Large deviations principle for the largest eigenvalue of Wigner matrices without Gaussian tails
Abstract
We prove a large deviation principle for the largest eigenvalue of Wigner matrices without Gaussian tails, namely such that the distribution tails P( |X1,1|>t) and P(|X1,2|>t) behave like e-btα and e-atα respectively for some a,b∈ (0,+∞) and α∈ (0,2). The large deviation principle is of speed Nα/2 and with a good rate function depending only on the tail distribution of the entries.
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