Prior probability

"Prior probability", "prior odds", or just "prior" refers to a state of belief that obtained before seeing a piece of new evidence. Suppose there are two suspects in a murder, Colonel Mustard and Miss Scarlet. After determining that the victim was poisoned, you think Mustard and Scarlet are respectively 25% and 75% likely to have committed the murder. Before determining that the victim was poisoned, perhaps, you thought Mustard and Scarlet were equally likely to have committed the murder (50% and 50%). In this case, your "prior probability" of Miss Scarlet committing the murder was 50%, and your "posterior probability" after seeing the evidence was 75%.

The prior probability of a hypothesis $H$ is often being written with the unconditioned notation $P\left(H\right)$, while the posterior after seeing the evidence $e$ is often being denoted by the conditional probability $P(H\mid e).$^[1]

For questions about how priors are "ultimately" determined, see Solomonoff induction.

1. ^{^︎}

   E. T. Jaynes was known to insist on using the explicit notation $P(H\mid I_0)$ to denote the prior probability of $H$, with $I_0$ denoting the prior, and never trying to write any entirely unconditional probability $P\left(X\right)$. Since, said Jaynes, we always have some prior information.