Edgeworth expansion for Bernoulli weighted mean

Abstract

In this work, we derive an Edgeworth expansion for the Bernoulli weighted mean μ = Σi=1n Yi TiΣi=1n Ti in the case where Y1, …, Yn are i.i.d. non semi-lattice random variables and T1, …, Tn are Bernoulli distributed random variables with parameter p. We also define the notion of a semi-lattice distribution, which gives a more geometrical equivalence to the classical Cram\'er's condition in dimensions bigger than 1. Our result provides a first step into the generalization of classical Edgeworth expansion theorems for random vectors that contain both semi-lattice and non semi-lattice variables, in order to prove consistency of bootstrap methods in more realistic setups, for instance in the use case of online AB testing.