A Characterization of the Normal Distribution by the Independence of a Pair of Random Vectors

Abstract

Kagan and Shalaevski 1967 have shown that if the random variables X1,…,Xn are independent and identically distributed and the distribution of Σi=1n(Xi+ai)2 ai∈ R depends only on Σi=1nai2 , then each Xi follows the normal distribution N(0, σ). Cook 1971 generalized this result replacing independence of all Xi by the independence of (X1,…, Xm) and (Xm+1,…,Xn ) and removing the requirement that Xi have the same distribution. In this paper, we will give other characterizations of the normal distribution which are formulated in a similar spirit.