Extreme Eigenvalues of Large Dimensional Quaternion Sample Covariance Matrix

Abstract

In this paper, we shall investigate the almost sure limits of the largest and smallest eigenvalues of a quaternion sample covariance matrix. Suppose that Xn is a p× n matrix whose elements are independent quaternion variables with mean zero, variance 1 and uniformly bounded fourth moments. Denote Sn=1n Xn Xn*. In this paper, we shall show that s( Sn)=sp( Sn)(1+ y)2, a.s. and s( Sn)(1- y)2,a.s. as n∞, where y= p/n, s1( Sn)·s sp( Sn) are the eigenvalues of Sn, s( Sn)=sp-n+1( Sn) when p>n and s( Sn)=s1( Sn) when p n. We also prove that the set of conditions are necessary for s( Sn)(1+ y)2, a.s. when the entries of Xn are i. i. d.