Synergistic motifs in linear Gaussian systems

Higher-order interdependencies are central features of complex systems, yet a mechanistic explanation for their emergence remains elusive. For linear Gaussian systems of arbitrary dimension, we derive an expression for synergy-dominance in terms of signed network motifs in the system's correlation matrix. We prove that antibalanced correlational structures ensure synergy-dominance and further show that antibalanced triads in the dyadic interaction matrix of Ornstein-Uhlenbeck processes are necessary for synergy-dominance. Our results demonstrate that pairwise interactions alone can give rise to synergistic information in the absence of explicit higher-order mechanisms, and highlight structural balance theory as an instrumental conceptual framework to study higher-order interdependencies.