# Some optimization about the code (computing ranks of a vector)?

The following code is a function (performance-critical) to compute tied ranks of a vector:

//The function here is to compute tied-ranks: answers.com/topic/tied-rank
mergeSort(x,inds,ci);
//mergeSort(): to sort vector x of length ci, also returns keys (inds) of x.

int tj=0;
double xi=x[0];

for (int j = 1; j < ci; ++j)
{
if (x[j] > xi)
{
double rankvalue = 0.5 * (j - 1 + tj);

for (int k = tj; k < j; ++k)
{
ranks[inds[k]] = rankvalue;
};

tj = j;
xi = x[j];
};
};

double rankvalue = 0.5 * (ci - 1 + tj);

for (int k = tj; k < ci; ++k)
{
ranks[inds[k]] = rankvalue;
};

The problem is, the supposed performance bottleneck mergeSort(), which is O(NlogN) is several times faster than the other part of codes (which is O(N)), which suggests there is room for huge improvment with the other part of the codes, any advices?

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SO is not a place for code review. Please ask a specific technical question. –  Jens Gustedt Dec 12 '12 at 22:35
The other part of your code looks like it runs in O(N*N) –  andre Dec 12 '12 at 22:38
How? it makes at most N adjustments to the data in the vector. –  user0002128 Dec 12 '12 at 22:41
You could eliminate the loop counter k and use tj for that. That might shave off one or two nanoseconds if it would avoid a register spill. Seriously, though, it could be locality, after the sort, you use x, inds and ranks, they might push each other out of the cache. –  Daniel Fischer Dec 12 '12 at 22:47
@user1748356 you have two for-loops ignoring the if the run-time is [n + n-1 + n-2 + ... + 1] which is O(n^2). Unless you know how often the 'if statement triggers the worse case run time is O(n^2). You should get some what of a speed up if you eliminate the if-statement somehow. –  andre Dec 12 '12 at 22:57
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