Pfaffian point process for the Gaussian real generalised eigenvalue problem
成果类型:
Article
署名作者:
Forrester, Peter J.; Mays, Anthony
署名单位:
University of Melbourne
刊物名称:
PROBABILITY THEORY AND RELATED FIELDS
ISSN/ISSBN:
0178-8051
DOI:
10.1007/s00440-011-0361-8
发表日期:
2012
页码:
1-47
关键词:
one-component plasma
characteristic-polynomials
matrix
摘要:
The generalised eigenvalues for a pair of N x N matrices (X (1), X (2)) are defined as the solutions of the equation det (X (1) - lambda X (2)) = 0, or equivalently, for X (2) invertible, as the eigenvalues of . We consider Gaussian real matrices X (1), X (2), for which the generalised eigenvalues have the rotational invariance of the half-sphere, or after a fractional linear transformation, the rotational invariance of the unit disk. In these latter variables we calculate the joint eigenvalue probability density function, the probability p (N,k) of finding k real eigenvalues, the densities of real and complex eigenvalues (the latter being related to an average over characteristic polynomials), and give an explicit Pfaffian formula for the higher correlation functions . A limit theorem for p (N,k) is proved, and the scaled form of is shown to be identical to the analogous limit for the correlations of the eigenvalues of real Gaussian matrices. We show that these correlations satisfy sum rules characteristic of the underlying two-component Coulomb gas.
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