Hostname: page-component-6d856f89d9-fb4gq Total loading time: 0 Render date: 2024-07-16T04:23:33.990Z Has data issue: false hasContentIssue false
  • English
  • Français

Functional Forms of Characteristic Functions and Characterizations of Multivariate Distributions

Published online by Cambridge University Press:  11 February 2009

Yasuko Chikuse
Yasuko Chikuse
Affiliation:
Kagawa University, Japan
Get access Rights & Permissions [Opens in a new window]

Abstract

During the Oxford Conference of the Econometric Society in 1936, Ragnar Frisch proposed a problem of characterization of distributions based on the property of linear regression of one linear function of random variables on the other. This problem has been solved, partially by Allen [1], and then completely by Rao [24,25], Fix [7], and Laha [13] relaxing the conditions imposed on the component random variables. The purpose of this paper is to solve the above mentioned problem for the multivariate case, characterizing multivariate distributions based on the multivariate linear regression of one linear function of not necessarily i.i.d. random vectors with matrix coefficients on the other. We make some mild assumptions concerning the component random vectors and the related constant matrices. It is shown that the property of multivariate linear regression yields a system of partial differential equations (p.d.e.'s) satisfied by the characteristic functions of the component random vectors. A general solution of this system of p.d.e.'s is given by certain functional forms. Special cases of the general solution give characterizations of the “multivariate generalized stable laws” and the multivariate semistable laws, and a method is presented to characterize the multivariate stable laws.

Type
Articles
Information
Econometric Theory , Volume 6 , Issue 4 , December 1990 , pp. 445 - 458
Copyright
Copyright © Cambridge University Press 1990

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

1.Allen, H.V.A theorem concerning the linearity of regression. Statistical Research Memorandum 2 (1938): 6068.Google Scholar
2.Bellman, R. Introduction to matrix analysis, 2nd ed., New York: McGraw-Hill, 1970.Google Scholar
3.Courant, R. & Hilbert, D.. Methods of mathematical physics. Vol. II. Partial differential equations. New York: Wiley, 1962.Google Scholar
4.Darmois, G.Analyse gendrale des liaisons stochastiques. Review of the Institute of International Statistics 21 (1953): 28.Google Scholar
5.De Silva, B.M.A class of multivariate symmetric stable distributions. Journal of Multivariate Analysis 8 (1978): 335345.Google Scholar
6.Eaton, M.L. & Pathak, P.K.. A characterization of the normal law on Hilbert space. Sankhya A 31 (1969): 259268.Google Scholar
7.Fix, E. Distributions which lead to linear regressions. In Proceedings of the first Berkeley symposium of mathematical statistics and probability, pp. 7991. Berkeley: University of California Press, 1949.Google Scholar
8.Kagan, A.M., Linnik, Yu. V., & Rao, C.R.. Characterization problems in mathematical statistics. U.S.S.R. Academy of Sciences (English translation). New York: Wiley, 1973.Google Scholar
9.Khatri, C.G.On characterizations of gamma and multivariate normal distributions by solving some functional equations in vector variables. Journal of Multivariate Analysis 1 (1971): 7089.CrossRefGoogle Scholar
10.Khatri, C.G.Characterizations of multivariate normality. II. Through Linear regressions. Journal of Multivariate Analysis 9 (1979): 589598.Google Scholar
11.Khatri, C.G. & Rao, C.R.. Characterizations of multivariate normality. I. Through independence of some statistics. Journal of Multivariate Analysis 6 (1976): 8194.CrossRefGoogle Scholar
12.Kumar, A.Semi-stable probability measures on Hilbert spaces. Journal of Multivariate Analysis 6 (1976): 309318.Google Scholar
13.Laha, R.G.On a characterization of the stable law with finite expectation. Annals of Mathematical Statistics 27 (1956): 187195.CrossRefGoogle Scholar
14.Laha, R.G.On some characterization problems connected with linear structural relations. Annals of Mathematical Statistics 28 (1957): 405414.CrossRefGoogle Scholar
15.Laha, R.G.Semistable measures on a Hilbert space. Journal of Multivariate Analysis 10 (1980): 8894.Google Scholar
16.Levy, P.Theorie de l'addition des variables aleatoires. Gauthier-Villars, 1937, 1954.Google Scholar
17.Lukacs, E.Some multivariate statistical characterization theorems. Journal of Multivariate Analysis 9 (1979): 278287.CrossRefGoogle Scholar
18.Lukacs, E. & Laha, R.G.. Applications of characteristic functions. London: Griffin, 1964.Google Scholar
19.Mathai, A.M. & Pederzoli, G.. Characterizations of the normal probability law. New Delhi: Wiley Eastern Ltd., 1977.Google Scholar
20.Paulauskas, V. J.Some remarks on multivariate stable distributions. Journal of Multivariate Analysis 6 (1976): 356368.Google Scholar
21.Pillai, R.N.Semi stable laws as limit distributions. Annals of Mathematical Statistics 42 (1971): 780783.Google Scholar
22.Press, S.J.Multivariate stable distributions. Journal of Multivariate Analysis 2 (1972): 444462.CrossRefGoogle Scholar
23.Ramachandran, B. & Rao, C.R.. Some results on characterizations of the normal and generalized stable laws. Sankhya A 30 (1968): 125140.Google Scholar
24.Rao, C.R.Note on a problem of Ragnar Frisch. Econometrica 15 (1947): 245249.Google Scholar
25.Rao, C.R.A correction to “Note on a problem of Ragnar Frisch.” Econometrica 17 (1949): 212.CrossRefGoogle Scholar
26.Rao, C.R.Linear statistical inference and its applications. New York: Wiley, 1968.Google Scholar
27.Rao, C.R. Functional equations and characterizations of probability distributions. In Proceedings of the international congress of mathematics, Vancouver, 1974, pp. 163168. Canadian Mathematical Congress, 1975.Google Scholar
28.Rao, C.R. Inaugural Linnik memorial lecture–Some problems in the characterization of the multivariate normal distribution. In Patil, G.P., Kotz, S., and Ord, J.K. (eds.), Statistical distributions in scientific work, Vol. 3, pp. 113. Dordrecht-Holland: D. Reidel Publishing Company, 1975.Google Scholar
29.Sato, K.Infinitely divisible distributions. Seminar on Probability, Vol. 52 (In Japanese), 1981.Google Scholar
30.Sharpe, M.Operator-stable distributions on vector groups. Transactions of the American Mathematical Society 136 (1969): 5165.CrossRefGoogle Scholar