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Given an infinite positive integer array or say a stream of positive integers, find out the first five numbers whose sum is twenty.

By reading the problem statement, it first seems to be 0-1 Knapsack problem, but I am confused that can 0-1 Knapsack algo be used on a stream of integers. Let suppose I write a recursive program for the above problem.

int knapsack(int sum, int count, int idx)
{
    if (sum == 0 && count == 0)
        return 1;

    if ((sum == 0 && count != 0) || (sum != 0 && count == 0))
        return 0;

    if (arr[idx] > 20) //element cann't be included.
        return knapsack(sum, count idx + 1);

    return max(knapsack(sum, count, idx +1), knapsack(sum - arr[idx], count -1, idx + 1));
} 

Now when the above function will call on an infinite array, the first call in max function i.e. knapsack(sum, count, idx +1) will never return as it will keep on ignoring the current element. Even if we change the order of the call in max function, there is still possibility that the first call will never return. Is there any way to apply knapsack algo in such scenarios?

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are you looking for the first five consecutive numbers whose sum is 20? –  Davidann May 13 '12 at 5:22
    
This is harder than the knapsack problem. We have an additional constraint: we must find the earliest combination of numbers whose sum is twenty. In other words, we must consider multiple knapsacks: the first 5 elements, then the first 6, then the first 7, etc. –  cheeken May 13 '12 at 5:27
    
@David: no... there is no such condition... –  Ravi Gupta May 13 '12 at 5:28
    
@cheeken You can find the earliest combination provided integers are positive. See my answer below. –  ElKamina May 13 '12 at 5:34
    
@ElKamina: yes, integers are positive ... i will update the question. –  Ravi Gupta May 13 '12 at 5:45

2 Answers 2

This works if you are working with only positive integers.

Basically keep a list of ways you can reach any of the first 20 numbers and whenever you process a new number process this list accordingly.

def update(dictlist, num):
    dk = dictlist.keys()
    for i in dk:
        if i+num <=20:
            for j in dictlist[i]:
                listlen = len(dictlist[i][j]) + 1
                if listlen >5:
                    continue
                if i+num not in dictlist or listlen not in dictlist[i+num]:
                    dictlist[i+num][listlen] = dictlist[i][j]+[num]
    if num not in dictlist:
        dictlist[num]= {}
    dictlist[num][1] = [num]
    return dictlist

dictlist = {}
for x in infinite_integer_stream:
    dictlist = update(dictlist,x)
    if 20 in dictlist and 5 in dictlist[20]:
        print dictlist[20][5]
        break

This code might have some minor bugs and I do not have time now to debug it. But basically dictlist[i][j] stores a j length list that sums to i.

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1  
Hmm, where are you imposing the 5-element constraint? –  cheeken May 13 '12 at 5:39
    
@cheeken I missed that part. The updated answer should handle it. –  ElKamina May 13 '12 at 5:50

Delphi code:

var
  PossibleSums: array[1..4, 0..20] of Integer;
  Value, i, j: Integer;
  s: string;
begin
  s := '';
  for j := 1 to 4 do
    for i := 0 to 20 do
      PossibleSums[j, i] := -1;
  while True do begin
    Value := 1 + Random(20); // stream emulation
    Memo1.Lines.Add(IntToStr(Value));

    if PossibleSums[4, 20 - Value] <> -1 then begin
    //we just have found 5th number to make the full sum
      s := IntToStr(Value);
      i := 20 - Value;
      for j := 4 downto 1 do begin
        //unwind storage chain
        s := IntToStr(PossibleSums[j, i]) + ' ' + s;
        i := i - PossibleSums[j, i];
      end;
      Memo1.Lines.Add(s);
      Break;
    end;

    for j := 3 downto 1 do
      for i := 0 to 20 - Value do
        if (PossibleSums[j, i] <> -1) and (PossibleSums[j + 1, i + Value] = -1) then
          PossibleSums[j + 1, i + Value] := Value;

    if PossibleSums[1, Value] = -1 then
      PossibleSums[1, Value] := Value;
  end;
end; 

output:

4
8
9
2
10
2
17
2
4 2 10 2 2
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