same trends seen in the linear pathway: the growth-rate deficit decreases as the magnitudes of feedback constants increase, the two metabolite-pool sizes switch between being small () when growth-limiting and large () when non-growth-limiting, and the size of non-growth-limiting pool is significantly restricted by high () Hill coefficients. Furthermore, we find that the additional feedbacks in the Full-FI scheme better restrict the pool sizes than the Min-FI scheme, for .

Metabolic cycle.

Organisms metabolize some nutrients using metabolic cycles, e.g. the TCA cycle in carbon metabolism. A metabolic cycle is a wrapped linear pathway where the end product is essential for the first step of the pathway. Consequently, the import of nutrients is slowed or stopped if there is not enough end product available. Therefore, an adequate pool of the end product must always be maintained in order to achieve optimal growth. Here we analyze a module based on the two-intermediate glutamine-glutamate nitrogen-assimilation cycle. In this cycle, ammonium (NH) is combined with glutamate (E) to form glutamine (Q), which in turn can be combined with -ketoglutarate to yield two molecules of glutamate.

The cyclic module considered here is shown in Fig. 2A. The input nitrogen flux combines stoichiometrically with glutamate, with pool size , to make glutamine, with pool size . Glutamine yields two molecules of glutamate with flux , up to a maximum , thereby completing the nitrogen assimilation cycle. We assume that both glutamine and glutamate are utilized for growth but with unequal stoichiometries, [30]. We also include the flux into glutamate from glutamine-dependent biosynthetic reactions, since these typically yield a glutamate molecule.

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Figure 2. Analysis of metabolic modules: (A) metabolic cycle and (D) module for integrating carbon and nitrogen inputs.

(B,C) Results for metabolic cycle module from Eq. 6: (B) , the optimal growth rate given by flux-balance analysis (FBA) (gray curve), and growth rate as a function of (solid and dashed curves). (C) Metabolite pool sizes and as a function of . The parameters for FBA and numerical solutions: flux, , , (solid curves), and , (dashed curves). In all cases, the stoichiometry factors are [30], consistent with the relative usage of glutamine and glutamate during growth. (E,F) Results for nutrient-integration module from Eq. 7: (E) (gray curve), and growth rate as a function of (solid and dashed curves). (F) Metabolite pool sizes and as a function of . The parameters for FBA and numerical solutions: the maximum nitrogen fluxes, , (solid curves), and (dashed curves).

https://doi.org/10.1371/journal.pcbi.1000802.g002

The optimal flux-balance growth rate depends on the maximum input flux, , and the maximum conversion flux, , along with the maximum growth rate, . At low , the flux-balance growth rate is proportional to the maximum input flux, (-limited). As increases, the growth rate may be limited by the conversion flux, (-limited), or by the maximum growth rate, (-limited). In Fig. 2B we chose flux constraints that result in a -limited regime for high (gray lines).

As in the previous case, we compare different regulatory schemes for this module. The Min-FI schemes have only one feedback on the input flux from either glutamate or glutamine. In the Full-FI scheme, there is product-feedback inhibition of both the input flux and the conversion flux of glutamine (Q) to glutamate (E). The kinetic equations for the the Full-FI scheme are(6)where is a Hill coefficient (assumed for simplicity to be the same for all feedbacks), the , with are feedback-inhibition constants, the , with , are Michaelis-Menten constants for the enzyme-substrate complexes (the order of indices indicates the direction of conversion), and the growth rate is given by Eq. 2. The kinetic equations for the Min-FI scheme with feedback on the input flux from glutamine can be recovered by dropping the terms in square brackets in Eqs. 6, and the kinetic equations for the Min-FI scheme with feedback from glutamate can then be obtained by substituting in the feedback on the input flux.

Interestingly, we find that neither of the two Min-FI schemes yield steady-state solutions that are stable in all of the three regimes: -, -, and non-nutrient limited. In particular, stability in one regime can be guaranteed by a particular choice of Michaelis-Menten and feedback constants, but the same parameters lead to instability (one pool growing without bound or shrinking to zero) in one of the other regimes. We conclude that the metabolic cycle requires two feedbacks to assure stability, even though there is only one primary nutrient input.

For the two-feedback Full-FI scheme, to maximize the growth rate in the -limited regime, the glutamate pool should always be saturating for the nitrogen-assimilation reaction (EQ) so that nitrogen import is maximized. This is achieved by choosing a small Michaelis-Menten constant, . For the -limited regime, achieving optimal growth only requires . Interestingly, the Michaelis-Menten constant for the glutamine to glutamate reaction controls the relative levels of glutamate and glutamine. In Fig. 2B,C, we chose to yield results consistent with nitrogen-upshift experiments (see Text S1 and [25]).

The numerical solution of the kinetic equations for the Full-FI scheme (Fig. 2A) shows that the growth-rate deficit decreases as the magnitudes of feedback-inhibition constants increase and the metabolite pools are significantly reduced by high Hill coefficients. However, even though there is only one primary nutrient input like the linear pathway, the metabolic cycle requires two feedbacks to assure a stable steady state.

Integrating carbon and nitrogen inputs: partitioning of carbon into biomass and energy.

Microorganisms integrate various nutrients to produce biomass. Since carbon sources (e.g. glucose, glycerol) are used for both biomass and energy, optimal partitioning of the carbon flux is essential for optimal growth. Here, we consider a simple module that integerates carbon and nitrogen fluxes. In E. coli, nitrogen in the form of ammonium (NH) is assimilated into biomass via two pathways [31]. In the reaction catalyzed by glutamate dehydrogenase (GDH), NH is assimilated directly into glutamate. Alternatively, in an energy-rich environment, glutamine synthetase/glutamate synthase (GS/GOGAT) form an assimilatory cycle, with NH first assimilated into glutamine. This ATP-energy-dependent cycle is essential for nitrogen-limited growth of cells [31].

The metabolic module shown in Fig. 2D integrates two elemental nutrients, carbon (C) and nitrogen (N). The module has one input carbon flux and two input nitrogen fluxes and feeding into their respective intermediate metabolite pools with sizes and . The input pathways are coupled by the carbon-dependent nitrogen flux, , representing the GS/GOGAT cycle, which requires ATP (produced by catabolism of carbon) to import nitrogen (Fig. 2D). The other nitrogen flux, , representing the ATP-independent GDH pathway, is modeled as being uncoupled from carbon metabolism (note that, in reality, both nitrogen import fluxes require also the carbon skeleton -ketoglutarate). We further assume that both (carbon metabolites) and (nitrogen metabolites) are required for growth and are utilized with equal stoichiometry. Thus, proper partitioning of the carbon flux between biomass and energy for importing nitrogen is essential for achieving optimal flux-balance growth rate.

Depending on the constraints on the input fluxes: , , , and the maximum growth rate , the optimal flux-balance growth will be limited by either or both input nutrient fluxes or by (gray curve in Fig. 2E). For small values of the maximum carbon flux, carbon will be limiting. In this regime, the carbon-dependent nitrogen flux remains zero, , and the carbon-independent nitrogen flux stoichiometrically matches the input carbon flux, . As the maximum carbon flux increases, growth becomes limited by both nitrogen and carbon – some of the carbon flux is partitioned to energy to augment the nitrogen flux. In this regime, the carbon-dependent nitrogen flux is greater than zero , while the carbon-independent nitrogen flux is at its maximum . As the maximum carbon flux increases further, the growth is either limited by nitrogen availability or by (see Text S1). In Fig. 2E we chose flux constraints that result in -limited growth for high maximum carbon flux .

Like previous modules, we assume product-feedback inhibition of all the input fluxes (Fig. 2D). This yields the following kinetic equations for the metabolite-pool sizes and ,(7)where , with , are feedback-inhibition constants, and the growth rate is given by Eq. 2. The carbon-dependent nitrogen flux is assumed to be unconstrained by the pool size of carbon metabolites , i.e. the affinity of the reaction for its energy substrate (ATP) is assumed to be high. The auto-regulatory negative feedbacks in the regulation scheme ensure a stable steady state.

To achieve optimal growth, the feedback-inhibition constants are chosen according to the logic of flux-balance analysis, i.e. the carbon-dependent nitrogen flux is turned on only after the carbon-independent nitrogen flux reaches its maximum. This is accomplished by choosing .

The kinetic equations (7) are readily solved numerically for the steady-state growth rate and metabolite-pool sizes (Fig. 2E,F). As for the linear pathway, the growth-rate deficit decreases as the magnitudes of the feedback constants increase. The growth-limiting metabolite pool remains small () while the non-growth-limiting pool becomes large () and continues to grow as its input flux increases. A metabolite pool can switch from being growth-limiting to non-growth-limiting with changes in the available input fluxes . For example, in the carbon-limited regime, is of the order while is of the order or larger (Fig. 2F). In contrast, in the nitrogen-limited regime this behavior is reversed with, and or larger. Since the carbon-derived product ATP can be used to import nitrogen, there is also a regime where both carbon and nitrogen metabolite pools are growth limiting and thus small, . On the other hand, in the -limited regime neither the carbon nor the nitrogen metabolite pool is growth limiting, consequently both pools are large () and continue to grow as their maximum input fluxes increase.

In experiments, it has been shown that the ATP-independent GDH pathway is preferred under glucose-limited growth [32], [33], which is also consistent with the optimal FBA behavior that we find in our nutrient-integration module. Furthermore, when both carbon and nitrogen are available in excess, the ATP-independent GDH pathway is largely inactive, corresponding to [34]. Consistent with this observation, in the -limited regime of the model, a reduction of still allows for optimal growth.

The results show that simple product-feedback inhibition is sufficient to achieve the optimal flux-balance growth rate in all regimes. As for the other modules considered, larger feedback-inhibition constants improve growth rate but result in large pools of non-growth-limiting metabolites. Increasing the Hill coefficients of the feedbacks restricts pool sizes and simultaneously reduces the growth-rate deficits.