# Hashtbl.create complexity

I read somewhere saying the complexity of Hashtbl.create is O(nlogn).

I thought it strange since Hashtbl are implemented as arrays and Array.create has complexity O(n). So I looked into the source code:

``````let rec power_2_above x n =
if x >= n then x
else if x * 2 > Sys.max_array_length then x
else power_2_above (x * 2) n

let create ?(random = !randomized) initial_size =
let s = power_2_above 16 initial_size in
let seed = if random then Random.State.bits (Lazy.force prng) else 0 in
{ initial_size = s; size = 0; seed = seed; data = Array.make s Empty }
``````

Looks to me first it finds the smallest 2-power above the *initial_size* then making an array out of it. This does not sound like O(n logn)... I'm thinking something like O(2**(logn +1)).

Any ideas?

Thanks.

-
What is your actual question? Can it only be answered "Yes" or "No"? –  Robert Harvey Jan 4 '13 at 0:10
"I'm thinking something like O(2**(logn +1))" that's exactly the same as O(n). –  newacct Jan 4 '13 at 0:35
"I read somewhere saying the complexity of Hashtbl.create is O(nlogn)." Where did you read this? Also, is it possible you confused Hashtbl with some other data structure (e.g. Set or Map)? –  newacct Jan 4 '13 at 0:37
Actual question: what's the complexity of Hashtbl.create? –  xysun Jan 4 '13 at 0:57
@newacct: yes it's O(n), I was trying to express exactly the notion of "smallest 2-power larger than n". Read it in the book <OCaml for scientists>, and no I didn't confuse it with Set/Map. It was Hashtbl. (since Map would be easy to understand -- it's implemented as balanced trees) –  xysun Jan 4 '13 at 0:59

What does `n` mean in your example? In the case of an array, we say that its creation is `O(n)` where `n` is the number of elements of the array. In the case of a hashtable, there is an underlying array initialized of size `O(n)`, but `n` here is not related to the (future) number of elements of the hash table, only to the initial size parameter.
You may always pass size `1` or any constant of your liking, and the hash table will have to be resized more often, which is a costly but amortized operation: a ridiculously small initial size will only affect the constant multiplicative factor of your running time, not its algorithm complexity. A ridiculously large initial size will cause a huge constant overhead in time and memory (and possibly fail on a 32bits architecture, or if you don't have enough memory).