Here's a Poisson regression example:

```
## from ?glm:
d.AD <- data.frame(counts=c(18,17,15,20,10,20,25,13,12),
outcome=gl(3,1,9),
treatment=gl(3,3))
glm.D93 <- glm(counts ~ outcome + treatment,data = d.AD, family=poisson())
```

Now define a function to fit an intercept-only model with the same response, family, etc., compute summary statistics, and combine them into a table (matrix). The formula `.~1`

in the `update`

command below means "refit the model with the same response variable [denoted by the dot on the LHS of the tilde] but with only an intercept term [denoted by the `1`

on the RHS of the tilde]"

```
glmsumfun <- function(model) {
glm0 <- update(model,.~1) ## refit with intercept only
## apply built-in logLik (log-likelihood), AIC,
## BIC (Bayesian/Schwarz Information Criterion) functions
## to models with and without intercept ('model' and 'glm0');
## combine the results in a two-column matrix with appropriate
## row and column names
matrix(c(logLik(glm.D93),BIC(glm.D93),AIC(glm.D93),
logLik(glm0),BIC(glm0),AIC(glm0)),ncol=2,
dimnames=list(c("logLik","SC","AIC"),c("full","intercept_only")))
}
```

Now apply the function:

```
glmsumfun(glm.D93)
```

The results:

```
full intercept_only
logLik -23.38066 -26.10681
SC 57.74744 54.41085
AIC 56.76132 54.21362
```

**EDIT**:

`anova(glm.D93,test="Chisq")`

gives a **sequential** analysis of deviance table containing df, deviance (=-2 log likelihood), residual df, residual deviance, and the likelihood ratio test (chi-squared test) *p*-value.
`drop1(glm.D93)`

gives a table with the AIC values (df, deviances, etc.) for each single-term deletion; `drop1(glm.D93,test="Chisq")`

additionally gives the LRT test *p* value.