Global law of conjugate kernel random matrices with heavy-tailed weights
Abstract
We study the asymptotic spectral distribution of the conjugate kernel random matrix YY, where Y= f(WX) arises from a two-layer neural network model. We consider the setting where W and X are random rectangular matrices with i.i.d.\ entries, where the entries of W follow a heavy-tailed distribution, while those of X have light tails. Our assumptions on W include a broad class of heavy-tailed distributions, such as symmetric α-stable laws with α ∈ ]0,2[ and sparse matrices with O(1) nonzero entries per row. The activation function f, applied entrywise, is bounded, smooth, odd, and nonlinear. We compute the limiting eigenvalue distribution of YY through its moments and show that heavy-tailed weights induce strong correlations between the entries of Y, resulting in richer and fundamentally different spectral behavior compared to the light-tailed case.
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