Persistent Homology of Configuration Spaces of Trees

Abstract

Multiparameter persistence modules come up naturally in topological data analysis and topological robotics. Given a metric graph (X,δ), the second configuration space of (X,δ) with proximity parameters (for example, the minimum distance allowed between each pair of robots) can be interpreted as a collection of all possible configurations of two robots moving in (X,δ). In this project, we study the 2-parameter persistence modules associated with the second configuration spaces of the star graph (Stark, k≥ 3) and the generalized H-graph (Hm,n, m,n≥ 3) with the edge length parameter Le and the restraint parameter r. Moreover, we provide the indecomposable direct summands for each persistence module.

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