Abstract
Consider the sample covariance matrices of form $$W=n^{-1}C C^{\top }$$ , where C is a $$k\times n$$ matrix with real-valued, independent and identically distributed (i.i.d.) mean zero entries. When the squares of the i.i.d. entries have finite exponential moments, the moderate deviations for the extreme eigenvalues of W are investigated as $$n\rightarrow \infty $$ and either k is fixed or $$k\rightarrow \infty $$ with some suitable growth conditions. The moderate deviation rate function reveals that the right (left) tail of $$\lambda _{\max }$$ is more like Gaussian rather than the Tracy–Widom type distribution when k goes to infinity slowly.
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