Title :
Noncomputable Conditional Distributions
Author :
Ackerman, Nathanael L. ; Freer, Cameron E. ; Roy, Daniel M.
Author_Institution :
Dept. of Math., Harvard Univ., Cambridge, MA, USA
Abstract :
We study the computability of conditional probability, a fundamental notion in probability theory and Bayesian statistics. In the elementary discrete setting, a ratio of probabilities defines conditional probability. In more general settings, conditional probability is defined axiomatically, and the search for more constructive definitions is the subject of a rich literature in probability theory and statistics. However, we show that in general one cannot compute conditional probabilities. Specifically, we construct a pair of computable random variables (X, Y) in the unit interval whose conditional distribution P[Y|X] encodes the halting problem. Nevertheless, probabilistic inference has proven remarkably successful in practice, even in infinite-dimensional continuous settings. We prove several results giving general conditions under which conditional distributions are computable. In the discrete or dominated setting, under suitable computability hypotheses, conditional distributions are computable. Likewise, conditioning is a computable operation in the presence of certain additional structure, such as independent absolutely continuous noise.
Keywords :
Bayes methods; computability; inference mechanisms; probabilistic logic; probability; random processes; Bayesian statistics; computability; computable random variable pair; conditional probability; infinite dimensional continuous setting; noncomputable conditional distribution; probabilistic inference; Computer languages; Extraterrestrial measurements; Kernel; Probabilistic logic; Random variables; computable probability theory; conditional probability; probabilistic programming languages; real computation;
Conference_Titel :
Logic in Computer Science (LICS), 2011 26th Annual IEEE Symposium on
Conference_Location :
Toronto, ON
Print_ISBN :
978-1-4577-0451-2
Electronic_ISBN :
1043-6871
DOI :
10.1109/LICS.2011.49
