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Wigner's Semicircle Law

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Let V be a real symmetric matrix of large order N having random elements v_(ij) that for i<=j are independently distributed with equal densities, equal second moments m^2, and nth moments bounded by constants B_n independent of i, j, and N. Further, let S=S_(alpha,beta)(v,N) be the number of eigenvalues of V that lie in the interval (alphaN^(1/2),betaN^(1/2)) for real alpha<beta. Then

lim_(N->infty)(E(S))/N=1/(2pim^2)int_alpha^betasqrt(4m^2-x^2)dx

(Wigner 1955, 1958). This law was first observed by Wigner (1955) for certain special classes of random matrices arising in quantum mechanical investigations.

SemicircleLaw

The distribution of eigenvalues of a symmetric random matrix with entries chosen from a standard normal distribution is illustrated above for a random 5000×5000 matrix.

Note that a large real symmetric matrix with random entries taken from a uniform distribution also obeys the semicircle law with the exception that it also possesses exactly one large eigenvalue.

See also

Eigenvalue, Girko's Circular Law, Random Matrix

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References

Alon, N.; Krivelevich, M.; and Vu, V. H. "On the Concentration of Eigenvalues of Random Symmetric Matrices." Israel J. Math. 131, 259-267, 2002.Arnold, L. "On Wigner's Semicircle Law for the Eigenvalues of Random Matrices." Z. Wahrscheinlichkeitstheorie und Verw. Gebiete 19, 191-198, 1971.Bai, Z. D. and Yin, Y. Q. "Convergence to the Semicircle Law." Ann. Probab. 16, 863-875, 1988.Götze, F. and Tikhomirov, A. "Rate of Convergence to the Semi-Circular Law." Probab. Theory Related Fields 127, 228-276, 2003.Kiessling, M. K.-H. and Spohn, H. "A Note on the Eigenvalue Density of Random Matrices." Comm. Math. Phys. 199, 683-695, 1999.Ryan, Ø. "On the Limit Distributions of Random Matrices with Independent or Free Entries." Comm. Math. Phys. 193, 595-626, 1998.Voiculescu, D. "Limit Laws for Random Matrices and Free Products." Invent. Math. 104, 201-220, 1991.Wigner, E. "Characteristic Vectors of Bordered Matrices with Infinite Dimensions." Ann. of Math. 62, 548-564, 1955.Wigner, E. "On the Distribution of the Roots of Certain Symmetric Matrices." Ann. of Math. 67, 325-328, 1958.

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Wigner's Semicircle Law

Cite this as:

Weisstein, Eric W. "Wigner's Semicircle Law." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/WignersSemicircleLaw.html

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