Signed and Unsigned Partial Information Decompositions of Continuous Network Interactions
Abstract
We investigate the partial information decomposition (PID) framework as a tool for edge nomination. We consider both the Imin and IPM PIDs, from arXiv:1004.2515 and arXiv:1801.09010 respectively, and we both numerically and analytically investigate the utility of these frameworks for discovering significant edge interactions. In the course of our work, we extend both the Imin and IPM PIDs to a general class of continuous trivariate systems. Moreover, we examine how each PID apportions information into redundant, synergistic, and unique information atoms within the source-bivariate PID framework. Both our simulation experiments and analytic inquiry indicate that the atoms of the IPM PID have a non-specific sensitivity to high predictor-target mutual information, regardless of whether or not the predictors are truly interacting. By contrast, the Imin PID is quite specific, although simulations suggest that it lacks sensitivity.
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