Robustness as a function of network modularity

Robustness is a broad concept that hardly can be condensed into one measure, even for a system as specific as metabolism. In general, robustness can be defined as a system's ability to remain unchanged when perturbed. One can imagine several types of perturbations. We investigate two rather different classes—changes in concentrations of metabolites and changes in the reaction system (new reactions replacing old) by genetic control. We refer to the first case as metabolic perturbations and the second as genetic perturbations. We will also distinguish between: if the perturbations are localized to one module, or if they can appear anywhere in the network. In total we consider four classes of perturbations—they can be either localized or global, and metabolic or genetic.

The main robustness measure, defined in the Methods section, is basically the relative change in the concentration of a metabolite averaged over a set of metabolites. We consider two such sets, either the whole set of metabolites, which gives the system-wide robustness , or the metabolites that are perturbed giving the focal robustness .

In Fig. 3, we plot the average values of our robustness measures as functions of the average network modularity . The robustness to global metabolic perturbations increases while the robustness to perturbations within a module remains fairly constant (Fig. 3A). If one looks only at the metabolites that were originally perturbed (Fig. 3A), the situation is different—these metabolites are more affected by sudden shifts in the concentrations the more modular the system is. This seems logical—if the modularity is lower, the coupling to the rest of the network is stronger, so there are more metabolites to influence the relaxation and to absorb the perturbation. The fact that the system is more robust to global, compared to localized, perturbations can be explained in a similar way—a localized perturbation gives a larger impact on a restricted subsystem and this subsystem cannot absorb that large impact as much as the whole system would. But why does the system-wide robustness increase with modularity? One scenario is that metabolic perturbations are better absorbed in a distributed fashion. With global perturbations and high modularity each module handles its internal perturbations and, if this fails, flows between the modules are too weak for the perturbation to spread.

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Figure 3. Robustness vs. modularity.

Panels A and B show data for the robustness against metabolic perturbations. A displays robustness of the system as a whole; B shows the robustness measured over the perturbed metabolites only. Panels C and D show the corresponding plots for robustness against genetic perturbations. Circles represent perturbations made in one module; crosses indicate data for perturbations made in different modules. The data is averaged over more than 500 runs (network realizations). The errorbars in the average are smaller than the symbol size.

https://doi.org/10.1371/journal.pone.0016605.g003

For the genetic perturbations all curves are decreasing, meaning that modularity makes the system less robust. These perturbations virtually add new reactions and delete old. Even if the perturbations are designed not to affect the average structure of the system (keeping e.g. the system size and the modularity constant), they obviously affect more than the metabolic perturbations (cf. Fig. 3A and Fig. 3C). A network module can presumably not handle a genetic perturbation as efficient as a metabolic perturbation. Another factor for the decreasing -curve could be that the interface between the modules can change from the perturbations and that the interfaces get more influential with increasing modularity. As seen in Fig. 3D, the localized perturbations influence the directly affected metabolites (the ones that are involved in reactions changed by the genetic perturbations) less strongly than the global perturbations. From the changes at the interfaces, we can understand that localized perturbations affect the rest of the system to a greater deal here than compared with metabolic perturbations. is larger for the local compared with global genetic perturbations meaning that for metabolites within a single module rewired by genetic perturbations the changes will be larger than if the perturbations are more distributed.

Relaxation time as a function of network modularity

In Fig. 4, we show the relaxation time as a function of modularity. A small value means that the system reaches its new equilibrium fast. This dynamic response is different for the two types of perturbations—the system reaches its new state faster with higher modularity for the metabolic perturbations, but slower with the genetic ones. The decreasing curves for metabolic perturbations is in line with the above mentioned scenario that if modules handle the perturbations independently, then the more modular the system is the better (in this case faster) is the recovery. That, for genetic perturbations, robustness increases with modularity is something we interpret as an effect of the changed couplings across at the boundary. The stronger the modularity is, the slower is the flow between the modules and the longer does the system need to find a new equilibrium.

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Figure 4. Relaxation time vs. modularity.

Panel A displays the corresponding data for perturbations in the concentrations of metabolites. Panel B shows the relaxation time for genetic perturbations within one module (circles) or the whole system (crosses). The data represents averages over more than 500 runs (the same runs as in Fig. 3).

https://doi.org/10.1371/journal.pone.0016605.g004

Notations and mathematical framework

We consider a reaction system of metabolites and reactions . A reaction is characterized by its substrates , their multiplicities , its products and their multiplicities , and a reaction coefficient . Consider, for example, the reaction 2H + O 2 HO. Then we have , is H, is O, , , is HO and . From a reaction system one can derive a graph , where ( in this case) is the set of vertices of the graph and is the set of edges. One can define several types of metabolic graphs. In this work we focus on substance graphs (claimed to encode more functional information about the graphs than other simple-graph representations [5], [15]), where the vertices are substances and there is an (undirected) edge between two vertices if they are either substrates or products of the same reaction (edges between a vertex to itself is not allowed). In the example above, the reaction will contribute with three edges—, and —to the substance graph (see Fig. 1A).

Network modularity

We will shortly discuss how network modularity is calculated. For a more comprehensive review, see Refs. [2], [3]. Let the vertex set be partitioned into groups and let denote the fraction of edges between group and . The modularity of this partition is defined as (1)where the sum is over all the vertex groups. The term is the expectation value of in a random graph. The measure for graph modularity that we use is — maximized over all partitions (by a heuristics proposed in Ref. [3]). Comparing of graphs with different sizes and degree distributions is not completely straightforward. Even for networks generated by one particular model (that one would from construction expect to have the same modularity) can vary with the network size [22]. Fortunately, for this work, such changes are monotonous. This means that we can use to detect changes in robustness in response to changes in modularity even though the particular functional forms of the curves of robustness vs. are hard to interpret.

Model reaction systems with tunable network modularity

In this section, we will sketch the model of reaction systems with tunable network modularity. The model we use treats atoms of the molecular species explicitly. The set of all atoms is divided into groups (or proto-modules) of equal size . reactions are added to the system such that they obey mass conservation (for all atom species, the number of individuals is the same for substrates and products). reactions are added between molecules consisting of atoms from the same group. The remaining reactions are added between molecules of any atomic composition. For low -values, relatively few reactions will connect different groups and therefore the derived network modularity will be low. If is close to one, the derived graphs will be more modular. The molecules are constructed by randomly combining atoms of a group. Reactions are generated by randomly splitting and recombining molecules. If the mass conservation is broken, or the reaction already exists in the data set, then the molecule construction is repeated. If no reaction fulfilling mass conservation has been found after iterations, then this is done by defining new molecules. With a larger value of , the substance graphs will thus be both denser and have fewer metabolites ( is, perhaps a little unusually, an output of the model, whereas is a control parameter).

There are a number of other technicalities, like how the molecules are constructed from the atoms etc., that are explained in detail in Ref. [15]. We also modify the algorithm of Ref. [15] when it comes to inter-group reactions. In Ref. [15] these always act as sources and sinks (so that there is never a flow between modules); here all inter-group reactions are bridges between the modules (so that these reactions have at least one substrate in one group and one product in the other).

In this work we use the parameter values , , and (the values of the other parameters, related to the details in Ref. [15] are the same as in that paper).

Reaction kinetics

To simulate the biochemical dynamics, we use simple mass-action kinetics. This approach is, technically speaking, assuming all enzymatic effects can be encoded into the reaction coefficients and the reaction system itself. The main reason for this simplification is that, when speaking about network modularity, enzymes are usually only included implicitly (via the active reactions), so to relate the robustness to network modularity we need a kinetic description of the same level of description. Given a reaction system generated by the scheme above we assign a rate constant to each reaction drawn from a normal distribution (the sign of defines the direction of the reaction) and initial concentration of a substance in (setting negative concentrations to zero). From this starting point, we use the kinetic equation (2)where the sum is over all reactions with as a product, where is 's multiplicity in the reaction . To simulate the metabolic flux we also add source and sink terms to Eq. 2 for some metabolites. We let all the metabolites that are not substrates of any reaction be sinks (otherwise their mass would just accumulate) and all metabolites that are not a product of any reaction to be sources. In practice there will always be both sources and sinks in the generated reaction systems. (If the reaction systems would be generated in some other way one would need to put in sources and sinks explicitly.) We model the outflux by letting the sink-metabolites flow out of the system with a rate proportional to times the concentration of the metabolite. In our simulations we use . We keep the inflow rate the same as the outflow rate so that the total mass is conserved. The inflow is distributed to the inflow metabolites in proportion to , a random variable for each inflow metabolite drawn from a distribution when the reaction system is generated.

From the above setup, we run the system is until it converges (which it always does for the dynamic systems in question). We integrate the system with the Euler method (with time step until the time when (3)

We use in this simulations. Higher precision in or does not change the outcome significantly. In this paper we use the parameter values , , , , , and .

Genetic perturbations

Since we exclude genetic control and explicit enzymes in our reaction-system kinetics, we have to model the genetic perturbations indirectly. This is on the other hand quite straightforward. We replace randomly chosen reactions following the same rules as when the reaction system was first constructed. For local perturbations, the reactions are chosen from one randomly selected cluster (identified by the cluster-detection algorithm above). A reaction is associated to the module to which a majority of its metabolites are categorized (if there is a tie, we select a cluster randomly). In this process, new metabolites will inevitably be generated and others possibly deleted. To conserve mass in case the number of metabolites changes, we split the mass of the deleted metabolites equally among the new. We also go over the system and update the sources and sinks in the same way as when the reaction system was constructed.

Metabolic perturbations

Analogously to the genetic perturbations, we also require the metabolic perturbations to conserve the total mass. We control the magnitude of the perturbation by a parameter by requiring that (4)where is the total mass of metabolite before the perturbation and is the total mass after, and is a set of metabolites. In practice the masses have a right-skewed, heavy tailed distribution (as observed in real systems [23]). This means that if we just continue adding metabolites randomly until the condition Eq. (4) is fulfilled, and is not very small (we use ), we will have to perturb a rather large fraction of the metabolites. To get around this problem, consider a set of metabolite pairs. For the local perturbations, we choose a cluster (as detected by the algorithm above) at random as and add pairs of metabolites picked at random to until the condition is met or all there are no metabolites left in the cluster. For the global perturbations we let and split the metabolites into two sets and where the total mass of any metabolite in is larger than any metabolite in and is as small as possible such that the total mass of is larger than . In our simulations always has more elements than . Then we add pairs where one metabolite is randomly selected from and one is randomly selected from until Eq. (4) is true.

Robustness measures

Any measure of robustness should increase the more similar the system is before and after a perturbation. For biological functionality, it could be just as important to keep the concentrations of rare metabolites steady as those of the most abundant ones. Let be the concentration of metabolite before the perturbation and be the concentration after. A natural choice would be to take the average over the metabolites of the change rescaled by the typical concentration of as a measure of unrobustness (and thus its reciprocal value as a measure of robustness). As “typical concentration” one choice is the average. In practice, the metabolites that are very close to zero in concentration can give a rather large signal due just to numerical errors. To suppress such numerical noise, we rather use the quadratic mean, which decreases the expression's sensitivity to fluctuations in the denominator in the frequent situation that the concentrations are close to zero, thus putting a lower weight on the more uncertain terms. Our robustness measure thus becomes (5)where is a set of metabolites and denotes the absolute value of a number or the number of elements of a set. We consider two versions of this measure, one averaged over the whole set of metabolites, which we call system-wide perturbations , and one averaged over the metabolites directly affected by the perturbations (the metabolites participating in a reaction catalyzed by a perturbed enzyme in the case of genetic perturbations or, trivially, the perturbed metabolites of a metabolic perturbation), which we refer to as focal robustness .