Minimum Set Cover is a question where you must find the minimum number of sets needed to cover every element.

For example, imagine that we have a set of `X=array(1,2,3,4,5,6)`

and 5 another set S, where

```
S[1]=array(1, 4)
S[2] =array(2, 5)
S[3] =array(3, 6)
S[4] =array(1, 2, 3)
S[5] =array(4, 5, 6)
```

The problem is to find minimum number of sets of `S`

which cover every element of `X.`

So obviously the minimum set cover in our case will be S[4] and S[5] because they cover all the elements.

Does anybody have an idea how to implement this code in PHP. Note, that this is NP-complete so there is no fast algorithm to solve it. Any solution in PHP will be welcomed. And BTW it is not a homework, I need to use this algorithm in my web application in order to generate suggestion list.

Thanks in advance.

**Update 1**

There are many applications of Set Covering Problem. Some of the interesting ones are:

- Construction of Optimal logic circuits
- Air-crew Scheduling
- Assembly line balancing
- Information retrieval
- Art Gallery problem
- Genome Sequencing
- Red-Blue SetCover problem

**Update 2**

For example, here you can see the working version of the problem I mentioned. Here, even it shows visually the sets. But I need the pure PHP code for that, if somebody has it please be kind to provide us with the working example in PHP. Thanks

**Update 3**

Finally, I have solved the problem in PHP. My solution based on the algorithm proposed on a very famous book called **Introduction to Algorithms**, section **The set-covering** problem. Here how my solution looks like:

```
$MainSet=array(1, 2, 3, 4, 5, 6, 7);
$SubSet=array(array(1,4), array(2, 5), array(3, 6), array(1, 2, 3), array(4, 5, 6));
$UncoveredElements=$MainSet;
$CoveringSets=array();
while (count($UncoveredElements)>0){
$S=SubSetS($UncoveredElements, $SubSet);
if (is_array($S)){
$UncoveredElements=array_diff($UncoveredElements, $S);
$CoveringSets[]=$S;
}else
break; //finish work
}
echo "Sets that cover MainSet are:";
var_dump($CoveringSets);
//Subset S is chosen that covers as many uncovered elements as possible
function SubSetS($UncoveredElements, $SubSetArr){
$max=0; $s=array();
foreach($SubSetArr as $SubSet){
$intersectArr=array_intersect($UncoveredElements, $SubSet);
$weight=count($intersectArr);
if ($weight>$max){
$max=$weight;
$s=$SubSet;
}
}
if ($max>0)
return $s;
else
return 0;
}
```

Any comments and ideas about my solution? For me, it solves my problem, that is what I wanted. But if you suggest any optimization, correction to the code, please fill free.

BTW, thanks a lot for participants of the question for their valuable responses.

**Final Update**

This Greedy approach for a Set Covering problem does not always guarantee an optimal solution. Consider the following example:

Given: Elements of Main Set = {1, 2, 3, 4, 5, 6}

Now, consider 4 subsets as follows: Subset 1 = {1, 2}, Subset 2 = {3, 4}, Subset 3 = {5, 6}, Subset 4 = {1, 3, 5}.

The Greedy algorithm for the above collection of Subsets gives the Minimum Set Cover as:
Minimum Set Cover contains the Subsets= { 1, 2, 3, 4}.

Thus, though the minimum collection of subsets that cover all the elements of the Main set are the **first three subsets**, we get the solution containing all the 4 Subsets.