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On the Existence of Moments of Ratios of Quadratic Forms

Published online by Cambridge University Press:  11 February 2009

Abstract

We obtain simple and generally applicable conditions for the existence of mixed moments E([XAX]″/[XBX]U) of the ratio of quadratic forms T = XAX/XBX where A and B are n × n symmetric matrices and X is a random n-vector. Our principal theorem is easily stated when X has an elliptically symmetric distribution, which class includes the multivariate normal and t distributions, whether degenerate or not. The result applies to the ratio of multivariate quadratic polynomials and can be expected to remain valid in most situations in which X is subject to linear constraints.

If uv, the precise distribution of X, and in particular the existence of moments of X, is virtually irrelevant to the existence of the mixed moments of T; if u > v, a prerequisite for existence of the (u, v)th mixed moment is the existence of the 2(uv)th moment of X When Xis not degenerate, the principal further requirement for the existence of the mixed moment is that B has rank exceeding 2v.

Type
Research Article
Copyright
Copyright © Cambridge University Press 1995

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