Sufficient Statistics and Split Idempotents in Discrete Probability Theory
Abstract
A sufficient statistic is a deterministic function that captures an essential property of a probabilistic function (channel, kernel). Being a sufficient statistic can be expressed nicely in terms of string diagrams, as Tobias Fritz showed recently, in adjoint form. This reformulation highlights the role of split idempotents, in the Fisher-Neyman factorisation theorem. Examples of a sufficient statistic occur in the literature, but mostly in continuous probability. This paper demonstrates that there are also several fundamental examples of a sufficient statistic in discrete probability. They emerge after some combinatorial groundwork that reveals the relevant dagger split idempotents and shows that a sufficient statistic is a deterministic dagger epi.
Keywords
Cite
@article{arxiv.2212.09191,
title = {Sufficient Statistics and Split Idempotents in Discrete Probability Theory},
author = {Bart Jacobs},
journal= {arXiv preprint arXiv:2212.09191},
year = {2023}
}