Social Stability and Extended Social Balance - Quantifying the Role of Inactive Links in Social Networks

TL;DR

This paper extends social balance theory by including inactive links, introduces a Hamiltonian model for triadic relationships, and demonstrates its applicability to political and online game networks, revealing hierarchical and universal properties.

Contribution

It introduces a novel framework incorporating inactive links into social balance analysis and develops a Hamiltonian model for empirical network analysis.

Findings

Persistent hierarchy in triadic energy levels

Universal data collapse observed across networks

Model predicts transition probabilities between triadic states

Abstract

Structural balance in social network theory starts from signed networks with active relationships (friendly or hostile) to establish a hierarchy between four different types of triadic relationships. The lack of an active link also provides information about the network. To exploit the information that remains uncovered by structural balance, we introduce the inactive relationship that accounts for both neutral and nonexistent ties between two agents. This addition results in ten types of triads, with the advantage that the network analysis can be done with complete networks. To each type of triadic relationship, we assign an energy that is a measure for its average occupation probability. Finite temperatures account for a persistent form of disorder in the formation of the triadic relationships. We propose a Hamiltonian with three interaction terms and a chemical potential (capturing the cost of edge activation) as an underlying model for the triadic energy levels. Our model is suitable for empirical analysis of political networks and allows to uncover generative mechanisms. It is tested on an extended data set for the standings between two classes of alliances in a massively multi-player on-line game (MMOG) and on real-world data for the relationships between countries during the Cold War era. We find emergent properties in the triadic relationships between the nodes in a political network. For example, we observe a persistent hierarchy between the ten triadic energy levels across time and networks. In addition, the analysis reveals consistency in the extracted model parameters and a universal data collapse of a derived combination of global properties of the networks. We illustrate that the model has predictive power for the transition probabilities between the different triadic states.