Finding All Combinations (Cartesian product) of JavaScript array values
Solution 1:
This is not permutations, see permutations definitions from Wikipedia.
But you can achieve this with recursion:
var allArrays = [
['a', 'b'],
['c'],
['d', 'e', 'f']
]
function allPossibleCases(arr) {
if (arr.length == 1) {
return arr[0];
} else {
var result = [];
var allCasesOfRest = allPossibleCases(arr.slice(1)); // recur with the rest of array
for (var i = 0; i < allCasesOfRest.length; i++) {
for (var j = 0; j < arr[0].length; j++) {
result.push(arr[0][j] + allCasesOfRest[i]);
}
}
return result;
}
}
console.log(allPossibleCases(allArrays))
You can also make it with loops, but it will be a bit tricky and will require implementing your own analogue of stack.
Solution 2:
I suggest a simple recursive generator function as follows:
// Generate cartesian product of given iterables:
function* cartesian(head, ...tail) {
let remainder = tail.length ? cartesian(...tail) : [[]];
for (let r of remainder) for (let h of head) yield [h, ...r];
}
// Example:
const first = ['a', 'b', 'c', 'd'];
const second = ['e'];
const third = ['f', 'g', 'h', 'i', 'j'];
console.log(...cartesian(first, second, third));
Solution 3:
You don't need recursion, or heavily nested loops, or even to generate/store the whole array of permutations in memory.
Since the number of permutations is the product of the lengths of each of the arrays (call this numPerms
), you can create a function getPermutation(n)
that returns a unique permutation between index 0
and numPerms - 1
by calculating the indices it needs to retrieve its characters from, based on n
.
How is this done? If you think of creating permutations on arrays each containing: [0, 1, 2, ... 9] it's very simple... the 245th permutation (n=245) is "245", rather intuitively, or:
arrayHundreds[Math.floor(n / 100) % 10]
+ arrayTens[Math.floor(n / 10) % 10]
+ arrayOnes[Math.floor(n / 1) % 10]
The complication in your problem is that array sizes differ. We can work around this by replacing the n/100
, n/10
, etc... with other divisors. We can easily pre-calculate an array of divisors for this purpose. In the above example, the divisor of 100 was equal to arrayTens.length * arrayOnes.length
. Therefore we can calculate the divisor for a given array to be the product of the lengths of the remaining arrays. The very last array always has a divisor of 1. Also, instead of modding by 10, we mod by the length of the current array.
Example code is below:
var allArrays = [first, second, third, ...];
// Pre-calculate divisors
var divisors = [];
for (var i = allArrays.length - 1; i >= 0; i--) {
divisors[i] = divisors[i + 1] ? divisors[i + 1] * allArrays[i + 1].length : 1;
}
function getPermutation(n) {
var result = "", curArray;
for (var i = 0; i < allArrays.length; i++) {
curArray = allArrays[i];
result += curArray[Math.floor(n / divisors[i]) % curArray.length];
}
return result;
}
Solution 4:
Provided answers looks too difficult for me. So my solution is:
var allArrays = new Array(['a', 'b'], ['c', 'z'], ['d', 'e', 'f']);
function getPermutation(array, prefix) {
prefix = prefix || '';
if (!array.length) {
return prefix;
}
var result = array[0].reduce(function(result, value) {
return result.concat(getPermutation(array.slice(1), prefix + value));
}, []);
return result;
}
console.log(getPermutation(allArrays));
Solution 5:
You could take a single line approach by generating a cartesian product.
result = items.reduce(
(a, b) => a.reduce(
(r, v) => r.concat(b.map(w => [].concat(v, w))),
[]
)
);
var items = [['a', 'b', 'c', 'd'], ['e'], ['f', 'g', 'h', 'i', 'j']],
result = items.reduce((a, b) => a.reduce((r, v) => r.concat(b.map(w => [].concat(v, w))), []));
console.log(result.map(a => a.join(' ')));
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