2015
DOI: 10.1371/journal.pone.0126383
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Topological Data Analysis of Biological Aggregation Models

Abstract: We apply tools from topological data analysis to two mathematical models inspired by biological aggregations such as bird flocks, fish schools, and insect swarms. Our data consists of numerical simulation output from the models of Vicsek and D'Orsogna. These models are dynamical systems describing the movement of agents who interact via alignment, attraction, and/or repulsion. Each simulation time frame is a point cloud in position-velocity space. We analyze the topological structure of these point clouds, int… Show more

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Cited by 160 publications
(157 citation statements)
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“…In the case of collective behavior, this translates to measuring topological summaries (e.g., connected components and loops) of the resulting patterns from the cellular level to the global level. In [28], TDA was applied to study the velocity and positions of agents in simulations of a flocking model. By tracking global persistent homology features over time, Topaz et al [28] were able to identify agent clusters and detect the presence of global dynamics that would be challenging to notice visually.…”
Section: Introductionmentioning
confidence: 99%
“…In the case of collective behavior, this translates to measuring topological summaries (e.g., connected components and loops) of the resulting patterns from the cellular level to the global level. In [28], TDA was applied to study the velocity and positions of agents in simulations of a flocking model. By tracking global persistent homology features over time, Topaz et al [28] were able to identify agent clusters and detect the presence of global dynamics that would be challenging to notice visually.…”
Section: Introductionmentioning
confidence: 99%
“…We find similarities between the MCLEAN approach and topological data analysis (TDA). Analyzing the multidimensional spaces from a topological structure perspective, interpreting the persistent homology by calculating the number of connected components (b 0 from betti numbers) and using the persistence concept to define the optimal threshold of network representation prove that although the aims are distinct they share a same philosophy of analysis (Topaz, Ziegelmeier & Halverson, 2015). The MCLEAN method consists of four parts as illustrated in Fig.…”
Section: Methodsmentioning
confidence: 99%
“…These are subsequently combined in the tree representation called barcode-tree, which is inspired by both a clustering dendrogram and barcode representation (Topaz, Ziegelmeier & Halverson, 2015) as used in topological data analysis.…”
Section: Barcode-treementioning
confidence: 99%
“…Suppose we have a finite set of data points from a sampling of the underlying topological space. We measure data homology by creating connections between nearby data points, varying the scale over which these connections are made (= filtration parameter), and looking for features that persist across scales [26,27]. This can be achieved by building the Vietoris-Rips complex from all pairwise distances between points in the dataset.…”
Section: Persistence Homologymentioning
confidence: 99%