Yes that will work, but as you mentioned your hashing function needs to be 100% unique. Any duplicates will result in you having to use some sort of conflict resolution. I would recommend linear chaining.

**edit:** Hashmap.size() allows for O(1) access

**edit 2:** Respopnse to the confusion Larry has caused =P

Yes, Hashing is O(k) where k is the keylength. Everyone can agree on that. However, if you do not have a perfect hash, you simply cannot get O(1) time. Your claim was that you do not need uniqueness to acheive O(1) deletion of a specific element. I guarantee you that is wrong.

Consider a worst case scenario: every element hashes to the same thing. You end up with a single linked list which as everyone knows does not have O(1) deletion. I would hope, as you mentioned, nobody is dumb enough to make a hash like this.

Point is, uniqueness of the hash is a prerequisite for O(1) runtime.

Even then, though, it is technically not O(1) Big O efficiency. Only using amortized analysis you will acheive constant time efficiency in the worst case. As noted on wikipedia's article on amortized analysis

The basic idea is that a worst case operation can alter the state in such a way that the worst case cannot occur again for a long time, thus "amortizing" its cost.

That is referring to the idea that resizing your hashtable (altering the state of your data structure) at certain load factors can ensure a smaller chance of collisions etc.

I hope this clears everything up.

`O(N)`

space :-) – Stephen C Jul 28 '10 at 13:12