Does increasing the sample size always increase the accuracy of a consistent estimator?

P. Laan, van der; C. Eeden, van

Does increasing the sample size always increase the accuracy of a consistent estimator?

P. Laan, van der, C. Eeden, van

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Abstract

Birnbaum (1948) introduced the notion of peakedness about \theta of a random variable T, defined by $P(| T - \theta | <\epsilon), \epsilon > 0$. What seems to be not well-known is that, for a consistent estimator Tn of \theta, its peakedness does not necessarily converge to 1 monotonically in n. In this article some known results on how the peakedness of the sample mean behaves as a function of n are recalled. Also, new results concerning the peakedness of the median and the interquartile range are presented.

Original language	English
Place of Publication	Eindhoven
Publisher	Technische Universiteit Eindhoven
Number of pages	5
Publication status	Published - 1999

Publication series

Name	Memorandum COSOR
Volume	9905
ISSN (Print)	0926-4493

Access to Document

522519Final published version, 228 KB

Cite this

@book{4959512d24c449e385541be896f42ed6,

title = "Does increasing the sample size always increase the accuracy of a consistent estimator?",

abstract = "Birnbaum (1948) introduced the notion of peakedness about \theta of a random variable T, defined by $P(| T - \theta | <\epsilon), \epsilon > 0$. What seems to be not well-known is that, for a consistent estimator Tn of \theta, its peakedness does not necessarily converge to 1 monotonically in n. In this article some known results on how the peakedness of the sample mean behaves as a function of n are recalled. Also, new results concerning the peakedness of the median and the interquartile range are presented.",

author = "{Laan, van der}, P. and {Eeden, van}, C.",

year = "1999",

language = "English",