(unimportant background info / motivation)

I was implementing a different version of `nub`

, inspired by the Yesod book's discouragement of using it.

`map head . group . sort`

is more efficient than a call to`nub`

. However, in our case, order is important...

So I set out writing a "better" nub akin to the order-unimportant version. And I ended up with this:

```
mynub = unsort . map head . groupBy (\x y -> fst x == fst y) . sortBy (comparing fst) . rememberPosition
rememberPosition = flip zip [0..]
unsort = map fst . sortBy (comparing snd)
```

This certainly does a lot of extra work, but it should be O(n log n) instead of original nub's O(n^{2}). But that's beside the point. The problem is, *it's so long*! It's really not that complicated, but it's long (and I'm one of those people that hates going wider than 80 columns, or horizontal scrollbars on StackOverflow code blocks).

(the question)

**What are better ways in Haskell for expressing long chains of function composition such as this?**

`nub`

just has an`Eq a`

constraint, and your version has an`Ord a`

constraint.`nub`

works on infinite lists, your version doesn't. Also,`nub`

's worst-case may be worse than your code, but its best case is better than your code. The most significant difference is the`Ord a`

constraint. If you allow that, you can write something more complicated that is O(n log n) worst-case, almost as good as`nub`

in the best case, and works on infinite lists. But it involves non-list data structures. – Carl Apr 20 '11 at 18:02