Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

this is my algorithm that I have written it with my friends (which are in stackoverflow site) this algorithm will find just the first duplicate number and returns it.this works in O(n) I want to complete this algorithm that helps me to get duplicate numbers with their repetition. consider that I have [1,1,3,0,5,1,5] I want this algorithm to return 2 duplicate numbers which are 1 and 5 with their repetition which is 3 and 2 respectively .how can I do this with O(n)?

1   Algorithm Duplicate(arr[1:n],n)
3   {
4      Set s = new HashSet();i:=0;
5      while i<a.size() do
6      {
7          if(!s.add(a[i)) then
8          {
9             return a[i]; //this is a duplicate value!
10            break;
11         }
12         i++;
13      } 
14   }
share|improve this question

3 Answers 3

up vote 1 down vote accepted

You can do this in Java:

List<Integer> num=Arrays.asList(1,1,1,2,3,3,4,5,5,5);
    Map<Integer,Integer> countNum=new HashMap<Integer, Integer>();
    for(int n:num)
        Integer nu;

Instead of iterating each time to get count of duplicate it's better to store the count in map.

share|improve this answer
thanks So your algorithm will be O(n)? –  user472221 Nov 20 '10 at 8:10
yes it's just one loop. –  Emil Nov 20 '10 at 8:23
thanks in advance –  user472221 Nov 20 '10 at 19:03
  1. Use a Map/Dictionary data structure.
  2. Iterate over the list.
  3. For each item in list, do a map lookup. If the key (item) exists, increment its value. If the key doesn't exist, insert the key and initial count.
share|improve this answer
can you write your algorithm really it is hard for me to get,I am beginner in algorithm thanks in advance –  user472221 Nov 20 '10 at 6:51
also it will be O(n^2) am I right? –  user472221 Nov 20 '10 at 7:20
@user472221: Mutable Map and Dictionary data structures usually have amortized worst case step complexity of Θ(1) for insertion, deletion and lookup. So, the total amortized worst case step complexity of @suihock's suggestion will be Θ(n). –  Jörg W Mittag Nov 20 '10 at 13:10

In this particular instance it's not so much about the algorithm, it's about the data structure: a Multiset is like a Set, except it doesn't store only unique items, instead it stores a count of how often each item is in the Multiset. Basically, a Set tells you whether a particular item is in the Set at all, a Multiset in addition also tells you how often that particular item is in the Multiset.

So, basically all you have to do is to construct a Multiset from your Array. Here's an example in Ruby:

require 'multiset'

print Multiset[1,1,3,0,5,1,5]

Yes, that's all there is to it. This prints:

#3 1
#1 3
#1 0
#2 5

If you only want actual duplicates, you simply delete those items with a count less than 2:

print Multiset[1,1,3,0,5,1,5].delete_with {|item, count| count < 2 }

This prints just

#1 3
#2 5

As @suihock mentions, you can also use a Map, which basically just means that instead of the Multiset taking care of the element counting for you, you have to do it yourself:

m = [1,1,3,0,5,1,5].reduce(Hash.new(0)) {|map, item| map.tap { map[item] += 1 }}
print m
# { 1 => 3, 3 => 1, 0 => 1, 5 => 2 }

Again, if you only want the duplicates:

print m.select {|item, count| count > 1 }
# { 1 => 3, 5 => 2 }

But you can have that easier if instead of counting yourself, you use Enumerable#group_by to group the elements by themselves and then map the groupings to their sizes. Lastly, convert back to a Hash:

print Hash[[1,1,3,0,5,1,5].group_by(&->x{x}).map {|n, ns| [n, ns.size] }]
# { 1 => 3, 3 => 1, 0 => 1, 5 => 2 }

All of these have an amortized worst case step complexity of Θ(n).

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.