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Unique random numbers in O(1)?
Unique random numbers in an integer array in the C programming language

I have a std::vector of unique elements of some undetermined size. I want to fetch 20 unique and random elements from this vector. By 'unique' I mean that I do not want to fetch the same index more than once. Currently the way I do this is to call std::random_shuffle. But this requires me to shuffle the entire vector (which may contain over 1000 elements). I don't mind mutating the vector (I prefer not to though, as I won't need to use thread locks), but most important is that I want this to be efficient. I shouldn't be shuffling more than I need to.

Note that I've looked into passing in a partial range to std::random_shuffle but it will only ever shuffle that subset of elements, which would mean that the elements outside of that range never get used!

Help is appreciated. Thank you!

Note: I'm using Visual Studio 2005, so I do not have access to C++11 features and libraries.

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marked as duplicate by WhozCraig, chill, Praveen Kumar, Mike Kwan, Jean-François Corbett Dec 9 '12 at 21:02

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

    
already asked a lot of times, search for 'unique random numbers'... stackoverflow.com/questions/1608181/… stackoverflow.com/questions/2502386/… –  dreamzor Dec 7 '12 at 23:14
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4 Answers

up vote 4 down vote accepted

Use a loop to put random index numbers into a std::set and stop when the size() reaches 20.

std::set<int> indexes;
std::vector<my_vector::value_type> choices;
int max_index = my_vector.size();
while (indexes.size() < min(20, max_index))
{
    int random_index = rand() % max_index;
    if (indexes.find(random_index) == indexes.end())
    {
        choices.push_back(my_vector[random_index]);
        indexes.insert(random_index);
    }
}

The random number generation is the first thing that popped into my head, feel free to use something better.

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Are you sure it well be a true uniform distribution? ;) –  dreamzor Dec 7 '12 at 23:12
1  
That would be a potentially infinite loop. –  Joseph Mansfield Dec 7 '12 at 23:12
    
@sftrabbit I figured that out as I was filling in example code. I hope I've fixed it to your satisfaction. –  Mark Ransom Dec 7 '12 at 23:16
    
@sftrabbit: only when the value array is too small, in which case the OP's desired selection isn't possible anyway. –  leftaroundabout Dec 7 '12 at 23:16
    
@Mark Random, leftaroundabout I think that he means that, in general, you can not guarantee that such an algorithm finishes within any given time (thus a potentially infinite loop), unlike the solutions in the other answers –  catchmeifyoutry Dec 7 '12 at 23:22
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You want a random sample of size m from an n-vector:

Let rand(a) return 0..a-1 uniform

for (int i = 0; i < m; i++)
    swap(X[i],X[i+rand(n-i)]);

X[0..m-1] is now a random sample.

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You can use Fisher Yates http://en.wikipedia.org/wiki/Fisher%E2%80%93Yates_shuffle

The Fisher–Yates shuffle (named after Ronald Fisher and Frank Yates), also known as the Knuth shuffle (after Donald Knuth), is an algorithm for generating a random permutation of a finite set—in plain terms, for randomly shuffling the set. A variant of the Fisher–Yates shuffle, known as Sattolo's algorithm, may be used to generate random cycles of length n instead. Properly implemented, the Fisher–Yates shuffle is unbiased, so that every permutation is equally likely. The modern version of the algorithm is also rather efficient, requiring only time proportional to the number of items being shuffled and no additional storage space. The basic process of Fisher–Yates shuffling is similar to randomly picking numbered tickets out of a hat, or cards from a deck, one after another until there are no more left. What the specific algorithm provides is a way of doing this numerically in an efficient and rigorous manner that, properly done, guarantees an unbiased result.

I think this pseudocode should work (there is a chance of an off-by-one mistake or something so double check it!):

std::list chosen; // you don't have to use this since the chosen ones will be in the back of the vector
for(int i = 0; i < num; ++i) {
  int index = rand_between(0, vec.size() - i - 1);
  chosen.push_back(vec[index]);
  swap(vec[index], vec[vec.size() - i - 1]);
}
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Why the downvote? –  Pubby Dec 7 '12 at 23:16
    
Everyone has one. Hmmmmm... –  chris Dec 7 '12 at 23:16
    
@AndrewTomazos-Fathomling What? It's only shuffling num times where num is the number of random uniques you want. –  Pubby Dec 7 '12 at 23:21
    
But on every iteration you don't chose an element with equal probability, right? Does it have a uniform distribution, then? –  dreamzor Dec 7 '12 at 23:22
1  
@dreamzor Every permutation has equal probability. –  Pubby Dec 7 '12 at 23:24
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#include <iostream>
#include <vector>
#include <algorithm>

template<int N>
struct NIntegers {
  int values[N];
};
template<int N, int Max, typename RandomGenerator>
NIntegers<N> MakeNRandomIntegers( RandomGenerator func ) {
  NIntegers<N> result;
  for(int i = 0; i < N; ++i)
  {
    result.values[i] = func( Max-i );
  }
  std::sort(&result.values[0], &result.values[0]+N);
  for(int i = 0; i < N; ++i)
  {
    result.values[i] += i;
  }
  return result;
};

Use example:

// use a better one:
int BadRandomNumberGenerator(int Max) {
  return Max>4?4:Max/2;
}
int main() {
  NIntegers<100> result = MakeNRandomIntegers<100, 500>( BadRandomNumberGenerator );
  for (int i = 0; i < 100; ++i) {
    std::cout << i << ":" << result.values[i] << "\n";
  }
}

make each number 1 smaller in max than the last. Sort them, then bump up each value by the number of integers before it.

template stuff is just trade dress.

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