Dimorphic properties of Bernoulli random variable


Taekyun Kim, San Kim, Hyunseok Lee, Seong-Ho Park




The aim of this paper is to study a dimorphic property associated with two different sums of identically independent Bernoulli random variables having two different families of probability mass functions. In addition, we give two expressions on sums of products of degenerate Stirling numbers of the second kind and Stirling numbers of the first kind connected with those two different sums of identically independent Bernoulli random variables.