Signed DeGroot-Friedkin Dynamics with Interdependent Topics
For researchers in social network dynamics, this work provides a theoretical framework for understanding how antagonism and topic interdependence shape social power evolution, extending prior results to signed networks.
This paper extends DeGroot-Friedkin dynamics to signed influence networks with interdependent topics, providing a complete classification of limiting social power configurations into pluralistic, mixed, and vertex-dominant types, all globally convergent.
This paper investigates DeGroot-Friedkin (DF) dynamics over signed influence networks with interdependent topics. We propose a multi-topic signed framework that combines repelling interpersonal interactions with cross-issue self-appraisal, examining how antagonism and topic interdependence shape the evolution of agent-level social power. When the logic matrices (for topic interdependence) of all agents share a common dominant left eigenvector, we identify structural conditions under which the original dynamics admit an exact reduction to an explicit scalar DF map. This yields a complete classification of limiting social power configurations into pluralistic, mixed, and vertex-dominant types. In all three cases, the dynamics are globally convergent, and in the first two the ordering induced by the interaction centrality is preserved. We further show local robustness under small heterogeneous perturbations of the logic matrices. We also clarify what changes when this common-eigenvector structure is lost. These results extend signed social power dynamics beyond the standard nonnegative scalar setting and shed light on the robustness and scope of centrality-based social power formation in multi-topic signed influence systems.