A Remark on the Assumptions of Bayes' Theorem

Abstract

We formulate simple equivalent conditions for the validity of Bayes' formula for conditional densities. We show that for any random variables X and Y (with values in arbitrary measurable spaces), the following are equivalent: 1. X and Y have a joint density w.r.t. a product measure μ x , 2. PX,Y << PX x PY, (here P. denotes the distribution of .) 3. X has a conditional density p(x | y) w.r.t. a sigma-finite measure μ, 4. X has a conditional distribution PX|Y such that PX|y << PX for all y, 5. X has a conditional distribution PX|Y and a marginal density p(x) w.r.t. a measure μ such that PX|y << μ for all y. Furthermore, given random variables X and Y with a conditional density p(y | x) w.r.t. and a marginal density p(x) w.r.t. μ, we show that Bayes' formula p(x | y) = p(y | x)p(x) / ∫ p(y | x)p(x)dμ(x) yields a conditional density p(x | y) w.r.t. μ if and only if X and Y satisfy the above conditions. Counterexamples illustrating the nontriviality of the results are given, and implications for sequential adaptive estimation are considered.