The eigenvalue spectrum of a large real antisymmetric random matrix with non-zero mean
Abstract
We study the eigenvalue spectrum of a large real antisymmetric random matrix Jij. Using a fermionic approach and replica trick, we obtain a semicircular spectrum of eigenvalues when the mean value of each matrix element is zero, and in the case of a non-zero mean, we show that there is a set of critical finite mean values above which eigenvalues arise that are split off from the semicircular continuum of eigenvalues. The result converged with numerical simulations.
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