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Gaussian Fluctuation in Random Matrices

chao-dyn 2009-10-22 v1 Chaotic Dynamics

Abstract

Let N(L)N(L) be the number of eigenvalues, in an interval of length LL, of a matrix chosen at random from the Gaussian Orthogonal, Unitary or Symplectic ensembles of N{\cal N} by N{\cal N} matrices, in the limit N{\cal N}\rightarrow\infty. We prove that [N(L)N(L)]/logL[N(L) - \langle N(L)\rangle]/\sqrt{\log L} has a Gaussian distribution when LL\rightarrow\infty. This theorem, which requires control of all the higher moments of the distribution, elucidates numerical and exact results on chaotic quantum systems and on the statistics of zeros of the Riemann zeta function. \noindent PACS nos. 05.45.+b, 03.65.-w

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Cite

@article{arxiv.chao-dyn/9412004,
  title  = {Gaussian Fluctuation in Random Matrices},
  author = {Ovidiu Costin and Joel L. Lebowitz},
  journal= {arXiv preprint arXiv:chao-dyn/9412004},
  year   = {2009}
}

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13 pages