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Cumulants and partition lattices II: generalised k-statistics

Published online by Cambridge University Press:  09 April 2009

T. P. Speed
T. P. Speed
Affiliation:
Division of Mathematics and Statistics, CSIRO Box 1965 GPO, Canberra, A.C.T. 2601, Australia
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Abstract

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The role played by the Möbius function of the lattice of all partitions of a set in the theory of k-statistics and their generalisations is pointer out and the main results conscerning these statistics are drived. The definitions and formulae for the expansion of products of generalished k-statistics are presented from this viewpoint and applied to arrays of random variables whos moments satisfy stitable symmentry constraints. Applications of the theory are given including the calculation of (joint) cumulants of k-statistics, the minimum variace estimation of (generalised) moments and the asymptotic behaviour of generalised k-statistics viewed as (reversed) martingales.

Information

Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 40 , Issue 1 , February 1986 , pp. 34 - 53
Copyright
Copyright © Australian Mathematical Society 1986

References

Aigner, M. (1979), Combinatorial theory (Springer-Verlag, New York).CrossRefGoogle Scholar
Carney, E. J. (1968), ‘Relationship of generalised polykays to unrestricted sums for balanced complete finite populations’, Ann. Statist. 39, 643656.CrossRefGoogle Scholar
Chow, Yuan Shih and Teicher, Henry (1978), Probability theory: independence, exchangeability, martingales (Springer-Verlag: New York, Heidelberg, Berlin).Google Scholar
Doubilet, Peter (1972), ‘On the foundations of combinatorial theory VII: Symmetric functions through the theory of distribution and occupancy’, Stud. Appi. Math. 11, 36.Google Scholar
Dwyer, P. S. and Tracy, D. S. (1964), ‘A combinatorial method for products of two polykays with some general formulae’, Ann. Statist. 35, 11741185.CrossRefGoogle Scholar
Eagleson, G. K. and Weber, N. C. (1978), ‘Limit theorems for weakly exchangeable arrays’, Math. Proc. Cambridge Philos. Soc. 84, 123130.Google Scholar
Fisher, R. A. (1929), ‘Moments and product moments of sampling distributions’, Proc. London Math. Soc. (2) 30, 199238.Google Scholar
Fisher, R. A. and Wishart, J. (1931), ‘The derivation of the pattern formulae of two-way partitions from those of similar patterns’, Proc. London Math. Soc. (2) 33, 195208.Google Scholar
Halmos, Paul R. (1946), ‘The theory of unbiased estimation’, Ann. Statist. 17, 3443.CrossRefGoogle Scholar
James, G. S. (1958), ‘On moments and cumulants of systems of statistics’, Sankhyā 20, 130.Google Scholar
Kaplan, E. L. (1952), ‘Tensor notation and the sampling cumulants of k-statistics’, Biometrika 39, 319323.Google Scholar
Kendall, M. G. (1940a), ‘Some properties of k-statistics’, Ann. Eugen, London, 10, 106111.CrossRefGoogle Scholar
Kendall, M. G. (1940b), ‘Proof of Fisher's rules for ascertaining the sampling semi-invariants of k-statistics’, Ann. Eugen, London, 10, 215222.CrossRefGoogle Scholar
Kendall, M. G. (1940c), ‘The derivation of multivariate sampling formulae from univariate formulae by symbolic operation‘, Ann. Eugen, London, 10, 392402.CrossRefGoogle Scholar
Kendall, M. G. (1942), ‘On seminvariant statistics’, Ann. Eugen, London, 11, 300305.Google Scholar
Kendall, Maurice G. and Stuart, Alan (1969), The advanced theory of statistics, Volume 1 (Third Edition, Griffin, London).Google Scholar
Kinney, John (1976), ‘The k-statistics, polykays and randomised sums’, Sankhyā Ser. A 38, 271286.Google Scholar
Neyman, J. Splawa (1925), ‘Contributions to the theory of small samples drawn from a finite population’, Biometrika 17, 472479 (reprinted from La Revue Mensuelle de Statistique 6, (1923), 1–29.).CrossRefGoogle Scholar
Pitman, E. J. G. (1939), ‘The estimation of location and scale parameters of a continuous population of any given form’, Biometrika 30, 391421.Google Scholar
Speed, T. P. (1983), ‘Cumulants and partition lattices’, Austral. J. Statist. 25, 378388.CrossRefGoogle Scholar
Tracy, Derrick S. (1968), ‘Some rules for a combinatorial method for multiple products of generalised k-statistics’, Ann. Statist. 39, 983998.CrossRefGoogle Scholar
Tukey, John W. (1950), ‘Some sampling simplified’, J. Amer. Statist. Assoc. 45, 501519.Google Scholar