Key points are not available for this paper at this time.
Known results on the asymptotic behavior of the probability that the empirical distribution Pₙ of an i. i. d. sample X₁, , Xₙ belongs to a given convex set of probability measures, and new results on that of the joint distribution of X₁, , Xₙ under the condition Pₙ are obtained simultaneously, using an information-theoretic identity. The main theorem involves the concept of asymptotic quasi-independence introduced in the paper. In the particular case when Pₙ is the event that the sample mean of a V-valued statistic is in a given convex subset of V, a locally convex topological vector space, the limiting conditional distribution of (either) Xᵢ is characterized as a member of the exponential family determined by through the unconditional distribution PX, while X₁, , Xₙ are conditionally asymptotically quasi-independent.
Imre Csiszár (Wed,) studied this question.