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On extractable shared information

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abstract

We consider the problem of quantifying the information shared by a pair of random variables $X_{1},X_{2}$ about another variable $S$. We propose a new measure of shared information, called extractable shared information, that is left monotonic; that is, the information shared about $S$ is bounded from below by the information shared about $f(S)$ for any function $f$. We show that our measure leads to a new nonnegative decomposition of the mutual information $I(S;X_1X_2)$ into shared, complementary and unique components. We study properties of this decomposition and show that a left monotonic shared information is not compatible with a Blackwell interpretation of unique information. We also discuss whether it is possible to have a decomposition in which both shared and unique information are left monotonic.

fields

cs.LG 1

years

2026 1

verdicts

UNVERDICTED 1

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representative citing papers

DIPHINE: Diffusion-based $\Phi$-ID Neural Estimator

cs.LG · 2026-06-17 · unverdicted · novelty 8.0

DIPHINE is the first diffusion-based neural estimator for the 16 ΦID atoms in continuous non-Gaussian dynamical systems, obtained by joint MI estimation followed by Möbius inversion.

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  • DIPHINE: Diffusion-based $\Phi$-ID Neural Estimator cs.LG · 2026-06-17 · unverdicted · none · ref 6 · internal anchor

    DIPHINE is the first diffusion-based neural estimator for the 16 ΦID atoms in continuous non-Gaussian dynamical systems, obtained by joint MI estimation followed by Möbius inversion.