# Fast algorithm for repeated calculation of percentile?

In an algorithm I have to calculate the 75th percentile of a data set whenever I add a value. Right now I am doing this:

1. Get value `x`
2. Insert `x` in an already sorted array at the back
3. swap `x` down until the array is sorted
4. Read the element at position `array[array.size * 3/4]`

Point 3 is O(n), and the rest is O(1), but this is still quite slow, especially if the array gets larger. Is there any way to optimize this?

UPDATE

Thanks Nikita! Since I am using C++ this is the solution easiest to implement. Here is the code:

``````template<class T>
class IterativePercentile {
public:
/// Percentile has to be in range [0, 1(
IterativePercentile(double percentile)
: _percentile(percentile)
{ }

// Adds a number in O(log(n))
if (_lower.empty() || x <= _lower.front()) {
_lower.push_back(x);
std::push_heap(_lower.begin(), _lower.end(), std::less<T>());
} else {
_upper.push_back(x);
std::push_heap(_upper.begin(), _upper.end(), std::greater<T>());
}

unsigned size_lower = (unsigned)((_lower.size() + _upper.size()) * _percentile) + 1;
if (_lower.size() > size_lower) {
// lower to upper
std::pop_heap(_lower.begin(), _lower.end(), std::less<T>());
_upper.push_back(_lower.back());
std::push_heap(_upper.begin(), _upper.end(), std::greater<T>());
_lower.pop_back();
} else if (_lower.size() < size_lower) {
// upper to lower
std::pop_heap(_upper.begin(), _upper.end(), std::greater<T>());
_lower.push_back(_upper.back());
std::push_heap(_lower.begin(), _lower.end(), std::less<T>());
_upper.pop_back();
}
}

/// Access the percentile in O(1)
const T& get() const {
return _lower.front();
}

void clear() {
_lower.clear();
_upper.clear();
}

private:
double _percentile;
std::vector<T> _lower;
std::vector<T> _upper;
};
``````
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Nice, I had a similar question at an interview recently. Nikita already gave my answer. –  Alexandru Sep 17 '10 at 20:49
@Alexandru: Similar != Same :-) I believe the heap solution is not required here. It might work for this: stackoverflow.com/questions/2213707/…, but I think it is a mis-application here. –  Aryabhatta Sep 18 '10 at 0:04

You can do it with two heaps. Not sure if there's a less 'contrived' solution, but this one provides `O(logn)` time complexity and heaps are also included in standard libraries of most programming languages.

First heap (heap A) contains smallest 75% elements, another heap (heap B) - the rest (biggest 25%). First one has biggest element on the top, second one - smallest.

See if new element `x` is <= `max(A)`. If it is, add it to heap `A`, otherwise - to heap `B`.
Now, if we added `x` to heap A and it became too big (holds more than 75% of elements), we need to remove biggest element from `A` (O(logn)) and add it to heap B (also O(logn)).
Similar if heap B became too big.

1. Finding "0.75 median"

Just take the largest element from A (or smallest from B). Requires O(logn) or O(1) time, depending on heap implementation.

edit
As Dolphin noted, we need to specify precisely how big each heap should be for every n (if we want precise answer). For example, if `size(A) = floor(n * 0.75)` and `size(B)` is the rest, then, for every `n > 0`, `array[array.size * 3/4] = min(B)`.

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but how do you determine if heap A became too big? –  Hari Shankar Sep 17 '10 at 19:47
@Raze2dust Heap A should hold approx 75% of elements. If it's size goes beyond that, it became too big. –  Nikita Rybak Sep 17 '10 at 19:48
@Raze2dust If you mean, "how to get heap size", it's an O(1) operation :) –  Nikita Rybak Sep 17 '10 at 19:51
I think this idea will work, but I think a few changes are necessary. First, one of the heaps should always have the item you are looking for on it. This way you cann figure out what size each heap should be for a given number of elements `heap A=floor(n*.75) and heap B=ceil(n*.25)` (in this case). Next, when you add an item, determine which heap needs to grow. If heap A needs to grow and the item is less than the the top of B, add it to A. Otherwise remove the top of B, add it to A, then add the new item to B. (The remove then add would be more efficient as a modify). –  Dolphin Sep 17 '10 at 20:17
@Dolphin Sorry, I don't completely understand your suggestions. Are you saying that algorithm has mistake? Or it can become simpler or asymptotically faster? –  Nikita Rybak Sep 17 '10 at 20:41

You can use binary search to do find the correct position in O(log n). However, shifting the array up is still O(n).

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A simple Order Statistics Tree is enough for this.

A balanced version of this tree supports O(logn) time insert/delete and access by Rank. So you not only get the 75% percentile, but also the 66% or 50% or whatever you need without having to change your code.

If you access the 75% percentile frequently, but only insert less frequently, you can always cache the 75% percentile element during an insert/delete operation.

Most standard implementations (like Java's TreeMap) are order statistic trees.

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+1 for a useful technique. But you have a mistake: Java's TreeSet (or Map) won't give you tools necessary to iterate from tree root down to leafs. IIRC, STL version too. You'll have to write your own balanced tree or hack someone else's code. Hardly enjoyable. –  Nikita Rybak Sep 18 '10 at 0:13
+1 - But you can't index a Java `TreeSet` by rank. You can use Java's `TreeSet` if the values will not repeat; you just need to keep track of your current 75th percentile and the number of items to the left and to the right. When you add something, place it into the set and update the left/right numbers. If you now have too many on the right, use `higher` to get the next one; if too many on the left, use `lower` to get the previous; if you're okay, don't do anything. If the values repeat, you'll have to create a map from key to some collection (list?), and then a similar trick works. –  Rex Kerr Sep 18 '10 at 2:05
@Nikita: I believe TreeMap has it! Look at the comments to this answer:stackoverflow.com/questions/3071497/…. @Rex, I was talking of TreeMap. Of course I haven't used Java in a while. –  Aryabhatta Sep 18 '10 at 2:36
But Rex's idea should work (although it's not terribly simple to implement) –  Nikita Rybak Sep 18 '10 at 2:46
@Nikita: I am not claiming that you have to traverse the tree yourself. I am claiming that the data structure provides API for accessing/inserting/deleting by position. Anyway I am not so sure about TreeMap now... –  Aryabhatta Sep 18 '10 at 6:06

If you have a known set of values, following will be very fast:

Create a large array of integers (even bytes will work) with number of elements equal to maximum value of your data. For example, if the maximum value of t is 100,000 create an array

``````int[] index = new int[100000]; // 400kb
``````

Now iterate over the entire set of values, as

``````for each (int t : set_of_values) {
index[t]++;
}

// You can do a try catch on ArrayOutOfBounds just in case :)
``````

Now calculate percentile as

``````int sum = 0, i = 0;
while (sum < 0.9*set_of_values.length) {
sum += index[i++];
}

return i;
``````

You can also consider using a TreeMap instead of array, if the values don't confirm to these restrictions.

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