VIF: Variance Inflation Factors
In DescTools: Tools for Descriptive Statistics
VIF R Documentation
Variance Inflation Factors
Description
Calculates variance-inflation and generalized variance-inflation factors
for linear and generalized linear models. It's a measure describing how much the variance of an estimated coefficient is increased because of collinearity.
Usage
VIF(mod)
Arguments
mod
an object that responds to coef, vcov, and
model.matrix, such as an lm or glm object.
Details
If all terms in an unweighted linear model have 1 df, then the usual variance-inflation
factors are calculated.
The vif are defined as
vif_j=\frac{1}{1-R_j^2}
where R_j^2 equals the coefficient of determination for regressing the explanatory variable j in question on the other terms in the model. This is one of the well-known collinearity diagnostics.
If any terms in an unweighted linear model have more than 1 df, then generalized variance-inflation factors
(Fox and Monette, 1992) are calculated. These are interpretable as the inflation
in size of the confidence ellipse or ellipsoid for the coefficients of the term in
comparison with what would be obtained for orthogonal data.
The generalized vifs
are invariant with respect to the coding of the terms in the model (as long as
the subspace of the columns of the model matrix pertaining to each term is
invariant). To adjust for the dimension of the confidence ellipsoid, the function
also prints GVIF^{1/(2\times df)} where df is the degrees of freedom
associated with the term.
Through a further generalization, the implementation here is applicable as well to other sorts of models,
in particular weighted linear models and generalized linear models.
Values of vif up to 5 are usually interpreted as uncritical, values above 5 denote a considerable multicollinearity.
Value
A vector of vifs, or a matrix containing one row for each term in the model, and
columns for the GVIF, df, and GVIF^{1/(2\times df)}.
Note
This is a verbatim copy from the function car::vif.
Author(s)
Henric Nilsson and John Fox jfox@mcmaster.ca
References
Fox, J. and Monette, G. (1992)
Generalized collinearity diagnostics.
JASA, 87, 178–183.
Fox, J. (2008)
Applied Regression Analysis and Generalized Linear Models,
Second Edition. Sage.
Fox, J. and Weisberg, S. (2011)
An R Companion to Applied Regression, Second Edition, Sage.
Examples
VIF(lm(Fertility ~ Agriculture + Education, data=swiss))
VIF(lm(Fertility ~ ., data=swiss))
DescTools documentation built on Sept. 26, 2024, 1:07 a.m.
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| VIF | R Documentation |
Variance Inflation Factors
Description
Calculates variance-inflation and generalized variance-inflation factors for linear and generalized linear models. It's a measure describing how much the variance of an estimated coefficient is increased because of collinearity.
Usage
VIF(mod)
Arguments
mod |
an object that responds to |
Details
If all terms in an unweighted linear model have 1 df, then the usual variance-inflation factors are calculated.
The vif are defined as
vif_j=\frac{1}{1-R_j^2}
where R_j^2 equals the coefficient of determination for regressing the explanatory variable j in question on the other terms in the model. This is one of the well-known collinearity diagnostics.
If any terms in an unweighted linear model have more than 1 df, then generalized variance-inflation factors (Fox and Monette, 1992) are calculated. These are interpretable as the inflation in size of the confidence ellipse or ellipsoid for the coefficients of the term in comparison with what would be obtained for orthogonal data.
The generalized vifs
are invariant with respect to the coding of the terms in the model (as long as
the subspace of the columns of the model matrix pertaining to each term is
invariant). To adjust for the dimension of the confidence ellipsoid, the function
also prints GVIF^{1/(2\times df)} where df is the degrees of freedom
associated with the term.
Through a further generalization, the implementation here is applicable as well to other sorts of models, in particular weighted linear models and generalized linear models.
Values of vif up to 5 are usually interpreted as uncritical, values above 5 denote a considerable multicollinearity.
Value
A vector of vifs, or a matrix containing one row for each term in the model, and
columns for the GVIF, df, and GVIF^{1/(2\times df)}.
Note
This is a verbatim copy from the function car::vif.
Author(s)
Henric Nilsson and John Fox jfox@mcmaster.ca
References
Fox, J. and Monette, G. (1992) Generalized collinearity diagnostics. JASA, 87, 178–183.
Fox, J. (2008) Applied Regression Analysis and Generalized Linear Models, Second Edition. Sage.
Fox, J. and Weisberg, S. (2011) An R Companion to Applied Regression, Second Edition, Sage.
Examples
VIF(lm(Fertility ~ Agriculture + Education, data=swiss))
VIF(lm(Fertility ~ ., data=swiss))
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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