The toolbox model on a tree-like universal network: General mathematical description

We will first consider the case where the universal metabolic network is a directed tree. For simplicity in this section we will consider the case of catabolic pathways, while identical arguments (albeit with opposite direction of all reactions) apply to anabolic pathways. The root of the tree corresponds to the central metabolic core of the organism responsible for biomass production. Peripheral catabolic pathways (branches of the tree) convert external nutrients (leaves) to this core, while the internal nodes of the tree represent intermediate metabolites. Each of metabolites is characterized by its distance from the root of the network. The universal network has metabolites at distance from the root that included leaves (nutrients used in the first step of catabolic pathways) and branching points corresponding to intermediate metabolites generated by more than one metabolic reaction at the next level (see Figure 1). An organism-specific network (filled circles and thick edges in Figure 1) at distance from the root contains metabolites composed of leaves, branching points, and metabolites inside linear branches (“one reaction in-one reaction out”) . For simplicity we assume that in the universal network (and thus also in any of its organism-specific subnetworks) no more than two reaction edges can combine at any node (metabolite), while the most general case of an arbitrary distribution of branching numbers can be treated in a very similar fashion.

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Figure 1. An example of organism-specific metabolic network and the corresponding universal network.

The organism-specific metabolic network (filled circles and thick edges) is always a subset of the universal network (the entire tree). Nodes are divided into layers based on their distance from the root of the tree. Variables , , for the universal network and , , for species-specific network are illustrated using the layer as an example.

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The toolbox model specifies rules by which organism acquires new pathways in the course of its evolution. It consists of the following steps: 1) randomly pick a new nutrient metabolite (a leaf node of the universal network that currently does not belong to the metabolic network of the organism) 2) use the universal network to identify the unique linear pathway which connects the new nutrient to the root of the tree (the metabolic core) and finally 3) add the reactions and intermediate metabolites in the new pathway to the metabolic network of the organism (filled circles and thick edges in Figure 1). One needs to only add those enzymes that are not yet present in the “genome” of the organism. Graphically it means that the new branch of the universal network is extended until it first intersects the existing metabolic network of the organism.

Consider an organism capable of utilizing nutrients represented by leaves in the universal network, where and . Since we assume that each nutrient utilization pathway is controlled by a dedicated transcriptional regulator sensing its presence or absence in the environment (e.g. LacR for lactose), the corresponding regulatory network would also have transcription factors (in the model we ignore transcription factors controlling non-metabolic functions). The non-regulatory part of the genome consists of enzymes catalyzing metabolic reactions (strictly speaking is the number of metabolites/nodes so that the number of enzymes/edges is ). Quadratic scaling plots [1] shows the number of transcriptional regulators vs. the total number of genes in the genome (both regulatory and non-regulatory) . However, since in all organism-specific networks N_M ≫ N_L, the quadratic scaling between and is equivalent to .

We further assume that due to random selection nutrients are expected to be uniformly distributed among all d levels. Therefore, the expected number of leaves at a given level is given by where the fraction is the same at all levels. On the other hand the fraction varies from level to level. It usually tends to increase as one gets closer towards the root of the tree reaching 1 for d = 0 (the root node itself). To derive the equation for , one first notices that each of metabolites at level is converted to another intermediate metabolite at level . Due to merging of pathways at branching points the number of unique intermediate metabolites at the level is actually smaller: . To calculate one uses the fact that each of the two nodes downstream of a branching point in the universal network is present in the organism-specific network with probability . The probability that they are both present is and thus the number of branching points at level of the organism-specific metabolic network is . The intermediate metabolites together with new nutrients entering at the level add up to the total number of metabolites at level : (1)

This equation allows one to iteratively calculate for all d starting from . We will use this equation to derive the relationship between the number of leaves and the total number of nodes first for a critical branching tree and then for a supercritical one.

The toolbox model on a critical tree

The Galton-Watson branching process [3] is a simple stochastic process generating random trees, and we will consider its version where a node can have two, one, or zero neighbors (parents) at the previous level with probabilities p₂, p₁ and p₀ correspondingly. If the average number of parents equals one, then the process is referred to as critical, and if is greater than one then the process is supercritical. More generally critical and supercritical branching trees can be generated by a variety of random processes such as e.g. directed percolation [4]. While for simplicity we used the Galton-Watson branching process in our derivation below, it can be readily extended to this more general case.

The principal geometric difference between supercritical and critical trees is that in the former case the number of nodes in a layer exponentially grows with [3], while in a critical tree it grows at most algebraically (for the Galton-Watson critical process [3]). The other difference is that while the critical branching process always stops on its own at a certain finite height , a supercritical process will go on forever so that to generate a tree one has to manually terminate it at a predefined layer . The most significant feature of a critical tree is that it has much longer branches than a supercritical one of the same size. Indeed, the diameter (the maximal height) of a random critical tree with nodes is while in a supercritical tree it is much shorter: . Thus supercritical trees (unlike their critical counterparts) have the small world property.

A random critical network where each node has at most has two parents in the previous layer is defined by . Indeed, in this case . In such network and hence the Eq. (1) can be rewritten as (2)

A critical branching process that has not terminated by level d satisfies or . More generally if algebraically increases with , asymptotically approaches 1 as(3)

Here as , thus for remains approximately constant and according to Eq. (2) this constant ratio is defined by (4)

This quadratic relation is exact in a critical branching tree where each node can branch out into at most two nodes at the next layer, and it is still correct to a leading order in for a critical branching tree with arbitrary branching ratios (see “Quadratic relation between and for general critical branching processes” of Text S1). Furthermore, one can show (see “Calculation of the average in the toolbox model on a critical tree” of Text S1) that in large critical networks the overall fraction of metabolites present in organism-specific metabolic network is very close to this stationary limit of : .

As was explained in the previous section the ratio between the total number of metabolic-related genes in the genome of an organism and its theoretical maximal value for a genome containing the entire universal network is also given by . Furthermore, in our model the number of leaves is equal to the number of nutrient-utilizing pathways or, alternatively, their transcriptional regulators . Thus like in a much simpler model of Ref. [2] the toolbox model on any critical tree-like universal network gives rise to quadratic scaling of the number of transcription factors with the total number of genes: (5)

The geometrical properties of the universal network such as its total number of nodes/edges and number of leaves/branches determine the prefactor of this scaling law. Simulation of the toolbox model on the critical tree (Figure 2) verified our mathematical predictions with the best fit to binned datapoints in Figure 2 giving the exponent α = 1.9±0.1.

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Figure 2. vs. .

is the number of leaves in an organism-specific metabolic network and equal to the number of transcriptional regulators of corresponding nutrient-utilizing pathways, while is the total number of nodes/metabolites in this netowrk. The data are generated by the toolbox model on critical universal network with sizes around 2000. Solid line , where the exponent and the prefactor , are the best fits to the binned data.

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The toolbox model on a supercritical tree

For a supercritical branching process and according to Eq. (1) (See SI for the derivation) the steady state value of satisfies (6)

Here and . Notice that for one has two solutions for : and . This indicates transition in which for exactly at zero one has , while for an arbitrary small yet positive the value of asymptotically converges to for . This transition resembles the first order phase transition, e.g., liquid-gas transition, where right at the transition point very small variation of the external parameter such as temperature (analogous to in this model) results in a large jump of the order parameter such as density (analogous to our ). (See [5] for details), The number of layers over which this conversion is taking place is itself a function of and for small it is large. For exponentially growing supercritical networks and for small , the network average value of defined as satisfies (7)

Note that this equation connecting and (see SI for detailed derivation) is markedly different from Eq. (6) for steady state value in middle layers.

In conclusion, while the toolbox model on a critical universal network is characterized by a quadratic scaling between and (see Eq. (4)), the same model on a supercritical, exponentially expanding universal network gives rise to a linear scaling of vs. albeit with logarithmic corrections (see Eq. (7)). This difference in exponent equally applies to the scaling of the number of regulators vs. the total number of genes in the toolbox model on critical and supercritical universal network.

Simulation of the toolbox model on the KEGG network with linearized pathways

To test our mathematical results for a more realistic version of the universal tree we linearized pathways and reactions in the network formed by the union of all reactions in the KEGG database [6]. To this end we generated a random spanning tree on the KEGG network by the following algorithm: the metabolite pyruvate was selected as the root of the tree. We then randomly picked a metabolite located upstream of it and generated a linear pathway (tree branch) as a self-avoiding random walk on the KEGG network extended until it either merges with another pathway or reaches the root of the tree. This step was repeated until all upstream metabolites were covered. The resulting spanning tree was then used as the universal network on which we simulated the toolbox model by gradually increasing the number of pathways and recording the total number of metabolites in organism-specific metabolic networks. Our numerical simulations generated approximately quadratic scaling (see Ref. [2]).

To better understand the origins of this scaling we investigated the topology of the underlying universal tree. The criticality of a tree is defined by the asymptotic value of the ratio for large : for supercritical trees it reaches a limit , while for critical ones it converges to 1 as described in Eq. (3). Figure 3 showing vs. in the linearized KEGG network convincingly demonstrates its criticality. Thus the quadratic scaling between the number of transcriptional regulators and the number of metabolites in the toolbox model simulated on the linearized KEGG network is explained by the mathematical formalism described in previous sections.

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Figure 3. vs. for KEGG-based universal network with linearized pathways.

(the ratio of the number of metabolites at two consecutive layers) plotted as a function of (the layer number) for KEGG-based universal network with linearized pathways. Solid line: measurement, dotted line: its expected profile, , in a critical branching tree. The error bars reflect standard deviation in different spanning trees used to linearize the KEGG network.

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In addition to using a random spanning tree to linearize the KEGG network we also tried a version using minimal paths. In this version the universal network is generated by randomly picking a metabolite and connecting it to the root of the tree (pyruvate) by the shortest path. At a first glance such “minimal path” selection appears to be reasonable from evolutionary standpoint. Indeed, evolution would favor simpler and shorter pathways in order to minimize the expenditure of resources to achieve a given metabolic goal [7] . However, the minimal paths version of linearization of the KEGG resulted in a supercritical universal network with logarithmically short branches . As predicted for supercritical trees (Eq. (7)) the toolbox model in this case had an approximately linear scaling of the number of transcriptional regulators (leaves of branches on the network) with the total number of metabolites: the measured best fit exponent was only .

How do we reconcile the evolutionary pressure apparently selecting for minimal pathways with dramatically wrong scaling properties of this model? We believe that most of the ultra-short “small world” pathways generated by minimal paths on the KEGG network are unrealistic from biochemical standpoint. Indeed, highly connected co-factors often position metabolites with very different chemical formulas in close proximity to each other. For example, the KEGG reaction R00134: would appear as a miraculous “one-step” conversion of carbon dioxide into formate, while the reaction R03546: would artificially link carbon dioxide and cyanate. The combination of these two reactions gives rise to equally impossible two-step path: formate → CO₂ → cyanate. As a consequence of such artificial shortcuts branches of the universal network linearized by minimal paths are much shorter than they are in reality. .This problem is at least partially alleviated by 1) removing unusually high-degree nodes corresponding to common co-factors such as H₂O, ATP, NAD in the metabolic network so that some unrealistic paths are eliminated, and also 2) using random spanning tree instead of the shortest paths. In Ref. [2] we followed both of these recipes to successfully reproduce the quadratic scaling in real-life data. Still no linearization procedure could completely avoid biochemically meaningless shortcuts. In the next section we introduce and study a new considerably more realistic version of the toolbox model operating on branched and interconnected universal networks. Pathways in this version of the toolbox model satisfy the evolutionary requirements for minimal size. Proper treatment of metabolic reactions with multiple substrates prevents biochemically meaningless shortcuts and as a consequence restores the quadratic scaling.

The toolbox model on KEGG network with branched pathways and multi-substrate reactions

Real metabolic reactions routinely include multiple inputs (substrates) and multiple outputs (products) (see Table 1 and Table 2 for statistics in the KEGG database). Furthermore, metabolic networks often have two or more alternative pathways generating the same set of end-products from the same set of nutrients. Both these factors result in metabolic networks that are branched and interconnected. Here we propose and simulate a more realistic version of the toolbox model. The most prominent feature of the new model of pathways is the “AND” function acting on inputs of multi-substrate reactions. It reflects the constraint that a reaction cannot be carried out unless all its substrates are present.

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Table 1. The distribution of irreversible reactions classified by their numbers of substrates and products.

https://doi.org/10.1371/journal.pcbi.1001137.t001

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Table 2. The distribution of reversible reactions classified by their numbers substrates/products.

https://doi.org/10.1371/journal.pcbi.1001137.t002

The new version of the toolbox model simulates addition of anabolic pathways aimed at production of new metabolites from those the model organism can currently synthesize (its current metabolic core). The new pathways are optimal in the sense that they contain the smallest number of reactions necessary to synthesize the desired end-product. As for previous versions of the toolbox model, one can modify the rules of this model to apply to catabolic pathways but for simplicity we will limit the following discussion to anabolic pathways. The rules of the new model are:

1. At the beginning of the simulation, the model organism starts with a “seed” metabolic network consisting of 40 metabolites classified by the KEGG as parts of central carbohydrate metabolism, plus a number of “currency” metabolites such as water, ATP and NAD (see the section “Seed metabolites of the scope expansion” of Text S1 for additional details). It is assumed that our organism is able to generate all of these metabolites by some unspecified catabolic pathways.
2. At each step a new metabolite that cannot yet be synthesized by the organism is randomly selected from the “scope” [8] of our seed metabolites. This scope consists of all metabolites that in principle could be synthesized from the seed metabolites using all reactions listed in the KEGG database (see Ref. [8] for details).
3. To search for the minimal pathway that converts core metabolites to this target we first perform the “scope expansion” [8] of the core until it first reaches the target. In the course of this expansion reactions and metabolites are added step by step (or layer by layer). Each layer consists of all KEGG reactions that have all their substrates among the metabolites in the current metabolic core of the organism (light blue area in Figure 4) and those generated by reactions in all the previous layers. (See Figure 4 for an illustration).
4. Next we trace back added reactions starting from the target and progressively moving to lower levels. One starts by finding the reaction responsible for fabrication of the target metabolite and adding it to the new pathway (if several such reactions exist in the last layer we randomly choose one of them). In case of multi-layer expansion process some substrates of this reaction are not among the core metabolites (otherwise this reaction would be in the first layer). One then goes down one layer and adds the reactions fabricating these missing substrates. This is repeated all the way down to the first level of the original expansion. The resulting pathway includes the minimal (or nearly minimal) set of reactions needed to generate the target metabolite from the current metabolic core of the organism. Starting from the next step of the model the target and all intermediate metabolites become part of the metabolic core. Genes for enzymes catalyzing these new reactions are assumed to be horizontally transferred to the genome of the organism. The newly added metabolic pathway is assumed to have a dedicated transcriptional regulator so that the number of transcription factors in our model is always equal to the number of pathways or their target metabolites.
5. Steps 1–5 are repeated until metabolic network of the organism reaches its maximal size. At this stage it includes the entire scope [8] of the starting set of metabolites in step 1.

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Figure 4. Diagram of a new pathway added to the metabolic network of the organism.

The diagram explains different types of metabolites and reactions. Reactions (squares) in the added pathway use base substrates (yellow circles with horizontal shading) from the metabolic core of the organism (light blue area) to produce the target metabolite (the red circle). Added pathway generates intermediate products (green circles) as well as byproducts that are not further converted to the target (blue circles). Products of some reactions feed back into the metabolic core (yellow circles with vertical shading). Reactions are labeled with expansion steps at which they were added to the pathway.

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Numerical simulation of this model shows that the number of transcriptional regulators scales with the number of metabolites with power (Figure 5). This is consistent with quadratic scaling we observed and mathematically derived for a simpler model with linearized pathways composed of single-substrate reactions.

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Figure 5. vs. of toolbox model with branched pathways and multi-substrate reactions.

The scaling between the number of regulated pathways (leaves), and the number of metabolites, , in metabolic networks generated by the toolbox model with branched pathways and multi-substrate reactions. Solid line with slope 2.0+/−0.1 is the best fit to the data. Error bars reflect the standard deviation of at a given value of in 9 realizations of the model (see he section “Error analysis of the toolbox model” of Text S1 for our estimation methods and error analysis).

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The mathematical formalism derived in the previous sections is limited to tree-like universal networks and thus does not directly apply to the new model. Nevertheless, one generally expects the quadratic scaling to be limited only to critical, “large world” networks in which organisms with small genomes initially tend to acquire sufficiently long pathways. As noted before, from purely topological standpoint the KEGG network has a “small world” property making long pathways unlikely. It is important to check if the realistic treatment of multi-substrate reactions did in fact restore the “large world” property and criticality to the KEGG universal network by increasing the minimal number of steps required for connecting target metabolites to the metabolic core. To quantify the criticality of the expansion process as before we use the ratio where denotes the number of metabolites reached at step of the scope expansion starting from the initial seed subset of metabolites. As in the case of critical branching trees this ratio asymptomatically converges to 1 thus confirming the criticality of the scope expansion process. The mere existence of ∼40 steps in this process (the x-axis in Figure 6) can serve as evidence in favor of “large world” character of the KEGG universal network characterized by the existence of long pathways.

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Figure 6. vs. for the universal network consisting of all KEGG reactions.

The ratio of the number of metabolites at two consecutive layers of the scope expansion process plotted versus the layer number . Scope expansion was performed for the universal network consisting of all KEGG reactions. The dashed line is the mathematical expectation of the same curve in a critical branching process.

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Geometrical properties of branched pathways in the model

Unlike linearized pathways in the original version of the toolbox model [2], branched pathways in the more realistic model from previous section are interesting objects in their own right. We identified several geometrical properties of these pathways (see Figure 4 for illustration) quantifying their position relative to the core network to which they were added: 1) n_{border rxn}–the number of added reactions that are connected (as a substrate or a product) with at least one metabolite in the core, 2) n_base–the number of metabolites in the core that serve as substrates to reactions in the added pathway, 3) n_feedback–the number of core metabolites that are products of reactions in the new pathway, 4) n_byproduct–the number of final metabolic products of the added pathway that are neither core metabolites nor the target, 5) length-the number of steps (layers of the scope expansion process) it takes to transform core metabolites into the target product. 4 illustrates the definition of these parameters while Figure 7 and Figure 8 plot these parameters as a function of (the number of metabolites in the added pathway) or (the number of reactions in the added pathway).

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Figure 7. n_byproduct vs..

Faster-than-linear scaling of the number of byproducts, n_byproduct, and the total number of metabolites, , in individual branched pathways illustrated in Figure 4. Data for individual pathways were logarithmically binned along the x-axis. Hence y-axis can be and are below 1 due to pathways with 0 byproducts. The solid line with exponent 1.7+/−0.1 is the best fit to the logarithmically-binned data shown in this plot. Readers can refer to the section “Analysis of number of by-product of the pathways of the toolbox model on the metabolic network with branched pathways and multi-substrates reactions” of Text S1 for our estimation methods and error analysis.

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Figure 8. Various linear relationships on the individual pathways.

Approximately linear relationship between a) pathway's length and its number of reactions , ) b) the number of border reactions, n_{border rxn,} and the total number of reactions, , c) the number of base metabolites, n_base, and the total number of metabolites, , d) the number of metabolites receiving feedback, n_feedback, and the total number of metabolites, . These different geometrical properties of individual pathways are illustrated in Figure 4. Sizes of circles are proportional to the logarithm of the number of discrete (x, y) pairs contributing to this point.

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Approximately linear relationship between n_{border rxn} vs. (Figure 8a) suggests that added pathways tend to be located at or near the surface of the core metabolic network of the organism. Most of reactions in these pathways use metabolites from this core network either as substrates (n_base) or as products (n_feedback). Further analysis indicates that “currency metabolites” (common co-factors that serve as substrates or products of many reactions) constitute a significant fraction (∼25%) of all core metabolites involved in border reactions (see the section “Analysis of the currency metabolites in the toolbox model” of Text S1 for details). On the other hand, the fact that the number of steps in a pathway (its length) constitutes a good fraction of its overall number of reactions implies that, in spite of these numerous “shortcut” connections to the core, added pathways remain very thin and essentially linear. That is to say, these pathways tend to work as a single “conveyor belt” sequentially converting intermediate products into each other instead of having two or more parallel “processing lines” and assembling final products of these lines only at final stages of the pathway. This finding provides an intuitive reason why models with branched and linearized pathways have similar scaling properties. One can argue that this is because pathways in both models are essentially linear. Yet, in spite of their linearity and optimality (each has the smallest number of reactions to generate the target from the core) added pathways in the new version of the model are very different from shortest paths on the universal network. As illustrated in Figure 9 the average pathway length is several times longer than the geometrically shortest path between the target and the core.

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Figure 9. Comparison of lengths of the pathways and shortest distances of the targets from the core.

The lengths of the pathways are represented by circles and solid line, while the shortest distances of the targets from the core are represented by crosses and dotted line.

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As can be seen from Figure 7, most of added pathways (around 97%) do not generate any byproducts. They only produce the intended target and n_feedback metabolites in the core network of the organism to which they were added. The relative scarcity of byproducts suggests that pathways in our model satisfy the evolutionary constrains imposed on real-life organisms. Indeed, as previously proposed in Ref [9] it makes sense to assume that evolution favors pathways that achieve a given metabolic goal using the smallest number of enzymes and at the same time striving to generate the maximal possible yield. Unnecessary byproducts not only reduce the yield of the desired metabolic target, they also might become toxic in high concentrations and thus would require extra transporter proteins to pump them out.