Something like this (written in Haskell)?

```
import Data.List (minimum, maximum, minimumBy)
minDiff (x:xs) = comb (head x) (diff $ matches (head x)) x where
lenxs = length xs
diff m = maximum m - minimum m
matches y = minimumBy (\a b -> compare (diff a) (diff b)) $ p [] 0 where
md = map (minimumBy (\a b -> compare (abs (a - y)) (abs (b - y)))) xs
mds = [m | m <- foldl (\b a -> filter (\z -> abs (z - y) == abs (y - md!!a)) (xs!!a) : b) [] [0..lenxs - 1]]
p result index
| index == lenxs = [y:result]
| otherwise = do
p' <- mds!!index
p (p':result) (index + 1)
comb result difference [] = matches result
comb result difference (z:zs) =
let diff' = diff (matches z)
in if diff' < difference
then comb z diff' zs
else comb result difference zs
OUTPUT:
*Main> minDiff [[1,3,5,9,10],[2,4,6,8],[7,11,12,13]]
[5,6,7]
```

number of setsnot the lesser bound of the sets. There is no assumption made on the numbers found in the sets. And clearly, taking the minimum of each set isNEVERa reliable method, even when there are bounds to the numbers. (Another simple example : the sets {0,1,2,3} and {2,3,4} -> the answer is 0 by taking "2" from the two sets) – Rerito Apr 11 '13 at 14:04