On corrected Poisson approximations for sums of independent indicators

Abstract

Let Sn=I1+·s+In be a sum of independent indicators Ii, with pi=(Ii=1)=1-(Ii=0), i=1,…,n. It is well-known that the total variation distance between Sn and Zλ, where Zλ has a Poisson distribution with mean λ=Σi=1n pi, is typically of order Σi=1n pi2. In the present work we propose a class of corrected Poisson approximations, which enable the second order factorial moment distance (and hence, the total variation distance) to be bounded above by a constant multiple of Σi=1n pi3 and Σi=1n pi4, hence improving the order of approximation.