Title of article
Symmetric quantiles and their applications
Author/Authors
Yuang-Chin Chiang، نويسنده , , Lin-An Chen & Hsien-Chueh Peter Yang، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2006
Pages
11
From page
807
To page
817
Abstract
To develop estimators with stronger efficiencies than the trimmed means which use
the empirical quantile, Kim (1992) and Chen & Chiang (1996), implicitly or explicitly used the
symmetric quantile, and thus introduced new trimmed means for location and linear regression
models, respectively. This study further investigates the properties of the symmetric quantile and
extends its application in several aspects. (a) The symmetric quantile is more efficient than the
empirical quantiles in asymptotic variances when quantile percentage a is either small or large.
This reveals that for any proposal involving the a th quantile of small or large a s, the
symmetric quantile is the right choice; (b) a trimmed mean based on it has asymptotic variance
achieving a Cramer-Rao lower bound in one heavy tail distribution; (c) an improvement of the
quantiles-based control chart by Grimshaw & Alt (1997) is discussed; (d) Monte Carlo
simulations of two new scale estimators based on symmetric quantiles also support this new
quantile.
Keywords
Scale estimator , Regression quantile , Trimmed mean
Journal title
JOURNAL OF APPLIED STATISTICS
Serial Year
2006
Journal title
JOURNAL OF APPLIED STATISTICS
Record number
712075
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