Largest Eigenvalues of Principal Minors of Deformed Gaussian Orthogonal Ensembles and Wishart Matrices
Abstract
Consider a high-dimensional Wishart matrix W=XTX where the entries of X are i.i.d. random variables with mean zero, variance one, and a finite fourth moment η. Motivated by problems in signal processing and high-dimensional statistics, we study the maximum of the largest eigenvalues of any two-by-two principal minors of W. Under certain restrictions on the sample size and the population dimension of W, we obtain the limiting distribution of the maximum, which follows the Gumbel distribution when η is between 0 and 3, and a new distribution when η exceeds 3. To derive this result, we first address a simpler problem on a new object named a deformed Gaussian orthogonal ensemble (GOE). The Wishart case is then resolved using results from the deformed GOE and a high-dimensional central limit theorem. Our proof strategy combines the Stein-Poisson approximation method, conditioning, U-statistics, and the H\'ajek projection. This method may also be applicable to other extreme-value problems. Some open questions are posed.
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