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We study sample covariance matrices arising from multi-level components of variance. Thus, let Bₙ=1N₉=₁NT₉^1/2xⱼxⱼTT₉^1/2, where xⱼ Rⁿ are i. i. d. standard Gaussian, and T₉=ₑ=₁ᵏl₉ₑ²ₑ are n n real symmetric matrices with bounded spectral norm, corresponding to k levels of variation. As the matrix dimensions n and N increase proportionally, we show that the linear spectral statistics (LSS) of Bₙ have Gaussian limits. The CLT is expressed as the convergence of a set of LSS to a standard multivariate Gaussian after centering by a mean vector ₙ and a covariance matrix ₙ which depend on n and N and may be evaluated numerically. Our work is motivated by the estimation of high-dimensional covariance matrices between phenotypic traits in quantitative genetics, particularly within nested linear random-effects models with up to k levels of randomness. Our proof builds on the Bai-Silverstein baisilverstein2004 martingale method with some innovation to handle the multi-level setting.
Xie et al. (Wed,) studied this question.