Construction of and efficient sampling from the simplicial configuration model

Simplicial complexes are now a popular alternative to networks when it comes to describing the structure of complex systems, primarily because they encode multi-node interactions explicitly. With this new description comes the need for principled null models that allow for easy comparison with empirical data. We propose a natural candidate, the simplicial configuration model. The core of our contribution is an efficient and uniform Markov chain Monte Carlo sampler for this model. We demonstrate its usefulness in a short case study by investigating the topology of three real systems and their randomized counterparts (using their Betti numbers). For two out of three systems, the model allows us to reject the hypothesis that there is no organization beyond the local scale.Comment: 6 pages, 4 figure

Percolation on random networks with arbitrary k-core structure

The k-core decomposition of a network has thus far mainly served as a powerful tool for the empirical study of complex networks. We now propose its explicit integration in a theoretical model. We introduce a Hard-core Random Network model that generates maximally random networks with arbitrary degree distribution and arbitrary k-core structure. We then solve exactly the bond percolation problem on the HRN model and produce fast and precise analytical estimates for the corresponding real networks. Extensive comparison with selected databases reveals that our approach performs better than existing models, while requiring less input information.Comment: 9 pages, 5 figure

Growing networks of overlapping communities with internal structure

We introduce an intuitive model that describes both the emergence of community structure and the evolution of the internal structure of communities in growing social networks. The model comprises two complementary mechanisms: One mechanism accounts for the evolution of the internal link structure of a single community, and the second mechanism coordinates the growth of multiple overlapping communities. The first mechanism is based on the assumption that each node establishes links with its neighbors and introduces new nodes to the community at different rates. We demonstrate that this simple mechanism gives rise to an effective maximal degree within communities. This observation is related to the anthropological theory known as Dunbar's number, i.e., the empirical observation of a maximal number of ties which an average individual can sustain within its social groups. The second mechanism is based on a recently proposed generalization of preferential attachment to community structure, appropriately called structural preferential attachment (SPA). The combination of these two mechanisms into a single model (SPA+) allows us to reproduce a number of the global statistics of real networks: The distribution of community sizes, of node memberships and of degrees. The SPA+ model also predicts (a) three qualitative regimes for the degree distribution within overlapping communities and (b) strong correlations between the number of communities to which a node belongs and its number of connections within each community. We present empirical evidence that support our findings in real complex networks.Comment: 14 pages, 8 figures, 2 table

Complex networks as an emerging property of hierarchical preferential attachment

Real complex systems are not rigidly structured; no clear rules or blueprints exist for their construction. Yet, amidst their apparent randomness, complex structural properties universally emerge. We propose that an important class of complex systems can be modeled as an organization of many embedded levels (potentially infinite in number), all of them following the same universal growth principle known as preferential attachment. We give examples of such hierarchy in real systems, for instance in the pyramid of production entities of the film industry. More importantly, we show how real complex networks can be interpreted as a projection of our model, from which their scale independence, their clustering, their hierarchy, their fractality and their navigability naturally emerge. Our results suggest that complex networks, viewed as growing systems, can be quite simple, and that the apparent complexity of their structure is largely a reflection of their unobserved hierarchical nature.Comment: 12 pages, 7 figure

Strategic tradeoffs in competitor dynamics on adaptive networks

Recent empirical work highlights the heterogeneity of social competitions such as political campaigns: proponents of some ideologies seek debate and conversation, others create echo chambers. While symmetric and static network structure is typically used as a substrate to study such competitor dynamics, network structure can instead be interpreted as a signature of the competitor strategies, yielding competition dynamics on adaptive networks. Here we demonstrate that tradeoffs between aggressiveness and defensiveness (i.e., targeting adversaries vs. targeting like-minded individuals) creates paradoxical behaviour such as non-transitive dynamics. And while there is an optimal strategy in a two competitor system, three competitor systems have no such solution; the introduction of extreme strategies can easily affect the outcome of a competition, even if the extreme strategies have no chance of winning. Not only are these results reminiscent of classic paradoxical results from evolutionary game theory, but the structure of social networks created by our model can be mapped to particular forms of payoff matrices. Consequently, social structure can act as a measurable metric for social games which in turn allows us to provide a game theoretical perspective on online political debates.Comment: 20 pages (11 pages for the main text and 9 pages of supplementary material

Phase transition of the susceptible-infected-susceptible dynamics on time-varying configuration model networks

We present a degree-based theoretical framework to study the susceptible-infected-susceptible (SIS) dynamics on time-varying (rewired) configuration model networks. Using this framework, we provide a detailed analysis of the stationary state that covers, for a given structure, every dynamic regimes easily tuned by the rewiring rate. This analysis is suitable for the characterization of the phase transition and leads to three main contributions. (i) We obtain a self-consistent expression for the absorbing-state threshold, able to capture both collective and hub activation. (ii) We recover the predictions of a number of existing approaches as limiting cases of our analysis, providing thereby a unifying point of view for the SIS dynamics on random networks. (iii) We reinterpret the concept of hub-dominated phase transition. Within our framework, it appears as a heterogeneous critical phenomenon : observables for different degree classes have a different scaling with the infection rate. This leads to the successive activation of the degree classes beyond the epidemic threshold.Comment: 14 pages, 11 figure

Exact and rapid linear clustering of networks with dynamic programming

We study the problem of clustering networks whose nodes have imputed or physical positions in a single dimension, such as prestige hierarchies or the similarity dimension of hyperbolic embeddings. Existing algorithms, such as the critical gap method and other greedy strategies, only offer approximate solutions. Here, we introduce a dynamic programming approach that returns provably optimal solutions in polynomial time -- O(n^2) steps -- for a broad class of clustering objectives. We demonstrate the algorithm through applications to synthetic and empirical networks, and show that it outperforms existing heuristics by a significant margin, with a similar execution time.Comment: 13 pages, 8 figure

Inférence et réseaux complexes

Tableau d'honneur de la Faculté des études supérieures et postdoctorales, 2018-2019Les objets d’études de la science moderne sont souvent complexes : sociétés, pandémies, grilles électriques, niches écologiques, etc. La science des réseaux cherche à mieux com- prendre ces systèmes en examinant leur structure. Elle fait abstraction du détail, en rédui- sant tout système à une simple collection de noeuds (les éléments constitutifs du système) connectés par des liens (interactions). Fort d’une vingtaine d’années de recherche, on peut constater que cette approche a mené à de grands succès scientifiques. Cette thèse est consacrée à l’intersection entre la science des réseaux et l’inférence statistique. On y traite de deux problèmes d’inférence classiques : estimation et test d’hypothèses. La partie principale de la thèse est dédiée à l’estimation. Dans un premier temps, on étu- die un modèle génératif bien connu (le modèle stochastique par blocs), développé dans le but d’identifier les régularités de la structure des réseaux complexes. Les contributions origi- nales de cette partie sont (a) l’unification de la grande majorité des méthodes de détection de régularités sous l’égide du modèle par blocs, et (b) une analyse en taille finie de la cohérence de ce modèle. La combinaison de ces analyses place l’ensemble des méthodes de détection de régularités sur des bases statistiques solides. Dans un deuxième temps, on se penche sur le problème de la reconstruction du passé d’un réseau, à partir d’une seule observation. À nouveau, on l’aborde à l’aide de modèles génératifs, le transformant ainsi en un problème d’estimation. Les résultats principaux de cette partie sont des méthodes algorithmiques per- mettant de solutionner la reconstruction efficacement, et l’identification d’une transition de phase dans la qualité de la reconstruction, lorsque le niveau d’inégalité des réseaux étudiés est varié. On se penche finalement sur un traitement par test d’hypothèses des systèmes complexes. Cette partie, plus succincte, est présentée dans un langage mathématique plus général que celui des réseaux, soit celui des complexes simpliciaux. On obtient un modèle aléatoire pour complexe simplicial, ainsi qu’un algorithme d’échantillonnage efficace pour ce modèle. On termine en montrant qu’on peut utiliser ces outils pour tester des hypothèses sur la structure des systèmes complexes réels, via une propriété inaccessible dans la représentation réseau (les groupes d’homologie des complexes).Modern science is often concerned with complex objects of inquiry: intricate webs of social interactions, pandemics, power grids, ecological niches under climatological pressure, etc. When the goal is to gain insights into the function and mechanism of these complex systems, a possible approach is to map their structure using a collection of nodes (the parts of the systems) connected by edges (their interactions). The resulting complex networks capture the structural essence of these systems. Years of successes show that the network abstraction often suffices to understand a plethora of complex phenomena. It can be argued that a principled and rigorous approach to data analysis is chief among the challenges faced by network science today. With this in mind, the goal of this thesis is to tackle a number of important problems at the intersection of network science and statistical inference, of two types: The problems of estimations and the testing of hypotheses. Most of the thesis is devoted to estimation problems. We begin with a thorough analysis of a well-known generative model (the stochastic block model), introduced 40 years ago to identify patterns and regularities in the structure of real networks. The main original con- tributions of this part are (a) the unification of the majority of known regularity detection methods under the stochastic block model, and (b) a thorough characterization of its con- sistency in the finite-size regime. Together, these two contributions put regularity detection methods on firmer statistical foundations. We then turn to a completely different estimation problem: The reconstruction of the past of complex networks, from a single snapshot. The unifying theme is our statistical treatment of this problem, again based on generative model- ing. Our major results are: the inference framework itself; an efficient history reconstruction method; and the discovery of a phase transition in the recoverability of history, driven by inequalities (the more unequal, the harder the reconstruction problem). We conclude with a short section, where we investigate hypothesis testing in complex sys- tems. This epilogue is framed in the broader mathematical context of simplicial complexes, a natural generalization of complex networks. We obtain a random model for these objects, and the associated efficient sampling algorithm. We finish by showing how these tools can be used to test hypotheses about the structure of real systems, using their homology groups

Hypergraph reconstruction from network data

Networks can describe the structure of a wide variety of complex systems by specifying how pairs of nodes interact. This choice of representation is flexible, but not necessarily appropriate when joint interactions between groups of nodes are needed to explain empirical phenomena. Networks remain the de facto standard, however, as relational datasets often fail to include higher-order interactions. Here, we introduce a Bayesian approach to reconstruct these missing higher-order interactions, from pairwise network data. Our method is based on the principle of parsimony and only includes higher-order structures when there is sufficient statistical evidence for them.Comment: 12 pages, 6 figures. Code is available at https://graph-tool.skewed.de