# Memoization in limited space

While trying to increase the speed for my answer for this contest, I have a function which takes two values `n` and `k` and produces an output. The calculations are repeated, so I'm memoizing it. I can't use a 2D array, since the constraints for `n` and `k` are `10^5`! So I'm using a map:

``````std::map<std::pair<int,int>,double> m;

double solve(int n, int k)
{
if(k==0) return n;
if(k==1) return (n-1)/2.0;

std::pair<int,int> p = std::make_pair(n,k);
std::map<std::pair<int,int>,double>::iterator it;

if( (it=m.find(p)) != m.end())
return it->second;

double ans = 0;
for(int i=1 ; i<=n-1 ; i++)
ans += solve(i,k-1);
ans = ans/n;
m[p] = ans;

return ans;
}
``````

But apparently, this approach is way too slow. Is there some problem with my memoization? Or can I get constant time fetches like an array instead of logarithmic fetches from a map?

This function solves this recurrence:

`f(x,0) = x` and `f(x,1) = (x-1)/2`

Can this be solved in a better way? Thanks a lot in advance.

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"Apparently"?.. –  Oliver Charlesworth Mar 6 '13 at 19:26
unordered_map would help, but you are doing at least twice more lookups than necessary. –  Slava Mar 6 '13 at 19:34
I think for this code you'd get a lot more out of analyzing the logic than merely caching the results. A brief glance makes me think you should be able to calculate this in O(1) instead of the O(n*k) you have here. –  Mooing Duck Mar 6 '13 at 19:38
Given that `if (k<n-1)` then the result is zero, there's some serious optimization that can be done for those cases. Also, `map` takes more space than a 2d array for the same data range unless it's sparse, but a quick analysis shows your data won't be sparse. So either (A) use a 2d array, or (B) only cache sparcely. –  Mooing Duck Mar 6 '13 at 19:53
@Bruce The recurrence and the code differ. Does i start at 0 or at 1? And what about y < 2? Can I assume this is defined as it is implemented in code? –  SebastianK Mar 6 '13 at 19:59

Minor improvement: Remember the iterator returned by find and dereference it instead of using operator[].

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Should've made a comment instead! I was looking for more logical improvements.. –  Bruce Mar 6 '13 at 19:41
That's probably quite a major improvement. Lookups in a map are reasonably expensive. –  Alex Chamberlain Mar 6 '13 at 19:44
@us2012 I apologize for that, didn't mean it. I thought it was minor, since SebastianK himself said it was. –  Bruce Mar 6 '13 at 19:47
@AlexChamberlain Minor, because I guess that a way larger improvement can be achieved by simplifying the recurrence. –  SebastianK Mar 6 '13 at 19:49
Also cases for k == 0 and k == 1 should not be cached, that does more harm than help. –  Slava Mar 6 '13 at 19:57

You don't have to store a two-dimensional array of values. Instead of memoization, turn the problem around and use dynamic programming instead.

To save some time, note that `f(x, y) = 0` if `x <= y`.

Calculate the values of `f(i, 0)` for `1 <= i <= x - k` and store them into a one-dimensional array. Then calculate `f(i, 1)` for `2 <= i <= x - k + 1`, `f(i, 2)` for `3 <= i <= x - k + 2`, and so on, until you get `f(i, k - 1)` for `k <= i <= x - 1`. Then you can calculate `f(x, k)`. At each step, you only need two arrays of length `x - k`.

Calculating `f(i, j)` takes `i - j - 1` additions and a division. so the total time is ϴ((x - k)2 k). But it's faster if you compute the sums first and then divide, because each sum is just one element more than the previous, so then the total time is ϴ((x - k) k).

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I think this is a lot more additions than you claim, in fact, I think it's i*k additions and divisions. –  Mooing Duck Mar 7 '13 at 22:40