Laws of Large Numbers for Information Resolution

Abstract

Laws of large numbers establish asymptotic guarantees for recovering features of a probability distribution using independent samples. We introduce a framework for proving analogous results for recovery of the σ-field of a probability space, interpreted as information resolution--the granularity of measurable events given by comparison to our samples. Our main results show that, under iid sampling, the Borel σ-field in Rd and in more general metric spaces can be recovered in the strongest possible mode of convergence. We also derive finite-sample L1 bounds for uniform convergence of σ-fields on [0,1]d. We illustrate the use of our framework with two applications: constructing randomized solutions to the Skorokhod embedding problem, and analyzing the loss of variants of random forests for regression.