Extended Persistent Homology Distinguishes Simple and Complex Contagions with High Accuracy

TL;DR

This paper introduces a topological data analysis method called extended persistent homology (EPH) to accurately distinguish between simple and complex contagions in network data, overcoming observational challenges.

Contribution

The study demonstrates that EPH-based topological summaries can effectively classify contagion types and predict parameters, even with noisy or incomplete data.

Findings

EPH achieves high accuracy in classifying contagion types.

EPH-based models predict contagion parameters reliably.

Topological features correlate with contagion dynamics.

Abstract

The social contagion literature makes a distinction between simple (independent cascade or bond percolation processes that pass infections through edges) and complex contagions (bootstrap percolation or threshold processes that require local reinforcement to spread). However, distinguishing simple and complex contagions using observational data poses a significant challenge in practice. Estimating population-level activation functions from observed contagion dynamics is hindered by confounding factors that influence adoptions (other than neighborhood interactions), as well as heterogeneity in individual behaviors and modeling variations that make it difficult to design appropriate null models for inferring contagion types. Here, we show that a new tool from topological data analysis (TDA), called extended persistent homology (EPH), when applied to contagion processes over networks, can effectively detect simple and complex contagion processes, as well as predict their parameters. We train classification and regression models using EPH-based topological summaries computed on simulated simple and complex contagion dynamics on three real-world network datasets and obtain high predictive performance over a wide range of contagion parameters and under a variety of informational constraints, including uncertainty in model parameters, noise, and partial observability of contagion dynamics. EPH captures the role of cycles of varying lengths in the observed contagion dynamics and offers a useful metric to classify contagion models and predict their parameters. Analyzing geometrical features of network contagion using TDA tools such as EPH can find applications in other network problems such as seeding, vaccination, and quarantine optimization, as well as network inference and reconstruction problems.