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Homological percolation transitions in growing simplicial complexes

Yong‐Sun Lee, Jongshin Lee, Soo Min Oh, Dae-Geun Lee, B. Kahng

2021Chaos An Interdisciplinary Journal of Nonlinear Science33 citationsDOIOpen Access PDF

Abstract

Simplicial complex (SC) representation is an elegant mathematical framework for representing the effect of complexes or groups with higher-order interactions in a variety of complex systems ranging from brain networks to social relationships. Here, we explore the homological percolation transitions (HPTs) of growing SCs using empirical datasets and model studies. The HPTs are determined by the first and second Betti numbers, which indicate the appearance of one- and two-dimensional macroscopic-scale homological cycles and cavities, respectively. A minimal SC model with two essential factors, namely, growth and preferential attachment, is proposed to model social coauthorship relationships. This model successfully reproduces the HPTs and determines the transition types as an infinite-order Berezinskii-Kosterlitz-Thouless type but with different critical exponents. In contrast to the Kahle localization observed in static random SCs, the first Betti number continues to increase even after the second Betti number appears. This delocalization is found to stem from the two aforementioned factors and arises when the merging rate of two-dimensional simplexes is less than the birth rate of isolated simplexes. Our results can provide a topological insight into the maturing steps of complex networks such as social and biological networks.

Topics & Concepts

Percolation (cognitive psychology)Simplicial complexPercolation theoryPercolation thresholdStatistical physicsMathematicsAbstract simplicial complexPure mathematicsPhysicsCombinatoricsTopology (electrical circuits)BiologyQuantum mechanicsElectrical resistivity and conductivityNeuroscienceTopological and Geometric Data AnalysisComplex Network Analysis Techniquesadvanced mathematical theories
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