English

Reconsidering unique information: Towards a multivariate information decomposition

Information Theory 2015-03-05 v1 math.IT

Abstract

The information that two random variables YY, ZZ contain about a third random variable XX can have aspects of shared information (contained in both YY and ZZ), of complementary information (only available from (Y,Z)(Y,Z) together) and of unique information (contained exclusively in either YY or ZZ). Here, we study measures SI~\widetilde{SI} of shared, UI~\widetilde{UI} unique and CI~\widetilde{CI} complementary information introduced by Bertschinger et al., which are motivated from a decision theoretic perspective. We find that in most cases the intuitive rule that more variables contain more information applies, with the exception that SI~\widetilde{SI} and CI~\widetilde{CI} information are not monotone in the target variable XX. Additionally, we show that it is not possible to extend the bivariate information decomposition into SI~\widetilde{SI}, UI~\widetilde{UI} and CI~\widetilde{CI} to a non-negative decomposition on the partial information lattice of Williams and Beer. Nevertheless, the quantities UI~\widetilde{UI}, SI~\widetilde{SI} and CI~\widetilde{CI} have a well-defined interpretation, even in the multivariate setting.

Keywords

Cite

@article{arxiv.1404.3146,
  title  = {Reconsidering unique information: Towards a multivariate information decomposition},
  author = {Johannes Rauh and Nils Bertschinger and Eckehard Olbrich and Jürgen Jost},
  journal= {arXiv preprint arXiv:1404.3146},
  year   = {2015}
}

Comments

5 pages, 1 figure, submitted to ISIT 2014

R2 v1 2026-06-22T03:48:55.430Z