If you are going to do this in a constant number of passes over the list, you need a second data structure.

If you have lower and upper bounds for the values in that set and the values are relatively dense, then an array of counters is a good solution.

Otherwise, it is better to use a `Map<Integer, Integer>`

, where the keys are elements of the set and the values are counters.

**Analysis**

If you don't have lower / upper bounds on the set before you start, then you don't know big an array of counters to allocate. So you have to make a preliminary pass over the array to find the bounds ... and you now have a two pass solution.

If you do have lower and upper bounds but the set is sparse, then the cost of initializing the array of counts + the cost of finding the three largest counts will dominate the cost of counting the set elements. If the difference is large enough (i.e. the input is large & very sparse) a HashMap will be faster and will take less memory.

**Alternatively**

If you are allowed to change the array, you can sort it into ascending order `O(NlogN)`

and then find the three most common elements in a single pass over the sorted array.