RANDOM DISCRIMINANTS
成果类型:
Article
署名作者:
LU, IL; RICHARDS, D
署名单位:
University of Virginia
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/aos/1176349406
发表日期:
1993
页码:
1982-2000
关键词:
moment matrices
摘要:
Let X1, X2,...,X(n) be a random sample from a continuous univariate distribution F, and let DELTA = PI 1 less-than-or-equal-to i < j less-than-or-equal-to n(X(i) - X(j))2 denote the t, or square of the Vandermonde determinant, constructed from the random sample. The statistic DELTA arises in the study of moment matrices and inference for mixture distributions, the spectral theory of random matrices, control theory and statistical physics. In this paper, we study the probability distribution of DELTA. When X1,...,X(n) is a random sample from a normal, gamma or beta population, we use Selberg's beta integral formula to obtain stochastic representations for the exact distribution of DELTA. Further, we obtain stochastic bound s for DELTA in the normal and gamma cases. Using the theory of U-statistics, we derive the asymptotic distribution of DELTA under certain conditions on F.