Linear spectral statistics of sequential sample covariance matrices

Abstract

Independent p-dimensional vectors with independent complex or real valued entries such that E [xi] = 0, Var (xi) = Ip, i=1, …,n, let T n be a p × p Hermitian nonnegative definite matrix and f be a given function. We prove that an approriately standardized version of the stochastic process ( tr ( f(Bn,t) ) )t ∈ [t0, 1] corresponding to a linear spectral statistic of the sequential empirical covariance estimator ( Bn,t )t∈ [ t0 , 1] = ( 1n Σi=1 n t T 1/2n xi xi T 1/2n )t∈ [ t0 , 1] converges weakly to a non-standard Gaussian process for n,p∞. As an application we use these results to develop a novel approach for monitoring the sphericity assumption in a high-dimensional framework, even if the dimension of the underlying data is larger than the sample size.