# Complexity and Big-O Notation

What is the worst case time complexity for the following two algorithms assuming items (an ArrayList<Integer>)has enough unused space that it never needs to be re-sized? My initial guess is that A would run slower because it has to shift every element over to add the new one at index [0]. I think B is O(N^2) in the worst case but I am not sure.

A.

for (int i = 0; i < N; i++)


and B.

for (int i = 0; i < N; i++)

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Please be more specific: What language is this ? Is ArrayList implementation standardized in that language ? If no, no one will give you general answer. If yes - read the standard. –  Grigor Gevorgyan Feb 13 '13 at 19:39
its written in java and it is standardized. –  user1874239 Feb 13 '13 at 19:40
My comment below assumes Java, since the term ArrayList is used and becaause the add method is invoked. –  ncmathsadist Feb 13 '13 at 19:42

If your question is about java, then first version is slower and has complexity O(N^2)for the very reason you mention, while B has complexity O(N).

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thanks very much –  user1874239 Feb 13 '13 at 19:43

Implementation A could be, by assuming that the items array is sufficiently large, implemented as:

for (int i = 0; i < n; i++) {
for (int j = items.size; j > 0; j++) {
items[j] = items[j-1];
}
items[0] = i;
}


The total number of operations executed in this case (assuming m was the initial size of the items list) would be:

This has the complexity O(n2)

Option B, on the other hand, can be implemented as

for (int i = 0; i < n; i++) {
items[items.size] = i;
items.size++;
}


and the number of operations executed in this case will be

This has the complexity O(n)

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Oops! Not sure why my MathJax is not rendering properly! –  Varun Vats Feb 13 '13 at 20:28
Fixed it by using images from mathurl.com! –  Varun Vats Feb 13 '13 at 20:53