Circular law for the sum of random permutation matrices
Abstract
Let Pn1,…, Pnd be n× n permutation matrices drawn independently and uniformly at random, and set Snd:=Σ=1d Pn. We show that if 12n/( n)4 d=O(n), then the empirical spectral distribution of Snd/d converges weakly to the circular law in probability as n ∞.
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