# Quick Way to Find the Largest Array in a Multidimensional Array?

Situation: I have a multidimensional array with a variable number of elements. e.g.

``````array(N) {
0 => array(3) { ... },
1 => array(8) { ... },
2 => array(1) { ... },
...
M => array(12) { ... },
...
N-1 => array(7) { ... }
}
``````

And I would like to find the maximum number of elements in this sub-array (in the example above, it would be 12). A straightforward solution would be an O(N) linear search.

``````<?php
function max_length(\$2d_array) {
\$max = 0;
foreach(\$2d_array as \$child) {
if(count(\$child) > \$max) {
\$max = count(\$child);
}
}
return \$max;
}
``````

However, I can't help but wonder if there's some clever trick to optimize this lookup. So my question is a two-parter (though an answer to either part would solve it):

• Is there an algorithm that performs this search faster than O(N) without requiring special requirements (pre-sorted, etc)?
• Is there an obscure PHP function somewhere that will perform this search in native code rather than my userland PHP script?

Not sure about the performance, but I think the following should work:

``````\$count = array_map('count', \$input_arr);
\$min = array_keys(\$count , max(\$count))[0];
\$largest_arr = \$input_arr[\$min];
``````

Or even:

``````\$counts = array_map('count', \$input_arr);
\$key = array_flip(\$counts)[max(\$counts)];
\$largest_arr = \$input_arr[\$key];
``````

1) Sort the multi-dim array by the element sizes:
Choose an algorithm that runs in O(n logn) worst case, e.g. Heap Sort (comparison of sorting algorithms).

2) Choose the last element.
This runs in O(1)

So if you implement the sorting algorithm yourself and assuming that fetching the array length is O(1) and not linear (no counting every time you ask for the length), you can do it in O(n logn)

I can't comment on any PHP methods which do this for you since I'm not using it.

• Strictly speaking, N log N is worse than N: 1000 * lg(1000) is just below 10,000. I appreciate the effort though – Scott Arciszewski Feb 18 '14 at 18:17
• If there is a sorting algorithm that performs better than O(n), then that's your solution. I posted this answer with O(n logn) since this is currently the best bound known for comparing sorting algorithms. So it can't be faster than this unless you find a way to sort it non-comparingly without reencoding the array into a numeric representation (which seems impossible to me). – runDOSrun Feb 18 '14 at 18:24
• Well, if the data is sorted, getting O(1) is trivial; that's why I specified "without requiring special requirements (pre-sorted, etc)". Sorting is expensive. Thanks for your answer, though; if I had a requirement to sort the data shortest-to-longest, heap-sort would probably help significantly ;) – Scott Arciszewski Feb 18 '14 at 18:26
``````\$max = 0;
foreach(\$array as \$obj)
{
if(\$obj->dnum > \$max)
{
\$max = \$obj->dnum;
}
}
``````

or

``````\$numbers = array();
foreach(\$array as \$obj)
{
\$numbers[] = \$obj->dnum;
}
\$max = max(\$numbers);
``````

or ...

• Sadly, we don't have a \$obj->dnum to compare, so this solution wouldn't work. – Scott Arciszewski Feb 18 '14 at 19:39

Just for fun:

``````array_multisort(\$result = array_map('count', \$array), SORT_DESC);
echo \$result[0];
``````
• Heh. Naive solution: Result 44 calculated in 0.049926996231079 seconds. Stack Overflow: Result 44 calculated in 0.13289713859558 seconds. – Scott Arciszewski Feb 18 '14 at 18:32
• @Scott: I don't know what that means. Also, `array_multisort` returns boolean so no `array_shift`. – AbraCadaver Feb 18 '14 at 19:18
• I was benchmarking it. It took ~3x as long as the naive approach. You could use `return array_shift(\$result);` in a function call context. – Scott Arciszewski Feb 18 '14 at 19:32
• Yes, mine is "Just for fun" approach :0 – AbraCadaver Feb 18 '14 at 19:33
• Yeah, it was a fun solution to the problem. But for the sake of fairness, I benchmarked it. ;) – Scott Arciszewski Feb 18 '14 at 19:38

``````function accmp(&\$a, &\$b) {  return count(\$a)<count(\$b)?-1:1; }