# Generating permutations of a set (most efficiently)

I would like to generate all permutations of a set (a collection), like so:

``````Collection: 1, 2, 3
Permutations: {1, 2, 3}
{1, 3, 2}
{2, 1, 3}
{2, 3, 1}
{3, 1, 2}
{3, 2, 1}
``````

This isn't a question of "how", in general, but more about how most efficiently. Also, I wouldn't want to generate ALL permutations and return them, but only generating a single permutation, at a time, and continuing only if necessary (much like Iterators - which I've tried as well, but turned out to be less efficient).

I've tested many algorithms and approaches and came up with this code, which is most efficient of those I tried:

``````public static bool NextPermutation<T>(T[] elements) where T : IComparable<T>
{
// More efficient to have a variable instead of accessing a property
var count = elements.Length;

// Indicates whether this is the last lexicographic permutation
var done = true;

// Go through the array from last to first
for (var i = count - 1; i > 0; i--)
{
var curr = elements[i];

// Check if the current element is less than the one before it
if (curr.CompareTo(elements[i - 1]) < 0)
{
continue;
}

// An element bigger than the one before it has been found,
// so this isn't the last lexicographic permutation.
done = false;

// Save the previous (bigger) element in a variable for more efficiency.
var prev = elements[i - 1];

// Have a variable to hold the index of the element to swap
// with the previous element (the to-swap element would be
// the smallest element that comes after the previous element
// and is bigger than the previous element), initializing it
// as the current index of the current item (curr).
var currIndex = i;

// Go through the array from the element after the current one to last
for (var j = i + 1; j < count; j++)
{
// Save into variable for more efficiency
var tmp = elements[j];

// Check if tmp suits the "next swap" conditions:
// Smallest, but bigger than the "prev" element
if (tmp.CompareTo(curr) < 0 && tmp.CompareTo(prev) > 0)
{
curr = tmp;
currIndex = j;
}
}

// Swap the "prev" with the new "curr" (the swap-with element)
elements[currIndex] = prev;
elements[i - 1] = curr;

// Reverse the order of the tail, in order to reset it's lexicographic order
for (var j = count - 1; j > i; j--, i++)
{
var tmp = elements[j];
elements[j] = elements[i];
elements[i] = tmp;
}

// Break since we have got the next permutation
// The reason to have all the logic inside the loop is
// to prevent the need of an extra variable indicating "i" when
// the next needed swap is found (moving "i" outside the loop is a
// bad practice, and isn't very readable, so I preferred not doing
// that as well).
break;
}

// Return whether this has been the last lexicographic permutation.
return done;
}
``````

It's usage would be sending an array of elements, and getting back a boolean indicating whether this was the last lexicographical permutation or not, as well as having the array altered to the next permutation.

Usage example:

``````var arr = new[] {1, 2, 3};

PrintArray(arr);

while (!NextPermutation(arr))
{
PrintArray(arr);
}
``````

The thing is that I'm not happy with the speed of the code.

Iterating over all permutations of an array of size 11 takes about 4 seconds. Although it could be considered impressive, since the amount of possible permutations of a set of size 11 is `11!` which is nearly 40 million.

Logically, with an array of size 12 it will take about 12 times more time, since `12!` is `11! * 12`, and with an array of size 13 it will take about 13 times more time than the time it took with size 12, and so on.

So you can easily understand how with an array of size 12 and more, it really takes a very long time to go through all permutations.

And I have a strong hunch that I can somehow cut that time by a lot (without switching to a language other than C# - because compiler optimization really does optimize pretty nicely, and I doubt I could optimize as good, manually, in Assembly).

Does anyone know any other way to get that done faster? Do you have any idea as to how to make the current algorithm faster?

Note that I don't want to use an external library or service in order to do that - I want to have the code itself and I want it to be as efficient as humanly possible.

Thanks for reading everything! :)

-
Generating all permutations cannot be done faster than the number of permutations. – nhahtdh Jun 26 '12 at 13:33
I'm confused by this line: "but only generating a single permutation, at a time, and continuing only if necessary". What is your goal? – Emil Vikström Jun 26 '12 at 13:34
Is the set to contain only unique elements? – Lieven Keersmaekers Jun 26 '12 at 13:40
Btw, since the thing you're doing is inherently `O(n!)`-ish, there will always be a quite small number for which you're saying, "it takes a few seconds to do M, but M+1 will take M+1 times as long". Even if you could speed your code up a million times, you'd only get from 12 to 17. Would that make you a million times happier? – Steve Jessop Jun 26 '12 at 13:42
@DaveBish How does that help me? This generates combinations, not permutations. – SimpleVar Jun 26 '12 at 16:47

This might be what you're looking for.

``````    private static bool NextPermutation(int[] numList)
{
/*
Knuths
1. Find the largest index j such that a[j] < a[j + 1]. If no such index exists, the permutation is the last permutation.
2. Find the largest index l such that a[j] < a[l]. Since j + 1 is such an index, l is well defined and satisfies j < l.
3. Swap a[j] with a[l].
4. Reverse the sequence from a[j + 1] up to and including the final element a[n].

*/
var largestIndex = -1;
for (var i = numList.Length - 2; i >= 0; i--)
{
if (numList[i] < numList[i + 1]) {
largestIndex = i;
break;
}
}

if (largestIndex < 0) return false;

var largestIndex2 = -1;
for (var i = numList.Length - 1 ; i >= 0; i--) {
if (numList[largestIndex] < numList[i]) {
largestIndex2 = i;
break;
}
}

var tmp = numList[largestIndex];
numList[largestIndex] = numList[largestIndex2];
numList[largestIndex2] = tmp;

for (int i = largestIndex + 1, j = numList.Length - 1; i < j; i++, j--) {
tmp = numList[i];
numList[i] = numList[j];
numList[j] = tmp;
}

return true;
}
``````
-
This is a tiny bit faster than my implementation, thank you very much! I still expect an improvement to be a lot more significant - which would probably mean an alteration in the algorithm itself. +1 for valid answer, though! – SimpleVar Jun 26 '12 at 13:56
Testing for an array of size 12 shows that my implementation took 46 seconds, while yours took 43, so even though you beat me by 3 seconds, I'm looking for a way to half the time, at the very least. – SimpleVar Jun 26 '12 at 14:52
3 seconds is an eternity on SO... ;) One way to improve significantly would be to parallelize the algorithm. But that is not always applicable. But have a look here: scidok.sulb.uni-saarland.de/volltexte/2005/397/pdf/… – Sani Huttunen Jun 26 '12 at 14:56
@YoryeNathan and you owe the readers "I think I will post an article somewhere of my work." – colinfang Apr 30 '13 at 0:54
@YoryeNathan, Code, or it didn't happen. – Christoffer Lette Jan 24 '14 at 16:37

Well, if you can handle it in C and then translate to your language of choice, you can't really go much faster than this, because the time will be dominated by `print`:

``````void perm(char* s, int n, int i){
if (i >= n-1) print(s);
else {
perm(s, n, i+1);
for (int j = i+1; j<n; j++){
swap(s[i], s[j]);
perm(s, n, i+1);
swap(s[i], s[j]);
}
}
}

perm("ABC", 3, 0);
``````
-
That was one of the first algorithms I came up with and tried, but it isn't the fastest. My current implementation is faster. – SimpleVar Jun 26 '12 at 18:37
@Yorye: Well, as I said, nearly all the time is in print. If you just comment out the print, you will see how much time the algorithm itself takes. In C#, where you are encouraged to make collection classes, iterators, and do all kinds of memory allocation, any good algorithm can be made slow as molasses. – Mike Dunlavey Jun 26 '12 at 18:40
The speed testing is without printing - only going through the permutations. The algorithm itself is slower than mine. I only use integers and arrays in my implementation. – SimpleVar Jun 26 '12 at 18:44
Great answer. Translated that without issue into C# (working on ref int[]). – AlainD Sep 1 '14 at 22:35
This is the best algorithm, small, clean, no mutexes, great one, thanks! – Lu4 Sep 6 '14 at 6:24

Here is a generic permutation finder that will iterate through every permutation of a collection and call an evalution function. If the evalution function returns true (it found the answer it was looking for), the permutation finder stops processing.

``````public class PermutationFinder<T>
{
private T[] items;
private Predicate<T[]> SuccessFunc;
private bool success = false;
private int itemsCount;

public void Evaluate(T[] items, Predicate<T[]> SuccessFunc)
{
this.items = items;
this.SuccessFunc = SuccessFunc;
this.itemsCount = items.Count();

Recurse(0);
}

private void Recurse(int index)
{
T tmp;

if (index == itemsCount)
success = SuccessFunc(items);
else
{
for (int i = index; i < itemsCount; i++)
{
tmp = items[index];
items[index] = items[i];
items[i] = tmp;

Recurse(index + 1);

if (success)
break;

tmp = items[index];
items[index] = items[i];
items[i] = tmp;
}
}
}
}
``````

Here is a simple implementation:

``````class Program
{
static void Main(string[] args)
{
new Program().Start();
}

void Start()
{
string[] items = new string[5];
items[0] = "A";
items[1] = "B";
items[2] = "C";
items[3] = "D";
items[4] = "E";
new PermutationFinder<string>().Evaluate(items, Evaluate);
}

public bool Evaluate(string[] items)
{
Console.WriteLine(string.Format("{0},{1},{2},{3},{4}", items[0], items[1], items[2], items[3], items[4]));
bool someCondition = false;

if (someCondition)
return true;  // Tell the permutation finder to stop.

return false;
}
}
``````
-
High quality code! Thanks for sharing – SimpleVar Jun 17 '13 at 19:48
I saved items.Count to a variable. The code as posted now takes ~ .55 seconds to iterate a list of ten items. The code in the original post takes ~ 2.22 seconds for the same list. – Sam Jun 17 '13 at 20:17
For a list of 12 items (39,916,800 permutations) this code takes ~ 1 min 13 seconds vs. ~ 2 min 40 seconds for code in the original post. – Sam Jun 17 '13 at 20:41
My current code is ~1.3-1.5sec for 11 elements. The fact is, you're doing `2N!` swaps when the minimum required swaps are `N!`. – SimpleVar Jun 17 '13 at 21:32
This algorithm is ~3 times slower than my implementation of Knuth's. On 12 elements it takes 33169ms compared to 11941ms. The order isn't strictly lexicographical either. – Sani Huttunen Jun 19 '13 at 7:26

Here is the fastest implementation I ended up with:

``````public class Permutations
{
private readonly Mutex _mutex = new Mutex();

private Action<int[]> _action;
private Action<IntPtr> _actionUnsafe;
private unsafe int* _arr;
private IntPtr _arrIntPtr;
private unsafe int* _last;
private unsafe int* _lastPrev;
private unsafe int* _lastPrevPrev;

public int Size { get; private set; }

public bool IsRunning()
{
return this._mutex.SafeWaitHandle.IsClosed;
}

public bool Permutate(int start, int count, Action<int[]> action, bool async = false)
{
return this.Permutate(start, count, action, null, async);
}

public bool Permutate(int start, int count, Action<IntPtr> actionUnsafe, bool async = false)
{
return this.Permutate(start, count, null, actionUnsafe, async);
}

private unsafe bool Permutate(int start, int count, Action<int[]> action, Action<IntPtr> actionUnsafe, bool async = false)
{
if (!this._mutex.WaitOne(0))
{
return false;
}

var x = (Action)(() =>
{
this._actionUnsafe = actionUnsafe;
this._action = action;

this.Size = count;

this._arr = (int*)Marshal.AllocHGlobal(count * sizeof(int));
this._arrIntPtr = new IntPtr(this._arr);

for (var i = 0; i < count - 3; i++)
{
this._arr[i] = start + i;
}

this._last = this._arr + count - 1;
this._lastPrev = this._last - 1;
this._lastPrevPrev = this._lastPrev - 1;

*this._last = count - 1;
*this._lastPrev = count - 2;
*this._lastPrevPrev = count - 3;

this.Permutate(count, this._arr);
});

if (!async)
{
x();
}
else
{
new Thread(() => x()).Start();
}

return true;
}

private unsafe void Permutate(int size, int* start)
{
if (size == 3)
{
this.DoAction();
Swap(this._last, this._lastPrev);
this.DoAction();
Swap(this._last, this._lastPrevPrev);
this.DoAction();
Swap(this._last, this._lastPrev);
this.DoAction();
Swap(this._last, this._lastPrevPrev);
this.DoAction();
Swap(this._last, this._lastPrev);
this.DoAction();

return;
}

var sizeDec = size - 1;
var startNext = start + 1;
var usedStarters = 0;

for (var i = 0; i < sizeDec; i++)
{
this.Permutate(sizeDec, startNext);

usedStarters |= 1 << *start;

for (var j = startNext; j <= this._last; j++)
{
var mask = 1 << *j;

{
Swap(start, j);
break;
}
}
}

this.Permutate(sizeDec, startNext);

if (size == this.Size)
{
this._mutex.ReleaseMutex();
}
}

private unsafe void DoAction()
{
if (this._action == null)
{
if (this._actionUnsafe != null)
{
this._actionUnsafe(this._arrIntPtr);
}

return;
}

var result = new int[this.Size];

fixed (int* pt = result)
{
var limit = pt + this.Size;
var resultPtr = pt;
var arrayPtr = this._arr;

while (resultPtr < limit)
{
*resultPtr = *arrayPtr;
resultPtr++;
arrayPtr++;
}
}

this._action(result);
}

private static unsafe void Swap(int* a, int* b)
{
var tmp = *a;
*a = *b;
*b = tmp;
}
}
``````

Usage and testing performance:

``````var perms = new Permutations();

var sw1 = Stopwatch.StartNew();

perms.Permutate(0,
11,
(Action<int[]>)null); // Comment this line and...
//PrintArr); // Uncomment this line, to print permutations

sw1.Stop();
Console.WriteLine(sw1.Elapsed);
``````

Printing method:

``````private static void PrintArr(int[] arr)
{
Console.WriteLine(string.Join(",", arr));
}
``````

Going deeper:

I did not even think about this for a very long time, so I can only explain my code so much, but here's the general idea:

1. Permutations aren't lexicographic - this allows me to practically perform less operations between permutations.
2. The implementation is recursive, and when the "view" size is 3, it skips the complex logic and just performs 6 swaps to get the 6 permutations (or sub-permutations, if you will).
3. Because the permutations aren't in a lexicographic order, how can I decide which element to bring to the start of the current "view" (sub permutation)? I keep record of elements that were already used as "starters" in the current sub-permutation recursive call and simply search linearly for one that wasn't used in the tail of my array.
4. The implementation is for integers only, so to permute over a generic collection of elements you simply use the Permutations class to permute indices instead of your actual collection.
5. The Mutex is there just to ensure things don't get screwed when the execution is asynchronous (notice that you can pass an UnsafeAction parameter that will in turn get a pointer to the permuted array. You must not change the order of elements in that array (pointer)! If you want to, you should copy the array to a tmp array or just use the safe action parameter which takes care of that for you - the passed array is already a copy).

Note:

I have no idea how good this implementation really is - I haven't touched it in so long. Test and compare to other implementations on your own, and let me know if you have any feedback!

Enjoy.

-
This is awful implementation, sorry... – Lu4 Sep 6 '14 at 6:22
@Lu4 What's awful about it? The more optimizations, the less beautiful the code - but it runs lightning fast. – SimpleVar Sep 6 '14 at 15:39
Your original implementation (provided in your question) is the best solution here. It's clean and fast code and generates sorted permutation. I'd never use this marked as answer actually... – sam Sep 14 at 11:58
P.S. I'm actually studying your original solution, I had the same intuitions you had but I did not manage to code a general solution. Well done. – sam Sep 14 at 13:08
@sam The code in the question is stable and working well, yes. But the topic was really making it as efficient as possible (even at the cost of readability), which this solution provided best for me. – SimpleVar Sep 15 at 6:20

The fastest permutation algorithm that i know of is the QuickPerm algorithm.
Here is the implementation, it uses yield return so you can iterate one at a time like required.

Code:

``````public static IEnumerable<IEnumerable<T>> QuickPerm<T>(this IEnumerable<T> set)
{
int N = set.Count();
int[] a = new int[N];
int[] p = new int[N];

var yieldRet = new T[N];

List<T> list = new List<T>(set);

int i, j, tmp; // Upper Index i; Lower Index j

for (i = 0; i < N; i++)
{
// initialize arrays; a[N] can be any type
a[i] = i + 1; // a[i] value is not revealed and can be arbitrary
p[i] = 0; // p[i] == i controls iteration and index boundaries for i
}
yield return list;
//display(a, 0, 0);   // remove comment to display array a[]
i = 1; // setup first swap points to be 1 and 0 respectively (i & j)
while (i < N)
{
if (p[i] < i)
{
j = i%2*p[i]; // IF i is odd then j = p[i] otherwise j = 0
tmp = a[j]; // swap(a[j], a[i])
a[j] = a[i];
a[i] = tmp;

//MAIN!

for (int x = 0; x < N; x++)
{
yieldRet[x] = list[a[x]-1];
}
yield return yieldRet;
//display(a, j, i); // remove comment to display target array a[]

// MAIN!

p[i]++; // increase index "weight" for i by one
i = 1; // reset index i to 1 (assumed)
}
else
{
// otherwise p[i] == i
p[i] = 0; // reset p[i] to zero
i++; // set new index value for i (increase by one)
} // if (p[i] < i)
} // while(i < N)
}
``````
-
This is about 3 times slower than my current implementation, and doesn't iterate in lexicographic order as well. – SimpleVar Jun 26 '12 at 13:52
I haven't checked the lexographical order, but in my computer QuickPerm took 11 seconds for 11 items and your algo took 15 seconds. Anyhow, I wish you best of luck. – Erez Robinson Jun 26 '12 at 14:24
@ErezRobinson: This takes about 7 seconds compared to 1.7 seconds of my implementation of Knuths algorithm with 11 elements on my computer so your algorithm is over 4 times slower. – Sani Huttunen Jun 26 '12 at 14:28
@ErezRobinson My implementation is 3.8~3.9 seconds on my computer (which isn't a great one), and yours is 13 seconds. Sani's is 3.7~3.8 for me. – SimpleVar Jun 26 '12 at 14:46
@ErezRobinson By the way, turns out my implementation is actually Knuth-style. – SimpleVar Jun 26 '12 at 16:37

I created an algorithm slightly faster than Knuth's one:

11 elements:

mine: 0.39 seconds

Knuth's: 0.624 seconds

13 elements:

mine: 56.615 seconds

Knuth's: 98.681 seconds

Here's my code in Java:

``````public static void main(String[] args)
{
int n=11;
int a,b,c,i,tmp;
int end=(int)Math.floor(n/2);
int[][] pos = new int[end+1][2];
int[] perm = new int[n];

for(i=0;i<n;i++) perm[i]=i;

while(true)
{
//this is where you can use the permutations (perm)
i=0;
c=n;

while(pos[i][1]==c-2 && pos[i][0]==c-1)
{
pos[i][0]=0;
pos[i][1]=0;
i++;
c-=2;
}

if(i==end) System.exit(0);

a=(pos[i][0]+1)%c+i;
b=pos[i][0]+i;

tmp=perm[b];
perm[b]=perm[a];
perm[a]=tmp;

if(pos[i][0]==c-1)
{
pos[i][0]=0;
pos[i][1]++;
}
else
{
pos[i][0]++;
}
}
}
``````

The problem is my algorithm only works for odd numbers of elements. I wrote this code quickly so I'm pretty sure there's a better way to implement my idea to get better performance, but I don't really have the time to work on it right now to optimize it and solve the issue when the number of elements is even.

It's one swap for every permutation and it uses a really simple way to know which elements to swap.

I wrote an explanation of the method behind the code on my blog: http://antoinecomeau.blogspot.ca/2015/01/fast-generation-of-all-permutations.html

-
Seems interesting, though it seems to be somewhat slower than my current implementation (marked as answer). I'd love to understand it, though. Also wondering how you actually timed the performance with a broken code (`new int[end + 1][2]` should become `new int[end + 1][]` with an appropriate loop init following) – SimpleVar Jan 28 at 1:02
Since we talk about performance, get rid of the jagged arrays and use stride instead. – CSharpie May 4 at 12:56
permutations are not generated in order with this algorithm – sam Sep 11 at 9:52

I would be surprised if there are really order of magnitude improvements to be found. If there are, then C# needs fundamental improvement. Furthermore doing anything interesting with your permutation will generally take more work than generating it. So the cost of generating is going to be insignificant in the overall scheme of things.

That said, I would suggest trying the following things. You have already tried iterators. But have you tried having a function that takes a closure as input, then then calls that closure for each permutation found? Depending on internal mechanics of C#, this may be faster.

Similarly, have you tried having a function that returns a closure that will iterate over a specific permutation?

With either approach, there are a number of micro-optimizations you can experiment with. For instance you can sort your input array, and after that you always know what order it is in. For example you can have an array of bools indicating whether that element is less than the next one, and rather than do comparisons, you can just look at that array.

-
+1 For good information. Using closure will maybe somewhat make it faster, but only by a tiny bit. I would imagine that it only saves a few stack operations of copying the pointer to the array, and little stuff like that - nothing significant, though. The second idea you've suggested - using a boolean array - might make a good change! I'll try that and come back to you :) – SimpleVar Jun 26 '12 at 16:03
The bools idea didn't turn out to be helpful at all... I still need to compare non-neighbor values when searching for the "swap partner" in the "tail", and accessing a bool in an array isn't much different than comparing two integers. Managing a second array wasted time in this case. But nice idea. – SimpleVar Jun 26 '12 at 16:42
@YoryeNathan But you are now in a position to try other things. For instance loop unrolling. Emit a perm. Then swap the last two and emit the next perm. Then go back to your more complex logic, secure in the knowledge that you know the last two elements are reversed. This skips the full logic for half of perms, and skips one comparison for the other half of perms. You can try unrolling farther - at some point you'll hit cache issues and it will not be worthwhile. – btilly Jun 26 '12 at 17:17
That's a nice idea, but I doubt it will matter that much. It basically saves me just a few variables declared and stepping in and immediately out of two loops, and a single comparison between two elements. The comparison might be significant if the elements were class instances that implement IComparable with some logic, but then again, in such case, I would use an array of integers {0, 1, 2, ...} to indicates indexing into the array of elements, for fast comparison. – SimpleVar Jun 26 '12 at 18:20
Turns out I was wrong, it was a great idea! It cuts the time in by much! Thanks! Waiting to see if any thing better comes up, and considering marking this as the answer. – SimpleVar Jun 26 '12 at 18:26

There's an accessible introduction to the algorithms and survey of implementations in Steven Skiena's Algorithm Design Manual (chapter 14.4 in the second edition)

Skiena references D. Knuth. The Art of Computer Programming, Volume 4 Fascicle 2: Generating All Tuples and Permutations. Addison Wesley, 2005.

-
The link is broken for me, although Google finds that website as well, so it's weird. Pinging to it in CMD results with timed-outs, so I can only guess the link is actually broken. – SimpleVar Jun 26 '12 at 14:14
I think the author's website is down. Resort to Amazon, or your library. – Colonel Panic Jun 26 '12 at 14:15
@MattHickford The book has some good information there, but nothing that can practically help me. – SimpleVar Jun 26 '12 at 14:44
I imagine Knuth is comprehensive but I don't have a copy. – Colonel Panic Jun 26 '12 at 15:14
I didn't hear of Knuth algorithm before, but turns out my algorithm is pretty much his. – SimpleVar Jun 26 '12 at 16:38

If you just want to calculate the number of possible permutations you can avoid all that hard work above and use something like this (contrived in c#):

``````public static class ContrivedUtils
{
public static Int64 Permutations(char[] array)
{
if (null == array || array.Length == 0) return 0;

Int64 permutations = array.Length;

for (var pos = permutations; pos > 1; pos--)
permutations *= pos - 1;

return permutations;
}
}
``````

You call it like this:

``````var permutations = ContrivedUtils.Permutations("1234".ToCharArray());
// output is: 24
var permutations = ContrivedUtils.Permutations("123456789".ToCharArray());
// output is: 362880
``````
-
Yeah, it's really not that hard to implement factoring. The idea is to have the permutations themselves, though. Not to mention, you would be better off with just `.Permutations(4)` instead of a meaningless array of chars. – SimpleVar Feb 5 at 19:26
true, but every time I've been asked this question in interviews the input is always a string of chars, so it seemed worthwhile to present it that way. – soultech Feb 5 at 19:50
And yet, the whole answer remains irrelevant to the subject. – SimpleVar Feb 5 at 20:18