Statistical properties of many-particle spectra V. Fluctuations and symmetries

[1]  Pandey,et al.  Symmetries and quantum chaos: Time-reversal invariance in the nucleon-nucleon interaction. , 1987, Physical review letters.

[2]  Michael V Berry,et al.  Statistics of energy levels without time-reversal symmetry: Aharonov-Bohm chaotic billiards , 1986 .

[3]  Pandey,et al.  Bound on time-reversal noninvariance in the nuclear Hamiltonian. , 1985, Physical review letters.

[4]  Pandey,et al.  Higher-order correlations in spectra of complex systems. , 1985, Physical review letters.

[5]  O. Bohigas,et al.  Characterization of chaotic quantum spectra and universality of level fluctuation laws , 1984 .

[6]  J. B. French,et al.  Nuclear level densities and partition functions with interactions , 1983 .

[7]  M. L. Mehta,et al.  Gaussian ensembles of random hermitian matrices intermediate between orthogonal and unitary ones , 1983 .

[8]  M. L. Mehta,et al.  Spacing distributions for some Gaussian ensembles of Hermitian matrices , 1983 .

[9]  M. L. Mehta,et al.  On some Gaussian ensembles of Hermitian matrices , 1983 .

[10]  J. B. French Statistical nuclear spectroscopy , 1983 .

[11]  O. Bohigas,et al.  Fluctuation properties of nuclear energy levels: Do theory and experiment agree? , 1982 .

[12]  R. Macklin,et al.  Statistical properties of complex states of /sup 67//sub 30/Zn , 1981 .

[13]  M. L. Mehta,et al.  A method of integration over matrix variables , 1981 .

[14]  P. A. Mello,et al.  Random matrix physics: Spectrum and strength fluctuations , 1981 .

[15]  A. Pandey Statistical properties of many-particle spectra. IV. New ensembles by Stieltjes transform methods☆ , 1981 .

[16]  B. Berman Neutron-Capture Cross Sections for Osmium Isotopes and the Age of the Universe , 1981 .

[17]  V. Tikku,et al.  Neutron widths and level spacings of 64 Zn+n , 1981 .

[18]  J. F. McDonald Some mathematically simple ensembles of random matrices which represent Hamiltonians with a small time-reversal-noninvariant part , 1980 .

[19]  A. Pandey Statistical properties of many-particle spectra : III. Ergodic behavior in random-matrix ensembles , 1979 .

[20]  C. Coceva,et al.  Experimental aspects of the statistical theory of nuclear spectra fluctuations , 1979 .

[21]  N. W. Hill,et al.  Spin determination of resonance structure in (/sup 235/U + n) below 25 keV , 1978 .

[22]  P. A. Mello,et al.  Statistical properties of many-particle spectra. II. Two-point correlations and fluctuations☆ , 1978 .

[23]  H. Camarda Upper limit on a time reversal noninvariant part of Wigner's random matrix model , 1976 .

[24]  J. B. French,et al.  Statistical properties of many-particle spectra , 1975 .

[25]  G. Mitchell,et al.  Applications of statistical tests to proton resonances in 45Sc and 49V , 1975 .

[26]  U. N. Singh,et al.  Neutron resonance spectroscopy: The separated isotopes of Dy , 1975 .

[27]  W. W. Havens,et al.  Neutron resonance spectroscopy: Gd 1 5 4 , 1 5 8 , 1 6 0 , 1974 .

[28]  F. Rahn,et al.  Neutron resonance spectroscopy. XV. The separated isotopes of Cd , 1974 .

[29]  S. Wynchank,et al.  Neutron resonance spectroscopy. XII. The separated isotopes of W , 1973 .

[30]  S. Wynchank,et al.  Neutron Resonance Spectroscopy. XI. The Separated Isotopes of Yb , 1973 .

[31]  J. B. French,et al.  Level-density fluctuations and two-body versus multi-body interactions☆ , 1972 .

[32]  F. Rahn,et al.  NEUTRON RESONANCE SPECTROSCOPY. X. $sup 232$Th AND $sup 238$U. , 1972 .

[33]  S. Wynchank,et al.  Neutron-Resonance Spectroscopy. VIII. The Separated Isotopes of Erbium: Evidence for Dyson's Theory Concerning Level Spacings , 1972 .

[34]  M. L. Mehta,et al.  A note on correlations between eigenvalues of a random matrix , 1971 .

[35]  M. L. Mehta,et al.  Distribution laws for the roots of a random antisymmetric hermitian matrix , 1968 .

[36]  M. L. Mehta,et al.  Perturbation of the statistical properties of nuclear states and transitions by interactions that are odd under time reversal , 1968 .

[37]  J. F. McDonald,et al.  Possibility of Detecting a Small Time-Reversal-Noninvariant Term in the Hamiltonian of a Complex System by Measurements of Energy-Level Spacings , 1967 .

[38]  F. Dyson A Brownian‐Motion Model for the Eigenvalues of a Random Matrix , 1962 .

[39]  Freeman J. Dyson,et al.  The Threefold Way. Algebraic Structure of Symmetry Groups and Ensembles in Quantum Mechanics , 1962 .

[40]  C. Porter,et al.  "Repulsion of Energy Levels" in Complex Atomic Spectra , 1960 .

[41]  C. Porter,et al.  Fluctuations of Nuclear Reaction Widths , 1956 .

[42]  J. Scott,et al.  CXLVIII. Neutron-widths and the density of nuclear levels , 1954 .

[43]  L. Pastur On the spectrum of random matrices , 1972 .

[44]  W. W. Havens,et al.  Neutron Resonance Spectroscopy. IX. The Separated Isotopes of Samarium and Europium , 1972 .

[45]  F. Dyson Correlations between eigenvalues of a random matrix , 1970 .

[46]  J. F. McDonald On the Width Distribution for a Complex System Whose Hamiltonian Contains a Small Interaction That Is Odd under Time‐Reversal , 1969 .

[47]  E. Wigner Random Matrices in Physics , 1967 .

[48]  F. Dyson Statistical Theory of the Energy Levels of Complex Systems. I , 1962 .