If a hypothesis K is a collection (discrete, countable, or infinite) of hypotheses, in statistics, we say that K is a
composite hypothesis. Bayes tests involving composite hypotheses are common. Probably the most common is the test of a null hypothesis, H₀, that the mean of a distribution θ=0, vs an alternative hypothesis, H₁, that θ≠0. Since, under H₁, θ can be any real number except 0, H₁ is a composite hypothesis comprising an infinite set of simple hypotheses under each of which θ equals a different non-zero number.
If E is the data, then we calculate the single number P(E|H₁), called the
marginal likelihood of H₁, as:
P(E|H₁) = ∫θ P(E|θ, H₁) p(θ|H₁) dθ ,
where p(θ|H₁) is the prior probability density of θ under H₁.
Similarly, if H₁ comprises a finite or countable set of hypotheses H
1i, i=1,2,... , we calculate P(E|H₁) as
P(E|H₁) = Σ
i P(E|θ,
P(E|H₁) = Σi P(E|θ, H1i) p(θ|H1i) .
) p(θ|H
1i) .
Thus, if Jabba's ~H is a composite hypothesis, he can represent its likelihood by the single number P(E|~H) if he can formulate P(E|~H) as a weighted average of simple hypotheses whose weights are their conditional prior probabilities given ~H.
