CNs: Condition Number with and without intercept
In multiColl: Collinearity Detection in a Multiple Linear Regression Model
CNs R Documentation
Condition Number with and without intercept
Description
This function returns the Condition Number (CN) of the independent variables of a multiple linear model considering the intercept and without considering it. It also returns the increase produced by going from not taking into account the intercept to having it.
Usage
CNs(X)
Arguments
X
A numeric design matrix that should contain more than one regressor (intercept included).
Value
CN1
Condition Number without intercept.
CN2
Condition Number with intercept.
increment
Increase (in percentage) in the CN from CN1 to CN2.
Author(s)
R. Salmerón (romansg@ugr.es) and C. García (cbgarcia@ugr.es).
References
D. A. Belsley (1991). Conditioning diagnostics: collinearity and weak data in regression. John Wiley & Sons, New York.
L. R. Klein and A.S. Goldberger (1964). An economic model of the United States, 1929-1952. North Holland Publishing Company, Amsterdan.
H. Theil (1971). Principles of Econometrics. John Wiley & Sons, New York.
See Also
lu, CN.
Examples
# Henri Theil's textile consumption data modified
data(theil)
head(theil)
cte = array(1,length(theil[,2]))
theil.X = cbind(cte,theil[,-(1:2)])
CNs(theil.X)
# Klein and Goldberger data on consumption and wage income
data(KG)
head(KG)
cte = array(1,length(KG[,1]))
KG.X = cbind(cte,KG[,-1])
CNs(KG.X)
multiColl documentation built on July 21, 2022, 9:06 a.m.
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| CNs | R Documentation |
Condition Number with and without intercept
Description
This function returns the Condition Number (CN) of the independent variables of a multiple linear model considering the intercept and without considering it. It also returns the increase produced by going from not taking into account the intercept to having it.
Usage
CNs(X)
Arguments
X |
A numeric design matrix that should contain more than one regressor (intercept included). |
Value
CN1 |
Condition Number without intercept. |
CN2 |
Condition Number with intercept. |
increment |
Increase (in percentage) in the CN from CN1 to CN2. |
Author(s)
R. Salmerón (romansg@ugr.es) and C. García (cbgarcia@ugr.es).
References
D. A. Belsley (1991). Conditioning diagnostics: collinearity and weak data in regression. John Wiley & Sons, New York.
L. R. Klein and A.S. Goldberger (1964). An economic model of the United States, 1929-1952. North Holland Publishing Company, Amsterdan.
H. Theil (1971). Principles of Econometrics. John Wiley & Sons, New York.
See Also
lu, CN.
Examples
# Henri Theil's textile consumption data modified data(theil) head(theil) cte = array(1,length(theil[,2])) theil.X = cbind(cte,theil[,-(1:2)]) CNs(theil.X) # Klein and Goldberger data on consumption and wage income data(KG) head(KG) cte = array(1,length(KG[,1])) KG.X = cbind(cte,KG[,-1]) CNs(KG.X)
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Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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