Check if an array element is a sum of two earlier elements using recursion

I was solving practice questions from a book when I stumbled upon this one :

*Describe a recursive algorithm that will check if an array A of integers contains an integer A[i] that is the sum of two integers that appear earlier in A, that is, such that

`````` A[i] = A[j] +A[k] for j,k < i.
``````

*

I have been thinking about this for a few hours but haven't been able to come up with a good recursive algorithm.

-
You formula allows j and k to be the same element, is that on purpose? –  harold Aug 29 '11 at 6:24
I just copied the statement as it is from the book. But i guess both should not be same. –  vjain27 Aug 31 '11 at 2:46

A recursive solution without any loops (pseudocode):

``````bool check (A, i, j, k)
if (A[j] + A[k] == A[i])
return true
else
if      (k + 1 < j)      return check (A, i, j, k + 1)
else if (j + 1 < i)      return check (A, i, j + 1, 0)
else if (i + 1 < A.size) return check (A, i + 1, 1, 0)
else                     return false
``````

The recursive function is called with `check(A, 2, 1, 0)`. To highlight the main part of the algorithm it does not check if the array initially has more than two elements.

-

In python. The first function (search is less efficient O(n3)), but it also gives the j and k, the second one is more efficient (O(n2)), but only returns i.

``````def search(A, i):
for j in xrange(i):
for k in xrange(i):
if A[i] == (A[j] + A[k]):
return i, j, k

if i > 0:
return search(A, i - 1)

def search2(A, i, sums):
if A[i] in sums:
return i

if i == len(A) - 1:
return None

for j in range(i + 1):
return search2(A, i + 1, sums)

if __name__ == '__main__':
print search([1, 4, 3], 2)
print search([1, 3, 4], 2)

print search2([1, 4, 3], 0, set())
print search2([1, 3, 4], 0, set())
``````

It will print:

``````None
(2, 0, 1)
None
2
``````
-

This algorithm should be fairly efficient (well, O(n2)):

``````import Data.Set (Set, empty, fromList, member, union)

-- Helper function (which does all the work)
hassum' :: (Ord a, Num a) => Set a -> [a] -> [a] -> Bool
-- Parameters:
--   1. All known sums upto the current element
--   2. The already handles elements
--   3. The not yet checked elements

-- If there are no elements left to check, there is no sum
hassum' _    _    []     = False
-- Otherwise...
hassum' sums done (x:xs)
-- Check if the next element is a known sum
| x `member` sums     = True
-- Otherwise calculate new possible sums and check the remaining elements
| otherwise           = hassum' sums' done' xs
where sums' = sums `union` fromList [x+d | d <- done]
done' = x:done

-- Main function
hassum :: (Ord a, Num a) => [a] -> Bool
hassum as = hassum' empty [] as
``````

I hope you can make sense of it even if you might not know Haskell.

-
Thanks but I don't understand haskell so even from the comments i am not able to make out what the function is doing.If you could describe in text it would be great. –  vjain27 Aug 29 '11 at 5:53

Not very efficient but..

``````search(A, j, k) {
for (int i = 0; i < A.length; i++) {
if (A[i] == A[j] + A[k]) {
return i;
}
}
if (k + 1 == A.length) {
if (j + 1 < A.length) {
return search(A, j + 1, 0);
}
``````search(A, 0, 0);