# implement DP for a recursive function

I have the following recursive function:

``````typedef unsigned long long ull;

ull calc(ull b, ull e)
{
if (!b) return e;
if (!e) return b;
return calc(b - 1, e - 1) + calc(b - 1, e) - calc(b, e - 1);
}
``````

I want to implement it with dynamic programming (i.e. using storage). I have tried to use a `map<pair<ull, ull>, ull>` but it is too slow also. I couldn't implement it using arrays `O(1)` too.

I want to find a solution so that this function solves quickly for large `b, e`s.

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I'm not sure I get the question right, so could you clarify what exactly do you want: do you want to get rid of the recursion, or do you just want to change the way you store data? –  SingerOfTheFall Jul 3 '12 at 7:15
@SingerOfTheFall I understand recursion, but I want to speed this function up –  Desolator Jul 3 '12 at 7:17
The obvious optimization is to use a cache, possibly implemented as a hash map. –  Philip Jul 3 '12 at 7:17
can't you do it this way DP[0][e] = e DP[b][0] = b and then DP[b][e] = DP[b-1][e-1] + DP[b-1][e] - DP[b][e-1] –  sukunrt Jul 3 '12 at 7:17
Oh sorry, got your point! –  sukunrt Jul 3 '12 at 7:18

If a bottom up representation is what you want then this would do fine.

Fill up the table as MBo has shown

This can be done as:

``````for e from 0 to n:
DP[0][e] = e
for b from 0 to n:
DP[b][0] = b
for i from 1 to n:
for j from 1 to n:
DP[i][j] = DP[i-1][j-1] + DP[i-1][j] - DP[i][j-1]
``````

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DP[0][0] once == e and then == b ?? –  Desolator Jul 3 '12 at 7:26
Both the times it's 0. Doesn't make a difference. –  sukunrt Jul 3 '12 at 7:28
The code looks neat too. :) –  sukunrt Jul 3 '12 at 7:28

Make a table b/e and fill it cell by cell. This is DP with space and time complexity O(MaxB*MaxE).

Space complexity may be reduced with Ante's proposal in comment - store only two needed rows or columns.

``````0 1 2 3 4 5
1 0 3 . . .
2 . . . . .
3 . . . . .
4 . . . . .
``````
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beat me by about 15 seconds :). –  user1168577 Jul 3 '12 at 7:23
It is enough to store current and last row or column. Space required is O(min(MaxB,MaxE)). –  Ante Jul 5 '12 at 18:21
You are right. I've missed it –  MBo Jul 5 '12 at 19:31

You might want to take a look at this recent blog posting on general purpose automatic memoization. The author discusses various data structures, such `std::map`, `std::unordered_map` etc. Warning: uses template-heavy code.

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You can implement in O(n^2) (assuming n as max number of values for b and e ) by using a 2 dimensional array. Each current value for i,j would depend on the value at i-1,j and i-1,j-1 and i,j-1. Make sure you handle cases for i=0, j=0.

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Ok, if we look at b, e they can be in 3 cases: b > e, b < e, b == e. At 3 cases, we cannot guarantee that a value exists in DP[0][0]? –  Desolator Jul 3 '12 at 7:23
You are doing this bottom up so this condition won't happen. Can you explain with an example? –  user1168577 Jul 3 '12 at 7:26