Rank constrained distribution and moment computations
Rank constrained distribution and moment computations
Consider a set of independent random variables with specified distributions or a set of multivariate normal random variables with a product correlation structure. This paper shows how the distributions and moments of these random variables can be calculated conditional on a specified ranking of their values. This can be useful when the ordering of the variables can be determined without observing the actual values of the variables, as in ranked set sampling, for example. Thus, prior information on the distributions and moments from their individual specified distributions can be updated to provide improved posterior information using the known ranking. While these calculations ostensibly involve high dimensional integral expressions, it is shown how the previously developed general recursive integration methodology can be applied to this problem so that they can be evaluated in a straightforward manner as a series of one-dimensional or two-dimensional integral calculations. Furthermore, the proposed methodology possesses a self-correction mechanism in the computation that prevents any serious growth of the errors. Examples illustrate how different kinds of ranking information affect the distributions, expectations, variances, and covariances of the variables, and how they can be employed to solve a decision making problem.
229-242
Kiatsupaibul, Seksan
793dff19-7640-44b9-843b-c73ec3fd97aa
Hayter, Anthony
ce0afda9-fdbb-4dc4-8b86-7c71dfadbf47
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
January 2017
Kiatsupaibul, Seksan
793dff19-7640-44b9-843b-c73ec3fd97aa
Hayter, Anthony
ce0afda9-fdbb-4dc4-8b86-7c71dfadbf47
Liu, Wei
b64150aa-d935-4209-804d-24c1b97e024a
Kiatsupaibul, Seksan, Hayter, Anthony and Liu, Wei
(2017)
Rank constrained distribution and moment computations.
Computational Statistics & Data Analysis, 105, .
(doi:10.1016/j.csda.2016.08.009).
Abstract
Consider a set of independent random variables with specified distributions or a set of multivariate normal random variables with a product correlation structure. This paper shows how the distributions and moments of these random variables can be calculated conditional on a specified ranking of their values. This can be useful when the ordering of the variables can be determined without observing the actual values of the variables, as in ranked set sampling, for example. Thus, prior information on the distributions and moments from their individual specified distributions can be updated to provide improved posterior information using the known ranking. While these calculations ostensibly involve high dimensional integral expressions, it is shown how the previously developed general recursive integration methodology can be applied to this problem so that they can be evaluated in a straightforward manner as a series of one-dimensional or two-dimensional integral calculations. Furthermore, the proposed methodology possesses a self-correction mechanism in the computation that prevents any serious growth of the errors. Examples illustrate how different kinds of ranking information affect the distributions, expectations, variances, and covariances of the variables, and how they can be employed to solve a decision making problem.
Text
momentrankstatcsdarev1.pdf
- Accepted Manuscript
More information
Accepted/In Press date: 12 August 2016
e-pub ahead of print date: 23 August 2016
Published date: January 2017
Organisations:
Statistics, Statistical Sciences Research Institute
Identifiers
Local EPrints ID: 404554
URI: http://eprints.soton.ac.uk/id/eprint/404554
ISSN: 0167-9473
PURE UUID: 667b9d6e-21fb-42b0-8499-33b42954801d
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Date deposited: 11 Jan 2017 14:23
Last modified: 16 Mar 2024 02:42
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Contributors
Author:
Seksan Kiatsupaibul
Author:
Anthony Hayter
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