Performs a slightly inefficient but numerically stable version of fast
backward elimination on factors, using a method based on Lawless and Singhal
(1978).
This method uses the fitted complete model and computes approximate Wald
statistics by computing conditional (restricted) maximum likelihood estimates
assuming multivariate normality of estimates.
`fastbw`

deletes factors, not columns of the design matrix. Factors requiring multiple d.f. will be retained or dropped as a group.
The function prints the deletion statistics for each variable in
turn, and prints approximate parameter estimates for the model after
deleting variables. The approximation is better when the number of
factors deleted is not large. For `ols`

, the approximation is exact for
regression coefficients, and standard errors are only off by a factor
equal to the ratio of the mean squared error estimate for the reduced
model to the original mean squared error estimate for the full model.

If the fit was from `ols`

, `fastbw`

will compute the usual \(R^2\)
statistic for each model.

```
fastbw(fit, rule=c("aic", "p"),
type=c("residual", "individual", "total"), sls=.05, aics=0, eps=1e-9,
k.aic=2, force=NULL)
```# S3 method for fastbw
print(x, digits=4, estimates=TRUE, …)

fit

fit object with `Varcov(fit)`

defined (e.g., from `ols`

, `lrm`

, `cph`

, `psm`

, `glmD`

)

rule

Stopping rule. Defaults to `"aic"`

for Akaike's information criterion. Use
`rule="p"`

to use \(P\)-values

type

Type of statistic on which to base the stopping rule. Default is
`"residual"`

for
the pooled residual chi-square. Use `type="individual"`

to use Wald
chi-square of individual factors.

sls

Significance level for staying in a model if `rule="p"`

. Default is .05.

aics

For `rule="aic"`

,
variables are deleted until the chi-square - `k.aic`

times d.f. would rise above `aics`

.
Default `aics`

is zero to use the ordinary AIC. Set `aics`

to say 10000
to see all variables deleted in order of descending importance.

eps

Singularity criterion, default is `1E-9`

.

k.aic

multiplier to compute AIC, default is 2. To use BIC, set `k.aic`

equal
to \(\log(n)\), where \(n\) is the effective sample size (number of events
for survival models).

force

a vector of integers specifying parameters forced to be in the model, not counting intercept(s)

x

result of `fastbw`

digits

number of significant digits to print

estimates

set to `FALSE`

to suppress printing table of
approximate coefficients, SEs, etc., after variable deletions

…

ignored

a list with an attribute `kept`

if `bw=TRUE`

, and the
following components:

matrix of statistics with rows in order of deletion.

names of factors kept in final model.

the subscripts of factors kept in the final model

opposite of `factors.kept`

.

column numbers in design matrix corresponding to parameters kept in the final model.

opposite of `parms.kept`

.

vector of approximate coefficients of reduced model.

approximate covariance matrix for reduced model.

matrix of coefficients of all models. Rows correspond to the successive models examined and columns correspond to the coefficients in the full model. For variables not in a particular sub-model (row), the coefficients are zero.

Lawless, J. F. and Singhal, K. (1978): Efficient screening of nonnormal regression models. Biometrics 34:318--327.

# NOT RUN { fastbw(fit, optional.arguments) # print results z <- fastbw(fit, optional.args) # typically used in simulations lm.fit(X[,z$parms.kept], Y) # least squares fit of reduced model # }