**Short answer:** For a single byte delimiter, `explode`

’s time complexeity is in Ο(*N*); but for multiple byte delimiters, its time complexity is Ο(*N*^{2}).

`implode`

is clearly in Ο(*N*) as it simply glues the pieces together.

**Extended answer:** The basic algorithm of `explode`

is to search for occurrences of *delimiter* in *string* and copy the enclosed substrings into a new array.

To find the positions of *delimiter* in *string*, it uses the internal function `zend_memnstr`

(`php_memnstr`

is just an alias for `zebd_memnstr`

). For a single byte, it simply calls `memchr`

that does a linear search (thus in Ο(*N*)).

But for *delimiter* values longer than one byte, it calls `memchr`

to search for positions of the first byte of *delimiter* in *string*, tests if the last byte of *delimiter* is present at the expected position in *string*, and calls `memcmp`

to also check the bytes in between. So it basically checks whether *delimiter* is contained in *string* for any possible position. This already sounds suspiciously like Ο(*N*^{2}).

Now let’s have a look at the worst case for this algorithm where both the first and the last byte of the pattern fit but the second-last doesn’t, e.g.:

```
string: aaaabaaaa
delimiter: aaaaaa
aaaabaaaa
aaaaXa (1+1+5)
aaaX?a (1+1+4)
aaX??a (1+1+3)
aX???a (1+1+2)
```

A `X`

represents a mismatch in `memcmp`

and `?`

unknown bytes. The value in parentheses is the time complexity in uniform measure. This would sum up to

Σ (2+*i*) for *i* from *M*-floor(*N*/2) to ceil(*N*/2)

or

(*N*-*M*+1)·2 + Σ *i* - Σ *j* for *i* from 1 to ceil(*N*/2), *j* from 1 to *M*-floor(*N*/2)-1.

Since Σ *i* for *i* from 1 to *N* can be expressed by *N*·(*N*+1)/2 = (*N*^{2}+*N*)/2, we can also write:

(*N*-*M*+1)·2 + (ceil(*N*/2)^{2}+ceil(*N*/2))/2 - ((*M*-floor(*N*/2)-1)^{2}+(*M*-floor(*N*/2)-1))/2

For simplicity, let’s assume both *N* and *M* are always even, so we can omit the ‘ceil’s and ‘floor’s:

(*N*-*M*+1)·2 + ((*N*/2+1)^{2}+*N*/2+1)/2 - ((*M*-*N*/2-1)^{2}+(*M*-*N*/2)-1)/2

= (*N*-*M*+1)·2 + *N*^{2}/8+3·*N*/4+1 - ((*M*-*N*/2-1)^{2}+(*M*-*N*/2)-1)/2

Furthermore, we can estimate the values up: *N*-*M* < *N* and *M*-*N*/2-1 < *N*. Thus we get:

*N*·2 + *N*^{2}/8+3·*N*/4+1 - (*N*^{2}+*N*)/2

< *N*·2 + *N*^{2}+4·*N* - *N*^{2}+*N*

This proofs that `explode`

with multiple byte delimiters is in Ο(*N*^{2}).

`O(N)`

, I suppose. I don't see how you could do any better or any worse. – NullUserException Dec 28 '12 at 23:40