Calculate unbiased estimates of central moments and their powers and
products.

Calculates one-sample unbiased central moment estimates and
two-sample pooled estimates up to 6th order, including estimates of
powers and products of central moments. Provides the machinery for
obtaining unbiased central moment estimators beyond 6th order by generating
expressions for expectations of raw sample moments and their powers and
products.
Gerlovina and Hubbard (2019) <doi:10.1080/25742558.2019.1701917>.

Inna Gerlovina

Umoments

Unbiased Central Moment Estimates

Alan Hubbard

uM6 function

<dl><dt>m2</dt>
<dd>naive biased variance estimate \(m_2 = 1/n \sum_{i = 1}^n ((X_i
- \bar{X})^2\) for a vector <code>X</code>.</dd>
<dt>m3</dt>
<dd>naive biased third central moment estimate \(m_3 = 1/n \sum_{i =
1}^n ((X_i - \bar{X})^3\) for a vector <code>X</code>.</dd>
<dt>m4</dt>
<dd>naive biased fourth central moment estimate \(m_4 = 1/n \sum_{i
= 1}^n ((X_i - \bar{X})^4\) for a vector
<code>X</code>.</dd>
<dt>m6</dt>
<dd>naive biased sixth central moment estimate \(m_6 = 1/n \sum_{i =
1}^n ((X_i - \bar{X})^6\) for a vector <code>X</code>.</dd>
<dt>n</dt>
<dd>sample size.</dd></dl>

Arguments

Unbiased central moment estimates — uM6

<dl>

<dt>m2</dt>
<dd>naive biased variance estimate \(m_2 = 1/n \sum_{i = 1}^n ((X_i
- \bar{X})^2\) for a vector <code>X</code>.</dd>


<dt>m3</dt>
<dd>naive biased third central moment estimate \(m_3 = 1/n \sum_{i =
1}^n ((X_i - \bar{X})^3\) for a vector <code>X</code>.</dd>


<dt>m4</dt>
<dd>naive biased fourth central moment estimate \(m_4 = 1/n \sum_{i
= 1}^n ((X_i - \bar{X})^4\) for a vector
<code>X</code>.</dd>


<dt>m6</dt>
<dd>naive biased sixth central moment estimate \(m_6 = 1/n \sum_{i =
1}^n ((X_i - \bar{X})^6\) for a vector <code>X</code>.</dd>


<dt>n</dt>
<dd>sample size.</dd>

</dl>

uM6: Unbiased central moment estimates

Description

Usage

Value

Arguments

See Also

Examples