Some notes on poisson limits for empirical point processes

Alexander's (1987, Ann. Probah. 15 178-203) central limit theorem for empirical processes on Vapnik-Cervonenkis classes of functions is extended to the case with non-Gaussian stable limits. The corresponding weak laws of large numbers are also established. \& 1993 Academic Press. Inc.

## Abstract Stochastic geometry models based on a stationary Poisson point process of compact subsets of the Euclidean space are examined. Random measures on ℝ^__d__^, derived from these processes using Hausdorff and projection measures are studied. The central limit theorem is formulated in a way

## Abstract Three variational statements for the slow time‐independent flow of a Navier‐Poisson fluid are derived. All of these statements are suitable as the bases of finite elements. The first statement is applied successfully to several flow situations.