Open AccessOn Smoothed MWSD Estimation of Mixing Proportion
Author(s) -
Satish Konda,
K. L. Mehra,
Ramakrishnaiah Y.S.
Publication year - 2021
Publication title -
pakistan journal of statistics and operation research
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.354
H-Index - 15
eISSN - 2220-5810
pISSN - 1816-2711
DOI - 10.18187/pjsor.v17i4.2512
Subject(s) - mathematics , estimator , mixing (physics) , statistics , mean squared error , independent and identically distributed random variables , monte carlo method , convergence (economics) , parametric statistics , minimum mean square error , mean square , square (algebra) , random variable , geometry , physics , quantum mechanics , economics , economic growth
The problem considered in the present paper is estimation of mixing proportions of mixtures of two (known) distributions by using the minimum weighted square distance (MWSD) method. The two classes of smoothed and unsmoothed parametric estimators of mixing proportion proposed in a sense of MWSD due to Wolfowitz(1953) in a mixture model F(x)=p (x)+(1-p) (x) based on three independent and identically distributed random samples of sizes n and , =1,2 from the mixture and two component populations. Comparisons are made based on their derived mean square errors (MSE). The superiority of smoothed estimator over unsmoothed one is established theoretically and also conducting Monte-Carlo study in sense of minimum mean square error criterion. Large sample properties such as rates of a.s. convergence and asymptotic normality of these estimators are also established. The results thus established here are completely new in the literature.