Initial steps: A purely topological perspective

Let us consider a pair of nodes (i, j). The most elementary contribution to coactivation is that a common neighbor jointly activates the two nodes i and j. This first simple consideration already points to the fact that the number of common neighbors of two nodes could predict functional connectivity. Thus, we obtain a first prediction for the coactivation of nodes i and j, denoted here TO: (1) where denotes the set of common neighbors of the pair (i, j). This quantity is better known by its normalized version, the matching index or topological overlap [32]. However, this quantity is not able to predict the potential effect of the initial conditions, as no dependence on the probabilities of states is incorporated. In the following section we describe how the exact pattern of triangles around a pair of nodes (i, j) can generate specific patterns of coactivations. Furthermore, we show that a striking dependence of coactivations on the statistics of initial conditions is instigated through the probability of initializing a triangle as a pacemaker.

Macroscopic prediction

Typically in the SER simulations, starting from random initial conditions, after a short transient all nodes settle into a period-3 oscillation (except for very sparse graphs). The dynamics, thus, typically partition the nodes of a graph into three cohorts: those jointly active at time t, at time t + 1 and at time t + 2, respectively. The contribution of a single run to the coactivation matrix is, therefore, almost completely determined by the initial conditions, rather than by the network architecture. When accumulating information over a large number of runs, the pattern of coactivations becomes governed by topological features of the graph. In this deterministic setting of the SER model, the drivers of the dynamics are autonomously oscillating triangles serving as pacemakers [28]. A pacemaker corresponds to an isolated triangle initialized with any permutation of the three states S, E and R, displaying stable oscillations that cannot be disrupted by noise or surrounding influences when embedded in larger networks. It is a decisive advantage of this deterministic cellular automaton model that it allows for enumerating the full state space of such network motifs.

As an illustration of this general approach, we first consider a small toy network model consisting of the pair of nodes under consideration, a number of common neighbors and independent triangles around each of these common neighbors (Fig 2A). We assume that, after a short transient, the system settles into a period-3 oscillation (which corresponds to assuming that the graph has a large enough number of triangles and the initial conditions contain non-zero numbers of nodes in the S, E and R states). For each initial condition, the pattern of coactivations in the deterministic SER model is then essentially a consequence of the two different possible triangle usages: active pacemakers (i.e., triangles initialized as some permutation of S, E, R and, thus, producing cyclic activity) and passive elements driven by other pacemakers (i.e., triangles initialized in any other way, which autonomously would settle into an all-susceptible state, but are typically excited by excitations coming from other parts of the network). Our hypothesis is that, in order to simultaneously activate two nodes i and j, they must (1) be not part of an active pacemaker and (2) have at least one of their common neighbors part of an active pacemaker.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Fig 2. Prediction of the FC patterns in the deterministic SER model for toy examples.

(A) Toy structural connectivity network with a pair of nodes in red and their common neighbors in green (top), and associated patterns of coactivation as a function of the initial percentage of excited nodes (bottom). Colors code for the different predictions (magenta, red and green for the prediction from SC, TO—Eq 1 and FC1—Eq 5, respectively, black codes for the simulated FC). (B) Same as (A) with additional links (in blue) added randomly in the original graph.

https://doi.org/10.1371/journal.pcbi.1006084.g002

The derivation of the predictions is inspired by mean-field approaches classically employed in epidemic models [33]. The dynamics of the nodes is characterized at the population level per state, which considerably reduces the dimensionality of the system. For example, the probability of finding a pair of nodes in the SR state in the initial conditions simply reduces to the product of the marginal probabilities, that is, SR. In the following section we formulate a first prediction for the case of non-overlapping triangles (among nodes i and j, as well as among their common neighbors). The probability that the pair (i, j) and one of their common neighbors form an active pacemaker is: (2)

The set of common neighbors of nodes i and j is characterized by the number of triangles around each of these neighbors (not including the one formed with nodes i and j). Let c_ijk be the number of triangles around the kth common neighbor of the pair (i, j), this quantity corresponds to the unnormalized clustering coefficient of k minus one, if (i, j) are connected (3) where C_k (resp. d_k) is the clustering coefficient (resp. the degree) of node k. Then the probability that this neighbor is not part of an active pacemaker is (4)

Taking together Eqs 2 and 4, we obtain a prediction for the coactivation of nodes i and j, named FC1: (5) where the factor 1/3 is taking into account the maximum excitation frequency of nodes in the SER dynamics.

The prediction of coactivation probability, Eq 5, does not require the two nodes to be in the same state. When considered in isolation, the two nodes actually have the capacity to synchronize their respective phases. Indicative of such a synchronization are consecutive time steps of a node spent in the S state. In practice (i.e., when embedding such a substructure in a broader network context), the capacity of a pair of nodes to synchronize in such a way is strongly reduced due to other incoming excitations. A further difference between these toy model networks and more general topological situations is that a much wider range of triangle types needs to be taken into account. When considering more realistic (complex) networks, the previous prediction fails to match simulations (Fig 2B). In fact, given the deterministic nature of the model, any triangle used as a pacemaker in the neighborhood of a pair of nodes contributes (non-trivially) to the coactivations. Therefore, we have to enumerate all possible triangle configurations surrounding a pair of nodes.

Counting triangles

There exists a variety of triangle motifs potentially surrounding a pair of nodes (Fig 3). In the following, we classify such triangles according to their distance to the nodes of interest. First, we have triangles adjacent to the pair which can be characterized as follows, triangles adjacent to:

• i and j: t⁰, this quantity corresponds to TO 1 multiplied by the adjacency matrix;
• i or j and zero common neighbor: t⁰⁰, where () represent the number of triangles adjacent to i (resp. j);
• i or j and one common neighbor: t⁰¹, where () represent the number of triangles adjacent to i (resp. j) and to the kth common neighbor;
• i or j and two common neighbors: t⁰², where represent the number of triangles adjacent to i or j.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Fig 3. Potential triangle motifs surrounding a pair of nodes.

The first row represents the first level of the hierarchy of triangles, with triangles adjacent to at least one node of the pair, while the second row represents the second level with triangles non-adjacent to the pair, but adjacent to at least one common neighbor. The third row represents the third level, where triangles are non-adjacent to the pair and to the set of their common neighbors, but adjacent to at least one neighbor of one node of the pair. Red nodes represent the pair considered, red (resp. blue) dashed edges represent optional edges (resp. potential motifs not considered in the current formalism).

https://doi.org/10.1371/journal.pcbi.1006084.g003

One step further, we have a set of triangles not directly adjacent to (i, j), but adjacent to their common neighbors; as such we have the set of triangles adjacent to:

• one common neighbor: t¹¹, where represent the number of triangles adjacent to the kth common neighbor;
• two common neighbors: t¹², where represent the number of triangles adjacent to the lth pair of common neighbors;
• three common neighbors: t¹³.

Such an arrangement defines an hierarchy of triangles, where the levels are defined by the distance from the pair of nodes. The first level corresponds to the set {t^0k} where the average distance is zero, {t^1k} represents the second level with an average distance of 1. In this way, we can iteratively define the successive levels of the hierarchy, for instance the third level (Fig 3). However, from a dynamical perspective, higher level triangles have a negligible contribution to FC. Moreover, taking into account such higher order triangles significantly complicates the analytical prediction (see below).

Microscopic prediction using pacemakers

Once having enumerated all possible triangles surrounding a pair of nodes, we can now in a systematic way enumerate all possible contributions (or non-contributions) of these triangles to FC if used as pacemakers. We introduce here a new notation for easier reading. In particular, a circled arrow around a topological quantity crossed indicates that it is cancelled, meaning that no triangle is used as pacemaker. The orientation of the arrow represents the direction of propagation of the excitation within the triangle (double arrows represent the possibility of excitation running in both ways). Moreover, capital letters are used for indices i and/or j if a pacemaker is adjacent to them. For example, the above prediction reads as follows: is the probability of having no triangle adjacent to both i and j (t⁰) used as pacemaker, and, is the probability to have at least one triangle used as a pacemaker adjacent to a common neighbor of the pair (i, j) and to i and j at one step distance. Then, when we merge all conditional probabilities, the probability of coactivations, named FC2, reads: (6) where greylevel codes for the levels (1st gray and 2nd black). See Materials and Methods section for further details.

Relative predictive power

We investigated the relative predictive power of the different analytical formulae (including SC, TO, FC1 and FC2) across three typical network topologies (see Materials and Methods section). The formalism based on pacemakers (FC2—Eq 6) in general has the best predictive power, both in terms of correlation and mean difference (Fig 4). FC1 (resp. SC and TO) generally over- (resp. under-) estimated the empirical FC. The predictions appear robust across network realizations as well as across different level of network’s density (S1 Fig). Additionally, we also verified and validated our formalism with generic graphs with a given triangle motifs distribution (S2 Fig).

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Fig 4. Illustration of the predictive power of the analytical predictions of FC in the deterministic SER model.

Example of coactivation (FC) for a randomly selected pair of nodes (first column), correlation (second column) and mean (signed) difference (third column) between simulated and predicted FCs. The plots are a function of the number of nodes initially in the E state and the analytical predictions (magenta, red, green and blue for the prediction from SC, TO—Eq 1, FC1—Eq 5 and FC2—Eq 6, respectively, black codes for the simulated FC). The last column represents the scatter plot of the relation between FC2 (Eq 6) and simulated FC. Each row represents a typical network topology, that is, random (first row), scale-free (middle row) and modular (last row).

https://doi.org/10.1371/journal.pcbi.1006084.g004

Next, we fully explore the space of possible initial conditions. We observed that the correlation between SC and FC is highly specific for the topological properties of the underlying structural network. As previously reported, random networks display no or slightly negative SC-FC correlations (depending on their density), scale-free graphs have moderate negative correlations between SC and FC, and modular networks show strong positive correlations (Fig 5). Additionally, the analytical framework based on pacemakers is able to predict the simulated FC for a relatively wide range and, thus, across almost the full space of possible initial conditions.

Download:

• PPT
  PowerPoint slide
• PNG
  larger image
• TIFF
  original image

Fig 5. Predictive power of the analytical predictions of FC over the full space of initial conditions in the deterministic SER model.

Columns code for the different potential predictors (SC, TO—Eq 1, FC1—Eq 5 and FC2—Eq 6, from left to right) and rows represent typical network topology. For each panel, the upper (resp. lower) triangular parts of the matrices represent the correlation (resp. mean difference) between the simulated FC and its predictor.

https://doi.org/10.1371/journal.pcbi.1006084.g005

Networks

To investigate the role of topology for the functional connectivity patterns of networks in the SER model, we considered three different types of undirected benchmark graphs: random, scale-free, and modular networks. The random graph was the classical Erdős-Rényi model [39], the scale-free graph was the Barabási-Albert model [40], and the modular graph was a composition of four small random graphs of identical size and with few links among them. The artificial networks had 60 nodes and about 800 links, and were generated with the software package NetworkX [41] as used in [28]. The layouts were generated using a force-directed algorithm [42].

Additionally, we also explored the robustness of the predictions across various network realizations and densities (from 0.1 to 0.6 by step of 0.1). For each density value, we generated 50 synthetic random graphs with 60 nodes, computed the simulated and predicted FCs, and quantified the predictive power of the analytical proposals. Synthetic graphs were generated using the Brain Connectivity Toolbox (https://sites.google.com/site/bctnet/) [43].

Model

We used a simple three-state cellular automaton model of excitable dynamics, the SER model, representing a stylized biological neuron or neural population [20]. The SER model operates in discrete time and employs the following synchronous update rules, a node in the:

• S → E if at least one neighbor is excited;
• E → R;
• R → S.

This deterministic version was investigated in detail in [28], where, for example, the role of cycles in storing excitations and supporting self-sustained activity was elucidated. The only remaining parameters are the underlying topology of the structural connectivity on which the model runs, and the pattern of initial states.

Functional connectivity

After appropriate initialization of the deterministic model, the network activity settles into a regular periodic behavior. Therefore, the nodes are divided into distinct groups; nodes are in the same dynamic group when they are simultaneously active. To analyze the pattern of joint excitations, we computed the number of simultaneous excitations for all pairs of nodes. The outcome matrix is the so-called coactivation matrix, a representation of the functional connectivity of the nodes: where ∈ {S, E, R} being the state of node i at time t, and the indicator function of state E

Numerical details

In the deterministic SER model, for each network and each initial condition setting, we simulated 5 000 runs of 50 time steps. Unless otherwise stated, the initial conditions were randomly generated, with a probability to set a node into the excited state E between 0 and 1; while the remaining nodes were equipartitioned into susceptible S and refractory R states. FC was summed over runs and normalized by dividing by the product of the number of runs and time steps, scaling FC values between 0 and 1/3. This normalized coactivation matrix was used for all subsequent analyses.

In order to probe the predictive power of the different analytical proposals, including SC itself, we computed the Pearson correlation as well as the mean signed difference between the simulated and predicted FCs. Diagonal elements of matrices were excluded to avoid spurious variations of the prediction. Additionally, SC and TO (the purely topological predictors) were normalized when computing their predictive values, to avoid spurious variations of mean differences with simulated FCs. The normalization was done by dividing them by three times their maximum, effectively scaling the values between 0 and 1/3, as for FC.

Analytical prediction of FC based on pacemakers

We here enumerate in a systematic way all possible (non-)contributions of the triangles motifs to FC if used as pacemakers. Given the periodic behavior of pacemakers, in the following treatment we only describe the cases where a pair of nodes (i, j) is in SS or SE states, all others configurations can be deduced in a similar way.

We have to consider two main components. The first one is the set of pacemakers which contribute (or not) systematically to FC, and the other one corresponds to the set of pacemakers which may lead to a systematic contribution to FC providing that the pair (i, j) synchronizes over time. The systematic (non-)contribution of each triangle motif is as follows:

• t⁰ never contributes to FC if at least one triangle is used as a pacemaker which leads to the following criteria:
• t⁰⁰ can systematically contribute to FC if at least one adjacent triangle is used as a pacemaker at each node, and that these pacemakers are synchronized (i.e. nodes i and j are in the same initial state): where Additionally, if i and j are in different states (e.g. SE), then we must not have adjacent pacemakers at each node:
• t⁰¹ can systematically contribute to FC if nodes i and j are in the same initial state. We have to consider the direction of excitation propagation. If we have one pacemaker adjacent to i or j and the excitation propagating from the common neighbor to the pair (i, j), then it will systematically contribute to FC, otherwise we need a least one pacemaker adjacent at both nodes: where If i and j are in different states (e.g. SE), then t⁰¹ will never contribute to FC in two cases. The first case is when i (or j) is adjacent to a pacemaker and j (or i) is also adjacent to this pacemaker, but at a distance of one (step). For example, if (i, j) ∈ SE and i is adjacent to one pacemaker where the common neighbor is in R state, then j will be enslaved by the activity of this pacemaker. The second case corresponds to having two independent pacemakers adjacent to i and j. Additionally, the set (i, j, k) must not form a pacemaker if A_ij = 1: where
• t⁰² will always contribute to FC, if at least one of the triangles is used as a pacemaker and the two nodes are in the same initial state If i and j are in different states (e.g. SE), then we must not have pacemakers adjacent to both nodes or independent pacemakers adjacent to each node: where
• t¹¹ and t¹² can contribute to FC if we have at least one pacemaker adjacent to a common neighbor and to i and j at one step: where
• t¹³ does not contribute directly to FC, if at least one triangle is used as a pacemaker then it necessarily imply that a triangle within t⁰¹ or t⁰² is also used as a pacemaker.

Assuming synchronization of the pair (i, j), the contribution of the different triangles is as follows:

• t⁰¹ can contribute to FC if at least one triangle is used as a pacemaker with excitation going from the common neighbor k to the pair (i, j). Additionally, in order to obtain the synchronization, (i, k, j) must not form a pacemaker of length 4 with another common neighbor. This condition is also valid for t¹¹, when one pacemaker is attached to one the nodes (i, j): where (resp. ) represents the probability of not having the pair (i, j) forming a pacemaker of length 4 when we have at least one pacemaker attached to i (resp. j) within the motifs t⁰¹ and t¹¹,
• if one t¹¹ or t¹² is used as a pacemaker and is not attached to i or j, then it can contribute to FC if the pair (i, j) are in the same initial state and no pacemaker is used in t⁰⁰ and t⁰¹ where If the nodes i and j are in different initial states, then t¹¹ can contribute to FC if no pacemaker is used in t⁰⁰, t⁰¹, t⁰², and that the nodes i and j are not forming a pacemaker of length 4 with the common neighbor involved in t¹¹ and one additional common neighbor where As for t¹¹, t¹² can contribute to FC if the nodes i and j are in different initial states, except that we can have pacemakers within t⁰⁰, t⁰¹ or t⁰² motifs if i or j is already adjacent to the pacemaker in t¹² where

Validation of the analytical prediction based on pacemakers

In order to validate our approach, we used synthetic toy graphs with a desired triangle motifs around a given pair of nodes. For each triangle motif, we then generated a random graph with 30 nodes. For triangle motifs involving common neighbors (ie, t⁰¹, t⁰², t¹¹ and t¹²), we fixed the number of common neighbors to 6. Everything else was set randomly.