On the top eigenvalue of heavy-tailed random matrices
Abstract
We study the statistics of the largest eigenvalue lambdamax of N x N random matrices with unit variance, but power-law distributed entries, P(Mij)~ |Mij|-1-mu. When mu > 4, lambdamax converges to 2 with Tracy-Widom fluctuations of order N-2/3. When mu < 4, lambdamax is of order N2/mu-1/2 and is governed by Fr\'echet statistics. The marginal case mu=4 provides a new class of limiting distribution that we compute explicitely. We extend these results to sample covariance matrices, and show that extreme events may cause the largest eigenvalue to significantly exceed the Marcenko-Pastur edge. Connections with Directed Polymers are briefly discussed.
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