On the symmetry of evidential support

Abstract

For events A and B, we have \[ P(A B) > P(A B) P(B A) > P(B A) \] whenever all four quantities are defined. In other words, B is evidence for A if and only if A is evidence for B. This note gives seven different proofs of this fact -- by cross-multiplication, covariance, coupling parameters, odds ratios, pointwise mutual information, combinatorial double counting, and mixed discrete derivatives -- and develops a surrounding web of interpretations. Once the marginals P(A) and P(B) are fixed, a 2× 2 table has only one degree of freedom, so every scalar notion of positive association must be governed by the same signed parameter.

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