conjugatepriorit

Conjugatepriorit is a term used to describe a theoretical framework and practical approach within Bayesian statistics that focuses on the use of conjugate prior distributions to enable analytic posterior updates. In this view, a prior is conjugate to a likelihood if the resulting posterior is in the same distribution family as the prior, with updated parameters obtained through simple, closed-form rules. Conjugatepriorit studies the conditions under which conjugacy holds, how to select conjugate priors to reflect prior knowledge, and how conjugacy interacts with data summaries such as sufficient statistics. It also extends to hierarchical models, where conjugacy can be preserved across levels, yielding tractable posterior updates in complex models.

Common examples illustrate the idea: a Beta prior for a binomial likelihood yields a Beta posterior; a

Applications of conjugatepriorit include online learning, sequential Bayesian updating, and probabilistic programs where closed-form posteriors improve

As a concept, conjugatepriorit sits at the intersection of model design, inference tractability, and prior specification