# 0-1 Knapsack on infinite integer array?

`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

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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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

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;
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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