| etasq {heplots} | R Documentation |
Measures of Partial Association (Eta-squared) for Linear Models
Description
Calculates partial eta-squared for linear models or multivariate analogs of eta-squared (or R^2), indicating the partial association for each term in a multivariate linear model. There is a different analog for each of the four standard multivariate test statistics: Pillai's trace, Hotelling-Lawley trace, Wilks' Lambda and Roy's maximum root test.
Usage
etasq(x, ...)
## S3 method for class 'mlm'
etasq(x, ...)
## S3 method for class 'Anova.mlm'
etasq(x, anova = FALSE, ...)
## S3 method for class 'lm'
etasq(x, anova = FALSE, partial = TRUE, ...)
Arguments
x |
A |
... |
Other arguments passed down to |
anova |
A logical, indicating whether the result should also contain
the test statistics produced by |
partial |
A logical, indicating whether to calculate partial or classical eta^2. |
Details
For univariate linear models, classical
\eta^2 = SSH / SST and partial
\eta^2 = SSH / (SSH + SSE). These are identical in one-way designs.
Partial eta-squared describes the proportion of total variation attributable to a given factor, partialling out (excluding) other factors from the total nonerror variation. These are commonly used as measures of effect size or measures of (non-linear) strength of association in ANOVA models.
All multivariate tests are based on the s=min(p, df_h) latent roots of
H E^{-1}. The analogous multivariate partial \eta^2 measures are
calculated as:
- Pillai's trace (V)
\eta^2 = V/s- Hotelling-Lawley trace (T)
\eta^2 = T/(T+s)- Wilks' Lambda (L)
\eta^2 = L^{1/s}- Roy's maximum root (R)
\eta^2 = R/(R+1)
Value
When anova=FALSE, a one-column data frame containing the
eta-squared values for each term in the model.
When anova=TRUE, a 5-column (lm) or 7-column (mlm) data frame
containing the eta-squared values and the test statistics produced by
print.Anova() for each term in the model.
Author(s)
Michael Friendly
References
Muller, K. E. and Peterson, B. L. (1984). Practical methods for computing power in testing the Multivariate General Linear Hypothesis Computational Statistics and Data Analysis, 2, 143-158.
Muller, K. E. and LaVange, L. M. and Ramey, S. L. and Ramey, C. T. (1992). Power Calculations for General Linear Multivariate Models Including Repeated Measures Applications. Journal of the American Statistical Association, 87, 1209-1226.
See Also
Examples
library(car)
data(Soils, package="carData")
soils.mod <- lm(cbind(pH,N,Dens,P,Ca,Mg,K,Na,Conduc) ~ Block + Contour*Depth, data=Soils)
#Anova(soils.mod)
etasq(Anova(soils.mod))
etasq(soils.mod) # same
etasq(Anova(soils.mod), anova=TRUE)
etasq(soils.mod, test="Wilks")
etasq(soils.mod, test="Hotelling")