gls
Fit Linear Model Using Generalized Least Squares
Description
This function fits a linear model using generalized least squares. The errors are allowed to be correlated and/or have unequal variances.
Usage
gls(model, data, correlation, weights, subset, method, na.action, control, verbose) ## S3 method for class 'gls' update(object, model., ..., evaluate = TRUE)
Arguments
object | an object inheriting from class |
model | a two-sided linear formula object describing the model, with the response on the left of a |
model. | Changes to the model – see |
data | an optional data frame containing the variables named in |
correlation | an optional |
weights | an optional |
subset | an optional expression indicating which subset of the rows of |
method | a character string. If |
na.action | a function that indicates what should happen when the data contain |
control | a list of control values for the estimation algorithm to replace the default values returned by the function |
verbose | an optional logical value. If |
... | some methods for this generic require additional arguments. None are used in this method. |
evaluate | If |
Value
an object of class "gls"
representing the linear model fit. Generic functions such as print
, plot
, and summary
have methods to show the results of the fit. See glsObject
for the components of the fit. The functions resid
, coef
and fitted
, can be used to extract some of its components.
Author(s)
José Pinheiro and Douglas Bates [email protected]
References
The different correlation structures available for the correlation
argument are described in Box, G.E.P., Jenkins, G.M., and Reinsel G.C. (1994), Littel, R.C., Milliken, G.A., Stroup, W.W., and Wolfinger, R.D. (1996), and Venables, W.N. and Ripley, B.D. (2002). The use of variance functions for linear and nonlinear models is presented in detail in Carroll, R.J. and Ruppert, D. (1988) and Davidian, M. and Giltinan, D.M. (1995).
Box, G.E.P., Jenkins, G.M., and Reinsel G.C. (1994) "Time Series Analysis: Forecasting and Control", 3rd Edition, Holden-Day.
Carroll, R.J. and Ruppert, D. (1988) "Transformation and Weighting in Regression", Chapman and Hall.
Davidian, M. and Giltinan, D.M. (1995) "Nonlinear Mixed Effects Models for Repeated Measurement Data", Chapman and Hall.
Littel, R.C., Milliken, G.A., Stroup, W.W., and Wolfinger, R.D. (1996) "SAS Systems for Mixed Models", SAS Institute.
Pinheiro, J.C., and Bates, D.M. (2000) "Mixed-Effects Models in S and S-PLUS", Springer, esp. pp. 100, 461.
Venables, W.N. and Ripley, B.D. (2002) "Modern Applied Statistics with S", 4th Edition, Springer-Verlag.
See Also
corClasses
, glsControl
, glsObject
, glsStruct
, plot.gls
, predict.gls
, qqnorm.gls
, residuals.gls
, summary.gls
, varClasses
, varFunc
Examples
# AR(1) errors within each Mare fm1 <- gls(follicles ~ sin(2*pi*Time) + cos(2*pi*Time), Ovary, correlation = corAR1(form = ~ 1 | Mare)) # variance increases as a power of the absolute fitted values fm2 <- update(fm1, weights = varPower())
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Licensed under the GNU General Public License.