formula(fixed)
are used to construct the fixed effects model formula. This formula
and the groupedData
object are passed as the fixed
and
data
arguments to lme.formula
, together with any other
additional arguments in the function call. See the documentation on
lme.formula
for a description of that function.## S3 method for class 'groupedData':
lme(fixed, data, random, correlation, weights,
subset, method, na.action, control, contrasts)
groupedData
.~x1+...+xn | g1/.../gm
, with x1+...+xn
specifying the model for the random effects and g1/.../gm
the
grouping structure (m
mcorStruct
object describing the
within-group correlation structure. See the documentation of
corClasses
for a description of the available corStruct
classes. Defaults to NULL
,
corvarFunc
object or one-sided formula
describing the within-group heteroscedasticity structure. If given as
a formula, it is used as the argument to varFixed
,
corresponding to fixed variance weights. See the dodata
that should be used in the fit. This can be a logical
vector, or a numeric vector indicating which observation numbers are
to be included, or a character vector of th"REML"
the model is fit by
maximizing the restricted log-likelihood. If "ML"
the
log-likelihood is maximized. Defaults to "REML"
.NA
s. The default action (na.fail
) causes
lme
to print an error message and terminate if there are any
incomplete observations.lmeControl
.
Defaults to an empty list.contrasts.arg
of model.matrix.default
.lme
representing the linear mixed-effects
model fit. Generic functions such as print
, plot
and
summary
have methods to show the results of the fit. See
lmeObject
for the components of the fit. The functions
resid
, coef
, fitted
, fixed.effects
, and
random.effects
can be used to extract some of its components.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. (1997). The use of variance functions for linear
and nonlinear mixed effects models is presented in detail in Davidian,
M. and Giltinan, D.M. (1995). Bates, D.M. and Pinheiro, J.C. (1998) "Computational methods for multilevel models" available in PostScript or PDF formats at http://franz.stat.wisc.edu/pub/NLME/ Box, G.E.P., Jenkins, G.M., and Reinsel G.C. (1994) "Time Series Analysis: Forecasting and Control", 3rd Edition, Holden-Day.
Davidian, M. and Giltinan, D.M. (1995) "Nonlinear Mixed Effects Models for Repeated Measurement Data", Chapman and Hall.
Laird, N.M. and Ware, J.H. (1982) "Random-Effects Models for Longitudinal Data", Biometrics, 38, 963-974.
Lindstrom, M.J. and Bates, D.M. (1988) "Newton-Raphson and EM Algorithms for Linear Mixed-Effects Models for Repeated-Measures Data", Journal of the American Statistical Association, 83, 1014-1022.
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. (1996) "Unconstrained Parametrizations for Variance-Covariance Matrices", Statistics and Computing, 6, 289-296.
Venables, W.N. and Ripley, B.D. (1997) "Modern Applied Statistics with S-plus", 2nd Edition, Springer-Verlag.
lme
, groupedData
,
lmeObject
fm1 <- lme(Orthodont)
summary(fm1)
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