English

The many faces of multivariate information

Information Theory 2026-01-14 v1 math.IT

Abstract

Extracting higher-order structures from multivariate data has become an area of intensive study in complex systems science, as these multipartite interactions can reveal insights into fundamental features of complex systems like emergent phenomena. Information theory provides a natural language for exploring these interactions, as it elegantly formalizes the problem of comparing ``wholes" and ``parts" using joint, conditional, and marginal entropies. A large number of distinct statistics have been developed over the years, all aiming to capture different aspects of ``higher-order" information sharing. Here, we show that three of them (the dual total correlation, S-information, and O-information) are special cases of a more general function, Δk\Delta^{k} which is parameterized by a free parameter kk. For different values of kk, we recover different measures: Δ0\Delta^{0} is equal to the S-information, Δ1\Delta^{1} is equal to the dual total correlation, and Δ2\Delta^{2} is equal to the negative O-information. Generally, the Δk\Delta^{k} function is arranged into a hierarchy of increasingly high-order synergies; for a given value of kk, if Δk>0\Delta^{k}>0, then the system is dominated by interactions with order greater than kk, while if Δk<0\Delta^{k}<0, then the system is dominated by interactions with order lower than kk. Δk=0\Delta^{k}=0 if the system is composed entirely of synergies of order-k. Using the entropic conjugation framework, we also find that the conjugate of Δk\Delta^{k}, which we term Γk\Gamma^{k} is arranged into a similar hierarchy of increasingly high-order redundancies. These results provide new insights into the nature of both higher-order redundant and synergistic interactions, and helps unify the existing zoo of measures into a more coherent structure.

Keywords

Cite

@article{arxiv.2601.08030,
  title  = {The many faces of multivariate information},
  author = {Thomas F. Varley},
  journal= {arXiv preprint arXiv:2601.08030},
  year   = {2026}
}
R2 v1 2026-07-01T09:01:42.776Z