Standardized mean of a contrast variable

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In statistics, the standardized mean of a contrast variable (SMCV or SMC), is a parameter assessing effect size. The SMCV is defined as mean divided by the standard deviation of a contrast variable.^[1][2] The SMCV was first proposed for one-way ANOVA cases ^[2] and was then extended to multi-factor ANOVA cases.^[3]

Consistent interpretations for the strength of group comparison, as represented by a contrast, are important.^[4][5]

When there are only two groups involved in a comparison, SMCV is the same as the strictly standardized mean difference (SSMD). SSMD belongs to a popular type of effect-size measure called "standardized mean differences"^[6] which includes Cohen's ${\displaystyle d}$^[7] and Glass's ${\displaystyle \delta .}$^[8]

In ANOVA, a similar parameter for measuring the strength of group comparison is standardized effect size (SES).^[9] One issue with SES is that its values are incomparable for contrasts with different coefficients. SMCV does not have such an issue.

Suppose the random values in t groups represented by random variables ${\displaystyle G_1,G_2,\dots ,G_t}$ have means ${\displaystyle {\mu }_1,{\mu }_2,\dots ,{\mu }_t}$ and variances ${\displaystyle {\sigma }_1^2,{\sigma }_2^2,\dots ,{\sigma }_t^2}$, respectively. A contrast variable ${\displaystyle V}$ is defined by

${\displaystyle V={\displaystyle \sum _{i=1}^t}{c}_i{G}_i,}$

where the ${\displaystyle c_i}$'s are a set of coefficients representing a comparison of interest and satisfy ${\displaystyle {\displaystyle \sum _{i=1}^t}{c}_i=0}$. The SMCV of contrast variable ${\displaystyle V}$, denoted by ${\displaystyle \lambda }$, is defined as^[1]

${\displaystyle \lambda =\frac{\mathrm{E}(V)}{\mathrm{stdev}(V)}=\frac{{\displaystyle \sum _{i=1}^t}{c}_i{\mu }_i}{\sqrt{\text{Var}\left({\displaystyle \sum _{i=1}^t}{c}_i{G}_i\right)}}=\frac{{\displaystyle \sum _{i=1}^t}{c}_i{\mu }_i}{\sqrt{{\displaystyle \sum _{i=1}^t}{c}_i^2{\sigma }_i^2+2{\displaystyle \sum _{i=1}^t}\sum _{j=i}{c}_i{c}_j{\sigma }_{ij}}}}$

where ${\displaystyle {\sigma }_{ij}}$ is the covariance of ${\displaystyle G_i}$ and ${\displaystyle G_j}$. When ${\displaystyle G_1,G_2,\dots ,G_t}$ are independent,

${\displaystyle \lambda =\frac{{\displaystyle \sum _{i=1}^t}{c}_i{\mu }_i}{\sqrt{{\displaystyle \sum _{i=1}^t}{c}_i^2{\sigma }_i^2}}.}$

The population value (denoted by ${\displaystyle \lambda }$ ) of SMCV can be used to classify the strength of a comparison represented by a contrast variable, as shown in the following table.^[1][2] This classifying rule has a probabilistic basis due to the link between SMCV and c⁺-probability.^[1]

Effect type	Effect subtype	Thresholds for negative SMCV	Thresholds for positive SMCV
Extra large	Extremely strong	${\displaystyle \lambda \le -5}$	${\displaystyle \lambda \ge 5}$
	Very strong	${\displaystyle -5<\lambda \le -3}$	${\displaystyle 5>\lambda \ge 3}$
	Strong	${\displaystyle -3<\lambda \le -2}$	${\displaystyle 3>\lambda \ge 2}$
	Fairly strong	${\displaystyle -2<\lambda \le -1.645}$	${\displaystyle 2>\lambda \ge 1.645}$
Large	Moderate	${\displaystyle -1.645<\lambda \le -1.28}$	${\displaystyle 1.645>\lambda \ge 1.28}$
	Fairly moderate	${\displaystyle -1.28<\lambda \le -1}$	${\displaystyle 1.28>\lambda \ge 1}$
Medium	Fairly weak	${\displaystyle -1<\lambda \le -0.75}$	${\displaystyle 1>\lambda \ge 0.75}$
	Weak	${\displaystyle -0.75<\lambda <-0.5}$	${\displaystyle 0.75>\lambda >0.5}$
	Very weak	${\displaystyle -0.5\le \lambda <-0.25}$	${\displaystyle 0.5\ge \lambda >0.25}$
Small	Extremely weak	${\displaystyle -0.25\le \lambda <0}$	${\displaystyle 0.25\ge \lambda >0}$
	No effect	${\displaystyle \lambda =0}$

The estimation and inference of SMCV presented below is for one-factor experiments.^[1][2] Estimation and inference of SMCV for multi-factor experiments has also been discussed.^[1][3]

The estimation of SMCV relies on how samples are obtained in a study. When the groups are correlated, it is usually difficult to estimate the covariance among groups. In such a case, a good strategy is to obtain matched or paired samples (or subjects) and to conduct contrast analysis based on the matched samples. A simple example of matched contrast analysis is the analysis of paired difference of drug effects after and before taking a drug in the same patients. By contrast, another strategy is to not match or pair the samples and to conduct contrast analysis based on the unmatched or unpaired samples. A simple example of unmatched contrast analysis is the comparison of efficacy between a new drug taken by some patients and a standard drug taken by other patients. Methods of estimation for SMCV and c⁺-probability in matched contrast analysis may differ from those used in unmatched contrast analysis.

Consider an independent sample of size ${\displaystyle n_i}$,

${\displaystyle Y_i=(Y_{i1},Y_{i2},\dots ,Y_{i{n}_i})}$

from the ${\displaystyle i^{\text{th}}(i=1,2,\dots ,t)}$ group ${\displaystyle G_i}$. ${\displaystyle Y_i}$'s are independent. Let ${\displaystyle {\overline{Y}}_i=\frac{1}{n_i}{\displaystyle \sum _{j=1}^{n_i}}{Y}_{ij}}$,

${\displaystyle s_i^2=\frac{1}{n_i-1}{\displaystyle \sum _{j=1}^{n_i}}{(Y_{ij}-{\overline{Y}}_i)}^2,}$

${\displaystyle N={\displaystyle \sum _{i=1}^t}{n}_i}$

and

${\displaystyle \text{MSE }=\frac{1}{N-t}{\displaystyle \sum _{i=1}^t}(n_i-1)s_i^2.}$

When the ${\displaystyle t}$ groups have unequal variance, the maximal likelihood estimate (MLE) and method-of-moment estimate (MM) of SMCV (${\displaystyle \lambda }$) are, respectively^[1][2]

${\displaystyle {\hat{\lambda }}_{\text{MLE }}=\frac{{\displaystyle \sum _{i=1}^t}{c}_i{\overline{Y}}_i}{\sqrt{{\displaystyle \sum _{i=1}^t}\frac{n_i-1}{n_i}{c}_i^2{s}_i^2}}}$

and

${\displaystyle {\hat{\lambda }}_{\text{MM}}=\frac{{\displaystyle \sum _{i=1}^t}{c}_i{\overline{Y}}_i}{\sqrt{{\displaystyle \sum _{i=1}^t}{c}_i^2{s}_i^2}}.}$

When the ${\displaystyle t}$ groups have equal variance, under normality assumption, the uniformly minimal variance unbiased estimate (UMVUE) of SMCV (${\displaystyle \lambda }$) is^[1][2]

${\displaystyle {\hat{\lambda }}_{\text{UMVUE}}=\sqrt{\frac{K}{N-t}}\frac{{\displaystyle \sum _{i=1}^t}{c}_i{\overline{Y}}_i}{\sqrt{{\displaystyle \sum _{i=1}^t}\text{MSE }{c}_i^2}}}$

where ${\displaystyle K=\frac{2{\left(\mathrm{\Gamma }\left(\frac{N-t}{2}\right)\right)}^2}{{\left(\mathrm{\Gamma }\left(\frac{N-t-1}{2}\right)\right)}^2}}$.

The confidence interval of SMCV can be made using the following non-central t-distribution:^[1][2]

${\displaystyle T=\frac{{\displaystyle \sum _{i=1}^t}{c}_i{\overline{Y}}_i}{\sqrt{{\displaystyle \sum _{i=1}^t}\text{MSE }{c}_i^2/n_i}}\sim \text{noncentral }t(N-t,b\lambda )}$

where ${\displaystyle b=\sqrt{\frac{{\displaystyle \sum _{i=1}^t}{c}_i^2}{{\displaystyle \sum _{i=1}^t}{c}_i^2/n_i}}.}$

In matched contrast analysis, assume that there are ${\displaystyle n}$ independent samples ${\displaystyle (Y_{1j},Y_{2j},\cdots ,Y_{tj})}$ from ${\displaystyle t}$ groups (${\displaystyle G_i}$'s), where ${\displaystyle i=1,2,\cdots ,t;j=1,2,\cdots ,n}$. Then the ${\displaystyle j^{\text{th}}}$ observed value of a contrast ${\displaystyle V={\displaystyle \sum _{i=1}^t}{c}_i{G}_i}$ is ${\displaystyle v_j={\displaystyle \sum _{i=1}^t}{c}_i{Y}_i}$.

Let ${\displaystyle \overline{V}}$ and ${\displaystyle s_V^2}$ be the sample mean and sample variance of the contrast variable ${\displaystyle V}$, respectively. Under normality assumptions, the UMVUE estimate of SMCV is^[1]

${\displaystyle {\hat{\lambda }}_{\text{UMVUE}}=\sqrt{\frac{K}{n-1}}\frac{\overline{V}}{s_V}}$

where ${\displaystyle K=\frac{2{\left(\mathrm{\Gamma }\left(\frac{n-1}{2}\right)\right)}^2}{{\left(\mathrm{\Gamma }\left(\frac{n-2}{2}\right)\right)}^2}.}$

A confidence interval for SMCV can be made using the following non-central t-distribution:^[1]

${\displaystyle T=\frac{\overline{V}}{s_V/\sqrt{n}}\sim \text{noncentral }t(n-1,\sqrt{n}\lambda ).}$

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