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# How to find a second largest number in a list in Haskell?

The question is like this:

Write a function that takes an integer list and returns its length and the second largest integer in the list.

I can solve this with two functions but is there any solution that use only one function to do it?

Any help is appreciated! Thanks!

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What's your definition of "1 function" vs "2 functions"? You can put the second one in a `where` clause of the first one, then it's only one function :) – us2012 Oct 1 '13 at 21:55
The general solution for finding the top k items (and therefore the kth largest item) in a single pass uses a priority queue, so you always know the top k so far at every step through the iteration. There's a blog post here. For very small k, a priority queue might be overkill in performance terms, but it's probably easiest to stick with it - don't optimise prematurely IOW. I'm sure there's a suitable priority queue in the Haskell library somewhere. – Steve314 Oct 1 '13 at 22:14
@Steve314 I think that is unnecessary in Haskell, as the lazy evaluation means that using something like take k (sort xs) should be efficient. – Adam Oct 2 '13 at 0:52
@Steve314 With GHC's implementation of `sort`, the `take k (sort xs)` trick is asymptotically optimal. – Daniel Wagner Oct 2 '13 at 1:03
@Steve314 This is a win of laziness over strictness, not functional over imperative. See also my answer to this question which tries to explain the core advantage of laziness. – Daniel Wagner Oct 2 '13 at 1:05

Don't make it complicated.

``````f xs = (sort xs !! 1, length xs)
``````

If you choose to make it complicated, make it complicated in the right way.

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I interpreted 'second largest integer' to be in terms of magnitude. I.e. in `[1,1,2,3,3]`, we'd want 2. (psst, your sort order is backwards ;) ). – jtobin Oct 2 '13 at 1:38
As Daniel hasn't fixed this yet - to change the `sort` order, use `sortBy`. Or, in the spirit of the existing code, use something like `reverse . sort \$ xs !! 1`. Or, as `length xs` is being evaluated anyway, use `sort xs !! (length xs - 2)`. – Steve314 Oct 3 '13 at 0:24

Edited to use @ThomasM.DuBuisson's suggestion

You can solve this the same way that you could finding the max: using a fold. Max can be pretty trivially implemented with

``````mymaximum :: Ord a => [a] -> a
mymaximum xs = foldl searcher (head xs) xs
where
searcher :: Ord a => a -> a -> a
searcher a b
| a > b     = a
| otherwise = b
``````

So we can implement it similarly by just keeping up with the two largest values (notice that we have to "seed" the fold with a tuple as well):

``````nextmaximum :: Ord a => [a] -> a
nextmaximum xs = fst \$ foldl searcher (h, h) xs
where
searcher :: (Ord a) => (a, a) -> a -> (a, a)
searcher (s, f) x = (min f (max s x), max f x)
``````
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`searcher (s,f) x = (min f (max s x), max f x)` – Thomas M. DuBuisson Oct 2 '13 at 0:42
@ThomasM.DuBuisson Good suggestion, it'd be faster and it's much simpler. – bheklilr Oct 2 '13 at 0:52
@zip Notice this solution is partial - it will raise an exception if passed a null list. It is easy enough to change this behavior (pattern match the argument to `nextmaximum` and handle the special case), but it isn't clear what you'd like done in this case. – Thomas M. DuBuisson Oct 2 '13 at 1:04
We can simplify, `foldr searcher (head xs) xs == foldr1 searcher xs` – viorior Oct 2 '13 at 7:22

You can just compose individual functions together. This is neither efficient nor robust, but it's sure easy to write:

``````f xs = maximum . filter (< maximum xs) \$ xs
``````
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``````head . (!!1) . group . sortBy (flip compare) \$ [1,1,2,3,4,4,4,5,5,6,6,6,6]
5
``````
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