# How to generate all possible combinations?

I'm currently trying to make a `Set` of all possible combinations from an `Array` of `Strings`, were each element contains only one letter.

The `Array` itself can contain the same letter twice or even more and they should only be used as often as they occur.

The `Set`should later contain all combinations from a minimum of 2 letters up to the length of the given `Array`.

I searched here on stackoverflow, but only found permutation functions that ignore the fact, that each letter should only be used as often as they occur.

This is my first Swift 2 project, so please forgive my greenhornish-ness :)

What I want

``````var array = ["A", "B", "C","D"]
var combinations: Set<String>

... <MAGIC> ...

print(combinations)
// "AB", "ABC", "ABD", "ABCD", "ABDC", "AC", "ACB", "ACD", "ACBD", "ACDB", and so on ...
``````

My current approach

``````func permuation(arr: Array<String>) {

for (index, elementA) in arr.enumerate() {
//1..2..3..4
var tmpString = elementA
var tmpArray = arr
tmpArray.removeAtIndex(index)

for (index2, elementB) in tmpArray.enumerate() {
// 12..13..14
var tmpString2 = tmpString + elementB
var tmpArray2 = tmpArray

//[3,4]
tmpArray2.removeAtIndex(index2)

results.append(tmpString2)
}
}

}
permuation(array)
print(results)
// "["AB", "AC", "AD", "BA", "BC", "BD", "CA", "CB", "CD", "DA", "DB", "DC"]"
``````

I know, this is so terribly wrong in so many ways, but I'm stuck with this code, and don't know how to add a recursive functionality.

Try this.

The general algorithm is to have a `fromList` containing the letters you haven't used yet and a `toList` that is the string you've built up so far. This uses recursion to build up all possible strings and adds them to the set when the length is 2 or greater:

``````func permute(fromList: [String], toList: [String] = [String](), var set: Set<String> = Set<String>()) -> Set<String> {
if toList.count >= 2 {
set.insert(toList.joinWithSeparator(""))
}
if !fromList.isEmpty {
for (index, item) in fromList.enumerate() {
var newFrom = fromList
newFrom.removeAtIndex(index)
set = permute(newFrom, toList: toList + [item], set: set)
}
}
return set
}

permute(["A", "B", "C"])
// {"BA", "AC", "ABC", "AB", "BCA", "CB", "BC", "CAB", "ACB", "CA", "CBA", "BAC"}

permute(["A", "A", "B"])
// {"BA", "BAA", "AAB", "AB", "ABA", "AA"}
``````

As @MartinR pointed out in his post, the solution above is a little slow because of all of the creation and copying of sets. I had originally written this using an `inout` variable for set, but changed it to the more functional interface to make it nice to call.

Here is my original (faster) implementation, plus I embedded it in a `permute` that takes just an `[String]` and returns a `Set<String>`. It does the work of creating the `set` and the `toList` array and then calls the inner version of `permute` to do the real work:

``````func permute(list: [String], minStringLen: Int = 2) -> Set<String> {
func permute(fromList: [String], toList: [String], minStringLen: Int, inout set: Set<String>) {
if toList.count >= minStringLen {
set.insert(toList.joinWithSeparator(""))
}
if !fromList.isEmpty {
for (index, item) in fromList.enumerate() {
var newFrom = fromList
newFrom.removeAtIndex(index)
permute(newFrom, toList: toList + [item], minStringLen: minStringLen, set: &set)
}
}
}

var set = Set<String>()
permute(list, toList:[], minStringLen: minStringLen, set: &set)
return set
}

permute(["A", "B", "C"])
// {"BA", "AC", "ABC", "AB", "BCA", "CB", "BC", "CAB", "ACB", "CA", "CBA", "BAC"}

permute(["A", "A", "B"])
// {"BA", "BAA", "AAB", "AB", "ABA", "AA"}

permute(["A", "A", "B"], minStringLen: 1)
// {"BA", "A", "BAA", "AB", "AA", "B", "AAB", "ABA"}

permute(["A", "A", "B"], minStringLen: 3)
// {"ABA", "BAA", "AAB"}
``````

Edit: I added a `minStringLen` parameter (with default value of `2`) instead of hard coding that value.

See @MartinR's answer for performance comparisons.

Swift 3 and Swift 4:

``````func permute(list: [String], minStringLen: Int = 2) -> Set<String> {
func permute(fromList: [String], toList: [String], minStringLen: Int, set: inout Set<String>) {
if toList.count >= minStringLen {
set.insert(toList.joined(separator: ""))
}
if !fromList.isEmpty {
for (index, item) in fromList.enumerated() {
var newFrom = fromList
newFrom.remove(at: index)
permute(fromList: newFrom, toList: toList + [item], minStringLen: minStringLen, set: &set)
}
}
}

var set = Set<String>()
permute(fromList: list, toList:[], minStringLen: minStringLen, set: &set)
return set
}

print(permute(list: ["A", "B", "C"]))
// ["ABC", "CA", "BAC", "ACB", "BA", "CAB", "BC", "CB", "BCA", "CBA", "AB", "AC"]

print(permute(list: ["A", "A", "B"]))
// ["AA", "AAB", "ABA", "AB", "BA", "BAA"]

print(permute(list: ["A", "A", "B"], minStringLen: 1))
// ["AAB", "ABA", "B", "BA", "A", "BAA", "AA", "AB"]

print(permute(list: ["A", "A", "B"], minStringLen: 3))
// ["AAB", "ABA", "BAA"]
``````
• I noticed that if you pass a single `set` as `inout` parameter to the recursive calls then your method becomes much faster (and actually faster than mine, to be honest :) – Martin R Oct 8 '15 at 18:19
• That's how I originally wrote it. I should add that version to the answer. – vacawama Oct 8 '15 at 18:23
• Thank both of you! I would like to accept both answers, but that's not possible. :) However, if you would like to edit yours as mentioned, I would mark it as correct. – dschu Oct 8 '15 at 19:33
• I have updated the answer with my original (and faster) solution. Thanks @MartinR for the performance measurements and for suggesting that `inout` was the better way to go after all. – vacawama Oct 8 '15 at 21:43

This is quite similar to @vacawama's answer, but hopefully different enough that it deserves a separate answer :)

Here, an array with all combinations is built (explaining comments inline):

``````func combinations(array : [String]) -> [String] {

// Recursion terminates here:
if array.count == 0 { return [] }

// Concatenate all combinations that can be built with element #i at the
// first place, where i runs through all array indices:
return array.indices.flatMap { i -> [String] in

// Pick element #i and remove it from the array:
var arrayMinusOne = array
let elem = arrayMinusOne.removeAtIndex(i)

// Prepend element to all combinations of the smaller array:
return [elem] + combinations(arrayMinusOne).map { elem + \$0 }
}
}
``````

Then you can filter the strings with at least two letters, and convert it to a `Set`:

``````let c = Set(combinations(["A", "B", "C"]).filter { \$0.characters.count >= 2 })
print(c)
// ["BA", "AC", "ABC", "AB", "BCA", "CB", "BC", "CAB", "ACB", "CA", "CBA", "BAC"]
``````

I made a simple performance comparison (compiled in Release mode on a Macbook Pro):

``````let array = ["A", "B", "C", "D", "E", "F", "G"]

let t1 = NSDate()
let c1 = Set(combinations(array).filter { \$0.characters.count >= 2 })
let t2 = NSDate()
let c2 = permute(array)
let t3 = NSDate()

print(c1 == c2) // true
print(t2.timeIntervalSinceDate(t1))
print(t3.timeIntervalSinceDate(t2))
``````

The result depends on the size of the input array, but @vacawama's updated method is the fastest:

```# of array   This      vacawama's   vacawama's
elements:    method:   1st method:  2nd method:

2          0.00016   0.00005      0.00001
3          0.00043   0.00013      0.00004
4          0.00093   0.00062      0.00014
5          0.00335   0.00838      0.00071
6          0.01756   0.24399      0.00437
7          0.13625   11.90969     0.03692
```
• Since you already have a test harness, would it help to first pass the array through a set to remove any duplicates? I have a feeling that the time that will take is offset by having fewer elements to permute. – Abizern Oct 8 '15 at 18:15
• @Abizern: The array returned by `combinations()` does not contain duplicates (unless the input array has duplicate elements, and in that case duplicate combinations are wanted according to the problem description). – Martin R Oct 8 '15 at 18:23
• Thanks for your kind answer and especially for your performance test. :) – dschu Oct 8 '15 at 19:34
• hmm, i've tested both (your and @vacawama's answer) and it seems there is no clear winner. the results are ambiguous. – i6x86 Mar 6 '18 at 15:44
• it seems everything maters. i mean, if you change the order of execution the results changes too. first i've put your method to execute on first place and it was a little bit slower than the vacawama's. but then i've changed the order and the your one made it better. here i post the results on real device with 7 letters. your one 0.121307969093323 and the vacawama's one 0.134603023529053 – i6x86 Mar 6 '18 at 15:50

Here's a Swift 3 function that is a bit faster. It is based on an extension to the Array type that can be used on arrays with any element type.

``````public func allCombinations(_ array:[String], minLength:Int=2) -> [String]
{
var result:[String] = []
for n in minLength...array.count
{
result = result + array.combinations(of:n).map{ \$0.joined(separator:"") }
}
return result
}

extension Array
{
public func combinations(of group:Int) -> [[Element]]
{
if group > count  { return [] }

if group == count { return [self] }

var result:[[Element]] = []

var comboIndexes = (0..<group).map{\$0}

let fullCombo   = group - 1
let indexLimit  = count - fullCombo

var carry = fullCombo

while carry >= 0
{
if carry == fullCombo
{ result.append(comboIndexes.map{self[\$0]}) }

comboIndexes[carry] += 1

if comboIndexes[carry] == carry + indexLimit
{ carry -= 1 ; continue }

while carry < fullCombo
{
carry += 1
comboIndexes[carry] = comboIndexes[carry-1] + 1
}
}

return result
}
}
``````

In my tests, it ran about 40x faster than vacawama's second version on 7 letters.

[EDIT] I realized later that this function produces combinations (as requested in the OP) where vacawama's function produces permutations. I tested an equivalent algorithm for permutations and it was merely 55% faster than vacawama's.

``````extension Array
{
public func permutations(of group:Int? = nil) -> [[Element]]
{
let group       = group ?? count
var result      : [[Element]] = []
var permutation : [Element]   = []

func permute(from baseIndex:Int)
{
if baseIndex == permutation.count - 1
{
result.append(permutation)
return
}

permute(from:baseIndex+1)

for index in baseIndex+1..<permutation.count
{
swap(&permutation[baseIndex],&permutation[index])
permute(from:baseIndex+1)
}
let baseElement = permutation[baseIndex]
permutation.remove(at:baseIndex)
permutation.append(baseElement)
}

var comboIndexes = (0..<group).map{\$0}

let fullCombo   = group - 1
let indexLimit  = count - fullCombo

var carry = fullCombo

while carry >= 0
{
if carry == fullCombo
{
permutation = comboIndexes.map{self[\$0]}
permute(from:0)
}

comboIndexes[carry] += 1

if comboIndexes[carry] == carry + indexLimit
{ carry -= 1 ; continue }

while carry < fullCombo
{
carry += 1
comboIndexes[carry] = comboIndexes[carry-1] + 1
}
}

return result
}
}
``````

In your output example it wasn't clear what you really want, either:

1. all combinations and permutations of them:

``````["AB", "BA", "AC", "CA", "AD", "DA", ..., "ABCD", "ABDC", "ACBD", "ACDB", ...]
``````
2. just all combinations:

``````["AB", "AC", "AD", "BC", "BD", "CD", "ABC", "ABD", ...]
``````

I can recommend @oisdk's great Swift library: SwiftSequence for both of them, it has lots of useful functions. In the Combinations section he even shows an example of its usage with the Power Set, which is almost exactly what you're looking for in case 1. Upon importing the files of his library, you can create the `powerSet` function on `CollectionType`s like this:

``````extension CollectionType {
func powerSet() -> LazySequence<FlattenSequence<LazyMapSequence<Self, ComboSeq<Self.Generator.Element>>>>{
var i = 0
return lazy.flatMap{ _ in self.lazyCombos(++i) }
}
}
``````

This method evaluates lazily, which means that it's only evaluated when it really needs to. Now you mentioned that you only want to have combinations of at least 2 elements. This is easily done with the `filter` method:

``````let combinations = ["A", "B", "C", "D"].powerSet().filter{ \$0.count >= 2 }
// As an array: [["A", "B"], ["A", "C"], ["A", "D"], ["B", "C"], ["B", "D"], ["C", "D"], ["A", "B", "C"], ["A", "B", "D"], ["A", "C", "D"], ["B", "C", "D"], ["A", "B", "C", "D"]]
``````

For case 2. where you need permutations of those as well, you can do this:

``````let combPerms = combinations.flatMap{ \$0.permutations() }
// As an array: [["A", "B"], ["B", "A"], ["A", "C"], ["C", "A"], ["A", "D"], ["D", "A"], ["B", "C"], ["C", "B"], ["B", "D"], ["D", "B"], ["C", "D"], ["D", "C"], ["A", "B", "C"], ["A", "C", "B"], ["B", "A", "C"], ["B", "C", "A"], ["C", "A", "B"], ["C", "B", "A"], ["A", "B", "D"], ["A", "D", "B"], ["B", "A", "D"], ["B", "D", "A"], ["D", "A", "B"], ["D", "B", "A"], ["A", "C", "D"], ["A", "D", "C"], ["C", "A", "D"], ["C", "D", "A"], ["D", "A", "C"], ["D", "C", "A"], ["B", "C", "D"], ["B", "D", "C"], ["C", "B", "D"], ["C", "D", "B"], ["D", "B", "C"], ["D", "C", "B"], ["A", "B", "C", "D"], ["A", "B", "D", "C"], ["A", "C", "B", "D"], ["A", "C", "D", "B"], ["A", "D", "B", "C"], ["A", "D", "C", "B"], ["B", "A", "C", "D"], ["B", "A", "D", "C"], ["B", "C", "A", "D"], ["B", "C", "D", "A"], ["B", "D", "A", "C"], ["B", "D", "C", "A"], ["C", "A", "B", "D"], ["C", "A", "D", "B"], ["C", "B", "A", "D"], ["C", "B", "D", "A"], ["C", "D", "A", "B"], ["C", "D", "B", "A"], ["D", "A", "B", "C"], ["D", "A", "C", "B"], ["D", "B", "A", "C"], ["D", "B", "C", "A"], ["D", "C", "A", "B"], ["D", "C", "B", "A"]]
``````

You can convert these to a `Set` of `String`s or an `Array`:

``````let array = Array(combPerms)
let set = Set(combPerms)
``````

But I strongly recommend to use the lazy version ;) And yes, to remove duplicates you can just use `Set(["A", "B", "C", "D"])` instead of just `["A", "B", "C", "D"]`

You can also do case 2. in one go like this:

``````let x = ["A", "B", "C", "D"]

let result = Set(
x.indices
.flatMap{ x.lazyCombos(\$0 + 1) }
.filter{ \$0.count >= 2 }
.flatMap{ \$0.permutations() }
.map{ \$0.joinWithSeparator("") })
``````
• Did you make performance tests? – Martin R Oct 8 '15 at 19:31