Author:
Ghorbanpour Samereh,Chinipardaz Rahim,Alavi Seyed Mohammad Reza
Abstract
The weighted distributions are used when the sampling mechanism records observations according to a nonnegative weight function. Sometimes the form of the weighted distribution is the same as the original distribution except possibly for a change in the parameters that is called the form-invariant weighted distribution. In this paper, by identifying a general class of weight functions, we introduce an extended class of form-invariant weighted distributions belonging to the non-regular exponential family which included two common families of distribution: exponential family and non-regular family as special cases. Some properties of this class of distributions such as the sufficient and minimal sufficient statistics, maximum likelihood estimation and the Fisher information matrix are studied.
Publisher
Universidad Nacional de Colombia
Subject
Statistics and Probability
Reference18 articles.
1. Alavi, S. & Chinipardaz, R. (2009), 'Form-invariance under weighted sampling', Statistics 43(1), 81-90.
2. Billingsley, P. (1979), Probability and Measure, Wiley, New York.
3. Esparza, L. (2013), 'On size-biased matrix-geometric distributions', Performance Evaluation 70(9), 639-645.
4. Gupta, R. & Keating, J. (1986), 'Relations for reliability measures under length biased sampling', Scandinavian Journal of Statistics 13(1), 49-56.
5. Gupta, R. & Kirmani, S. (1990), 'The role of weighted distributions in stochastic modeling', Communications in Statistics - Theory and Methods 19(9), 3147-3162.