I have an experiment that is unbalanced where at three sites (L, M, H) we measure a parameter (`met`

) in four different vegetation types (a, b, c, d). All vegetation types are present at all three sites. Vegetation types are replicated 4 times at L and M and 8 times at H.

Therefore a simple anova and TukeyHSD will not work. Packages Agricolae (`HSD.test`

) and DTK (`DTK.test`

) are only working for one way designs, and then there is multcomp... Does the Tukey test in the `mcp`

function calculate Tukey-Kramer contrasts, or does it give the regular Tukey contrasts? I presume the first to be the case because the package is geared towards testing multiple comparisons for unbalanced designs, but I am unsure because p-values produced with both approaches are virtually the same. What test would then be appropriate?

Also, are there more suitable approaches towards doing such a two way anova for unbalanced data sets?

```
library(multcomp)
(met <- c(rnorm(16,6,2),rnorm(16,5,2),rnorm(32,4,2)))
(site <- c(rep("L", 16), rep("M", 16), rep("H", 32)))
(vtype <- c(rep(letters[1:4], 16), rep(letters[1:4], 16), rep(letters[1:4], 32)))
dat <- data.frame(site, vtype, met)
# using aov and TukeyHSD
aov.000 <- aov(met ~ site * vtype, data=dat)
summary(aov.000)
TukeyHSD(aov.000)
# using Anova, and multcomp
lm.000 <- lm(met ~ site * vtype, data=dat)
summary(lm.000)
library(car)
Anova.000 <- Anova(lm.000, data=dat)
dat$int <- with(dat, interaction(site, vtype, sep = "x"))
lm.000 <- lm(met ~ int, data = dat)
summary(lm.000)
summary(glht.000 <- glht(lm.000, linfct = mcp(int = "Tukey")))
```