I'm looking to find out if a particular algorithm already exists. I want to use it in an application, but I've also seen this come up in several Project Euler problems too.

I'm looking to calculate a specific type of permutation/output set, where the next item chosen **must** be one from a finite set of options in only the following set.

For example, say I've got 3 arrays

```
$a1 = array("a", "b", "c");
$a2 = array("d", "e", "f");
$a3 = array("g", "h", "i");
```

I'm looking to generate all the possibilities of a sequence containing *at most 1 element from each array*, **chosen in order**. That is to say as output, I'd like to see:

```
adg aeg afg
adh aeh afh
adi aei afi
bdg beg bfg
bdh beh bfh
bdi bei bfi
cdg ceg cfg
cdh ceh cfh
cdi cei cfi
```

Looking to implement the algorithm in either PHP or Javascript. In essence it will go through a variable number of arrays containing a variable number of elements, and output all of the possiblities of sequences that can occurr in sequential order.

Does this exist?

If so, what is it called? Technically this isnt a permutation or a combination from what I know about both.

EDIT: Daniel Fischer has informed me this is a Cartesian product, here is an implementation taken from the PHP website:

```
function array_cartesian_product($arrays)
{
$result = array();
$arrays = array_values($arrays);
$sizeIn = sizeof($arrays);
$size = $sizeIn > 0 ? 1 : 0;
foreach ($arrays as $array)
$size = $size * sizeof($array);
for ($i = 0; $i < $size; $i ++)
{
$result[$i] = array();
for ($j = 0; $j < $sizeIn; $j ++)
array_push($result[$i], current($arrays[$j]));
for ($j = ($sizeIn -1); $j >= 0; $j --)
{
if (next($arrays[$j]))
break;
elseif (isset ($arrays[$j]))
reset($arrays[$j]);
}
}
return $result;
}
```