Characterizations of Conditional Mutual Independence: Equivalence and Implication
Abstract
Conditional independence, and more generally conditional mutual independence, are central notions in probability theory. In their general forms, they include functional dependence as a special case. In this paper, we tackle two fundamental problems related to conditional mutual independence. Let K and K' be two conditional mutual independncies (CMIs) defined on a finite set of discrete random variables. We have obtained a necessary and sufficient condition for i) K is equivalent to K'; ii) K implies K'. These characterizations are in terms of a canonical form introduced for conditional mutual independence.
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