# Haskell: Minimum sum of list

So, I'm new here, and I would like to ask 2 questions about some code:

1. Duplicate each element in list by n times. For example, duplicate `[1,2,3]` should give `[1,2,2,3,3,3]`

``````duplicate1 xs = x*x ++ duplicate1 xs
``````

What is wrong in here?

2. Take positive numbers from list and find the minimum positive subtraction. For example, `[-2,-1,0,1,3]` should give `1` because `(1-0)` is the lowest difference above `0`.

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For the first question: list comprehensions. –  Rafe Kettler May 23 '11 at 19:19
Generally if you have errors in your code, you should either tell us what compile errors you are getting, or if it compiles, what erroneous result you are getting. It also helps if you try to explain why you expected your answer to be correct, or what part of the problem is eluding you. –  Dan Burton May 23 '11 at 20:26

Here, this should do the trick:

``````dup [] = []
dup (x:xs) = (replicate x x) ++ (dup xs)
``````

We define dup recursively: for empty list it is just an empty list, for a non empty list, it is a list in which the first x elements are equal to x (the head of the initial list), and the rest is the list generated by recursively applying the dup function. It is easy to prove the correctness of this solution by induction (do it as an exercise).

Now, lets analyze your initial solution:

``````duplicate1 xs = x*x ++ duplicate1 xs
``````

The first mistake: you did not define the list pattern properly. According to your definition, the function has just one argument - xs. To achieve the desired effect, you should use the correct pattern for matching the list's head and tail (x:xs, see my previous example). Read up on pattern matching.

But that's not all. Second mistake: x*x is actually x squared, not a list of two values. Which brings us to the third mistake: ++ expects both of its operands to be lists of values of the same type. While in your code, you're trying to apply ++ to two values of types `Int` and `[Int]`.

HTH

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Your solution is wrong. The OP wanted to duplicate the element by its number, so `[1,2,3]` becomes `[1,2,2,3,3,3]`. -1 –  FUZxxl May 23 '11 at 20:39
Sorry for my inattentiveness... Corrected. –  user500944 May 24 '11 at 7:05

1) You can use the fact that list is a monad:

``````dup = (=<<) (\x -> replicate x x)
``````

Or in do-notation:

``````dup xs = do x <- xs; replicate x x; return x
``````

2) For getting only the positive numbers from a list, you can use filter:

``````filter (>= 0) [1,-1,0,-5,3]
-- [1,0,3]
``````

To get all possible "pairings" you can use either monads or applicative functors:

``````import Control.Applicative
(,) <\$> [1,2,3] <*> [1,2,3]
[(1,1),(1,2),(1,3),(2,1),(2,2),(2,3),(3,1),(3,2),(3,3)]
``````

Of course instead of creating pairs you can generate directly differences when replacing `(,)` by `(-)`. Now you need to filter again, discarding all zero or negative differences. Then you only need to find the minimum of the list, but I think you can guess the name of that function.

-

• Use pattern matching. You can write something like `duplicate (x:xs)`. This will deconstruct the first cell of the parameter list. If the list is empty, the next pattern is tried:

`````` duplicate (x:xs) = ... -- list is not empty
duplicate []     = ... -- list is empty
``````
• the function `replicate n x` creates a list, that contains `n` items `x`. For instance `replicate 3 'a'` yields `['a','a','a'].

• Use recursion. To understand, how recursion works, it is important to understand the concept of recursion first ;)

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@NeedHelp: The problem is, that I don't really understand the second problem. Maybe you could add some additional informations about what your function is supposed to do. Then I could help you. (You can edit your question by clicking on the edit button below the question's text.) –  FUZxxl May 23 '11 at 20:28

For your first part, there are a few issues: you forgot the pattern in the first argument, you are trying to square the first element rather than replicate it, and there is no second case to end your recursion (it will crash). To help, here is a type signature:

``````replicate :: Int -> a -> [a]
``````

For your second part, if it has been covered in your course, you could try a list comprehension to get all differences of the numbers, and then you can apply the `minimum` function. If you don't know list comprehensions, you can do something similar with `concatMap`.

Don't forget that you can check functions on http://www.haskell.org/hoogle/ (Hoogle) or similar search engines.

Tell me if you need a more thorough answer.

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1)

``````dupe :: [Int] -> [Int]
dupe l = concat [replicate i i | i<-l]
``````

Theres a few problems with yours, one being that you are squaring each term, not creating a new list. In addition, your pattern matching is off and you would create am infinite recursion. Note how you recurse on the exact same list as was input. I think you mean something along the lines of `duplicate1 (x:xs) = (replicate x x) ++ duplicate1 xs` and that would be fine, so long as you write a proper base case as well.

2)

This is pretty straight forward from your problem description, but probably not too efficient. First filters out negatives, thewn checks out all subtractions with non-negative results. Answer is the minumum of these

``````p2 l = let l2 = filter (\x -> x >= 0) l
in minimum [i-j | i<-l2, j<-l2, i >= j]
``````

Problem here is that it will allow a number to be checkeed against itself, whichwiull lend to answers of always zero. Any ideas? I'd like to leave it to you, commenter has a point abou t spoon-feeding.

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No upvote for spoon feeding. –  FUZxxl May 23 '11 at 19:30
Are you sure that code is right? p2 l = let l2 = filter (\x -> x >= 0) l in minimum [i-j | i<-l2, j<-l2, i >= j] I t wont work for me And there arent many duplicate items in the list, so I dont have to worry about that –  NeedHelp May 23 '11 at 20:58
2 is certainly wrong, ive acknowledged so. it considers the case where i==j. still, its a start –  jon_darkstar May 24 '11 at 0:36