Adding a simple cascading solution to generate a Power Set (#975)

* Add a simple cascading version of generating a PowerSet.

* Update README.

* Update README.

* Update README.
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Oleksii Trekhleb 2023-01-06 14:37:36 +01:00 committed by GitHub
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@ -99,7 +99,7 @@ a set of rules that precisely define a sequence of operations.
* **Sets**
* `B` [Cartesian Product](src/algorithms/sets/cartesian-product) - product of multiple sets
* `B` [FisherYates Shuffle](src/algorithms/sets/fisher-yates) - random permutation of a finite sequence
* `A` [Power Set](src/algorithms/sets/power-set) - all subsets of a set (bitwise and backtracking solutions)
* `A` [Power Set](src/algorithms/sets/power-set) - all subsets of a set (bitwise, backtracking, and cascading solutions)
* `A` [Permutations](src/algorithms/sets/permutations) (with and without repetitions)
* `A` [Combinations](src/algorithms/sets/combinations) (with and without repetitions)
* `A` [Longest Common Subsequence](src/algorithms/sets/longest-common-subsequence) (LCS)

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@ -68,6 +68,44 @@ element.
> See [btPowerSet.js](./btPowerSet.js) file for backtracking solution.
### Cascading Solution
This is, arguably, the simplest solution to generate a Power Set.
We start with an empty set:
```text
powerSets = [[]]
```
Now, let's say:
```text
originalSet = [1, 2, 3]
```
Let's add the 1st element from the originalSet to all existing sets:
```text
[[]] ← 1 = [[], [1]]
```
Adding the 2nd element to all existing sets:
```text
[[], [1]] ← 2 = [[], [1], [2], [1, 2]]
```
Adding the 3nd element to all existing sets:
```
[[], [1], [2], [1, 2]] ← 3 = [[], [1], [2], [1, 2], [3], [1, 3], [2, 3], [1, 2, 3]]
```
And so on, for the rest of the elements from the `originalSet`. On every iteration the number of sets is doubled, so we'll get `2^n` sets.
> See [caPowerSet.js](./caPowerSet.js) file for cascading solution.
## References
* [Wikipedia](https://en.wikipedia.org/wiki/Power_set)

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@ -0,0 +1,28 @@
import caPowerSet from '../caPowerSet';
describe('caPowerSet', () => {
it('should calculate power set of given set using cascading approach', () => {
expect(caPowerSet([1])).toEqual([
[],
[1],
]);
expect(caPowerSet([1, 2])).toEqual([
[],
[1],
[2],
[1, 2],
]);
expect(caPowerSet([1, 2, 3])).toEqual([
[],
[1],
[2],
[1, 2],
[3],
[1, 3],
[2, 3],
[1, 2, 3],
]);
});
});

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@ -0,0 +1,37 @@
/**
* Find power-set of a set using CASCADING approach.
*
* @param {*[]} originalSet
* @return {*[][]}
*/
export default function caPowerSet(originalSet) {
// Let's start with an empty set.
const sets = [[]];
/*
Now, let's say:
originalSet = [1, 2, 3].
Let's add the first element from the originalSet to all existing sets:
[[]] 1 = [[], [1]]
Adding the 2nd element to all existing sets:
[[], [1]] 2 = [[], [1], [2], [1, 2]]
Adding the 3nd element to all existing sets:
[[], [1], [2], [1, 2]] 3 = [[], [1], [2], [1, 2], [3], [1, 3], [2, 3], [1, 2, 3]]
And so on for the rest of the elements from originalSet.
On every iteration the number of sets is doubled, so we'll get 2^n sets.
*/
for (let numIdx = 0; numIdx < originalSet.length; numIdx += 1) {
const existingSetsNum = sets.length;
for (let setIdx = 0; setIdx < existingSetsNum; setIdx += 1) {
const set = [...sets[setIdx], originalSet[numIdx]];
sets.push(set);
}
}
return sets;
}