# significant difference tests between independent groups in R

```x   6.18    3.76    5.15    4.02    2.52    1.41    3.36    8.67    9.36
y   9.39    13.50   10.80   12.70   14.70   13.40   10.10   4.12    10.30
z   6.35    3.90    5.32    5.08    8.38    5.84    3.96    3.78
b   1.15    2.26    1.47    1.93    1.25    2.87    4.19    2.55
```

I want to compare the 4 groups x,y,z,b and get which group are significant different.

thanks!

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You are getting negative votes because your question is not very clear as to its goals. If I have (or have not) correctly interpreted your intent, you should put in the appropriate clarifications. –  BondedDust Sep 5 '12 at 21:28
I would suggest to repost in stats.stackexchange.com –  S4M Sep 5 '12 at 21:29
if you do like @DWin's answer, you could reword your title (and question) to specify "post hoc tests of pairwise differences between groups" (rather than "how to use Kruskal-Wallis" (which you've already demonstrated you can do) and "the significant values in the raw data" (which is hard to interpret in any sensible way) –  Ben Bolker Sep 5 '12 at 21:36
@S4M. You're not the first person to suggest that: stackoverflow.com/questions/12287924/… –  GSee Sep 5 '12 at 21:39
What do you mean by "figure out the different values between these four groups"? Figure out the values that are significantly unlikely to be from other groups, but are within range of one group? Or what? –  David Robinson Sep 5 '12 at 21:58

Kruskal-Wallis is a nonparametric test that compares multiple groups to see if one is significantly greater than the others. It doesn't decide whether specific values in any of the groups are significant.

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Thanks. But If I want to get some specific values, is there any test can do that? –  user1586241 Sep 5 '12 at 21:14
can you explain what you mean by a single significant value? Are you looking for outliers? or ... ?? –  Ben Bolker Sep 5 '12 at 21:37
Thanks, I changed my question here after discussion here. –  user1586241 Sep 7 '12 at 0:11
@user1586241: Do you still want a nonparametric test of which groups are different? There's no indication that any of the groups you show are not normally distributed (you can do `shapiro.test(x)` to see) –  David Robinson Sep 7 '12 at 2:17

You might consider looking first at the means (after putting this data in a dataframe 'datm'):

``````> aggregate(datm\$value, datm['variable'], mean, na.rm=TRUE)
variable         x
1        x 0.9566667
2        y 1.4277778
3        z 2.3700000
4        b 0.0787500
``````

Or at medians:

``````> aggregate(datm\$value, datm['variable'], median, na.rm=TRUE)
variable     x
1        x 0.750
2        y 1.710
3        z 2.265
4        b 0.010
``````

In package coin there is a post-hoc test that is based on ranks (as kruskal.test is.) It is actually in the examples of the LocationTests help page and is reproduced without modification except for changing the names of the columns in the formula and the dataset name. There is no cited author for that page but the package authors are here: Torsten Hothorn, Kurt Hornik, Mark A. van de Wiel and Achim Zeileis:

`````` ### Nemenyi-Damico-Wolfe-Dunn test (joint ranking)
### Hollander & Wolfe (1999), page 244
### (where Steel-Dwass results are given)
if (require("multcomp")) {

NDWD <- oneway_test(value~variable, data = datm,
ytrafo = function(data) trafo(data, numeric_trafo = rank),
xtrafo = function(data) trafo(data, factor_trafo = function(x)
model.matrix(~x - 1) %*% t(contrMat(table(x), "Tukey"))),
teststat = "max", distribution = approximate(B = 90000))

### global p-value
print(pvalue(NDWD))

### DWin note: prints pairwise p-value for comparison of rankings
print(pvalue(NDWD, method = "single-step"))
}
#-----------------------
[1] 0
99 percent confidence interval:
0.000000e+00 5.886846e-05

y - x 0.8287000
z - x 0.1039889
b - x 0.1107667
z - y 0.5421778
b - y 0.0053000
b - z 0.0000000
``````

To answer the question in the comment, this is what I did:

`````` dat <- read.table(text="x   y   z   b
2.06    1.71    2.47    0.00
1.08    2.73    1.75    0.00
1.94    2.29    2.44    0.01
1.32    1.71    2.50    0.01
0.75    2.40    4.17    0.01
0.18    0.45    2.09    0.20
0.72    0.58    1.77    0.30
0.22    0.35    1.77    0.10