# Quicksort with 3-way partition

What is QuickSort with a 3-way partition?

Picture an array:

3, 5, 2, 7, 6, 4, 2, 8, 8, 9, 0

A two partition Quick Sort would pick a value, say 4, and put every element greater than 4 on one side of the array and every element less than 4 on the other side. Like so:

3, 2, 0, 2, 4, | 8, 7, 8, 9, 6, 5

A three partition Quick Sort would pick two values to partition on and split the array up that way. Lets choose 4 and 7:

3, 2, 0, 2, | 4, 6, 5, 7, | 8, 8, 9

It is just a slight variation on the regular quick sort.

You continue partitioning each partition until the array is sorted. The runtime is technically nlog3(n) which varies ever so slightly from regular quicksort's nlog2(n).

• +1 for the concise explanation. – cgp Jun 2 '09 at 19:42
• Now the interesting question is: "Under what conditions is a n-way QS better than a m-way QS?" – dmckee Jun 2 '09 at 20:36
• Came across this post while doing my own research... I have to say I half agree with this answer. Yes, it is split into 3 partitions, but there is only ONE pivot, where each partition is either <,=,>. Doing the above partitioning doesn't seem to add any benefits above the standard 2 partition. Just my 2pence for whoever comes by googling. – Daryl Teo Dec 7 '12 at 9:37
• I meant that there are more than 1 partitioning algorithm. The 3 way partitioning (Bentley-McIlroy for example) only have 1 pivot, and is used to deal with duplicate keys. I was not aware of a dual pivot strategy, so I did research into it. =) So your comment helped me out. – Daryl Teo Dec 10 '12 at 2:38
• Indeed, 3-way partitioning can be 1-pivot or 2-pivot - see sorting-algorithms.com/quick-sort-3-way Was not aware about this before – IgorK Mar 2 '13 at 20:03

http://www.sorting-algorithms.com/static/QuicksortIsOptimal.pdf

http://www.sorting-algorithms.com/quick-sort-3-way

I thought the interview question version was also interesting. It asks, are there four partition versions of quicksort...

• This seems to be the correct answer. 3 way quick sort deals with performance when there are many duplicate keys. – Nick Siderakis Sep 19 '12 at 22:15

if you really grind out the math using Akra-Bazzi formula leaving the number of partitions as a parameter, and then optimize over that parameter, you'll find that e ( =2.718...) partitions gives the fastest performance. in practice, however, our language constructs, cpus, etc are all optimized for binary operations so the standard partitioning to two sets will be fastest.

• Ah! Just what I was looking for. Thanks. – dmckee Jun 2 '09 at 22:23
• the standard partitioning to two sets will be fastest - citation needed – Johan Jun 14 '15 at 21:12

I think the 3-way partition is by Djstrka.

Think about an array with elements { 3, 9, 4, 1, 2, 3, 15, 17, 25, 17 }.

Basically you set up 3 partitions: less than, equals to, and greater than a certain pivot. The equal-to partition doesn't need further sorting because all its elements are already equal.

For example, if we pick the first 3 as the pivot, then a 3-way partition using Dijkstra would arrange the original array and return two indices m1 and m2 such that all elements whose index is less than m1 will be lower than 3, all elements whose index is greater than or equal to m1 and less than or equal to m2 will be equal to 3, and all elements whose index is greater than m2 will be bigger than 3.

In this particular case, the resulting array could be { 1, 2, 3, 3, 9, 4, 15, 17, 25, 17 }, and the values m1 and m2 would be m1 = 2 and m2 = 3.

Notice that the resulting array could change depending on the strategy used to partition, but the numbers m1 and m2 would be the same.

• I think this should be the right answer. – J.W. Jun 29 '14 at 17:30

I think it is related to the Dijkstra way of partitioning where the partition is of elemnts smaller, equal, and larger than the pivot. Only the smaller and larger partitions have to be sorted recursively. You can see an interactive visualization and play with it at the walnut. The colors I used there are red/white/blue because the method of partitioning is usually called "the dutch flag problem"

//code to implement Dijkstra 3-way partitioning

package Sorting;

public class QuickSortUsing3WayPartitioning {

private int[]original;
private int length;
private int lt;
private int gt;

public QuickSortUsing3WayPartitioning(int len){
length = len;
//original = new int[length];

original = {0,7,8,1,8,9,3,8,8,8,0,7,8,1,8,9,3,8,8,8};

}

public void swap(int a, int b){ //here indexes are passed
int temp = original[a];
original[a] = original[b];
original[b] = temp;
}

public int random(int start,int end){
return (start + (int)(Math.random()*(end-start+1)));
}

public void partition(int pivot, int start, int end){
swap(pivot,start);  // swapping pivot and starting element in that subarray

int pivot_value = original[start];
lt = start;
gt = end;

int i = start;
while(i <= gt) {

if(original[i] < pivot_value) {
swap(lt, i);
lt++;
i++;
}

if(original[i] > pivot_value) {
swap(gt, i);
gt--;
}
if(original[i] == pivot_value)
i++;
}
}

public void Sort(int start, int end){
if(start < end) {

int pivot = random(start,end); // choose the index for pivot randomly
partition(pivot, start, end); // about index the array is partitioned

Sort(start, lt-1);
Sort(gt+1, end);

}
}

public void Sort(){
Sort(0,length-1);
}

public void disp(){
for(int i=0; i<length;++i){
System.out.print(original[i]+" ");
}
System.out.println();
}

public static void main(String[] args) {

QuickSortUsing3WayPartitioning qs = new QuickSortUsing3WayPartitioning(20);
qs.disp();

qs.Sort();
qs.disp();

}

}
• why not initialize original in one line using {} notation ? Right now, it is ugly looking. – CyprUS Jan 12 '16 at 6:13
• @CyprUS Done, thanks for the suggestion – Sumit Kumar Saha Jan 12 '16 at 6:26
• Please argue in the answer how it answers What is QuickSort with a 3-way partition?. This has also been called the "Dutch flag algorithm" - how about "dual pivot"? – greybeard Jan 12 '16 at 9:03
• @greybeard this dual pivot a.k.a 3 way partitioning problem is a variant of famous "The dutch flag Algorithm" – Sumit Kumar Saha Jan 12 '16 at 9:18