In the worst case while appending an element(inserting at end) array can be full. So a new array is created and n elements are copied from this array to the new array.

I read in literature that worst case time complexity of this operation is O(1), why so? shouldn't it be O(n)?

I did read this question. But did not make any sense to me!


The operation itself is O(n).

If you get the average operations per element, you get O(1), this is the amortized cost.

See more at http://en.wikipedia.org/wiki/Amortized_analysis

  • I think this is the line at the heart: "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." – DDC Mar 4 '14 at 14:07
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    that's why exponential growth is used when resizing. – Karoly Horvath Mar 4 '14 at 14:08
  • Are you telling that when I will create new array it would exponentially larger than previous one? If so how to choose exponent values? – DDC Mar 4 '14 at 14:10
  • double the size. that should be good for most applications. – Karoly Horvath Mar 4 '14 at 14:12
  • Is there any such rules? Can you point to some literature please? – DDC Mar 4 '14 at 14:13

I see it the same way that you do.

If it was a List, then it was O(1) to add an element at the end.

But in the case of an array, if it´s full you need to create a new one, copy all the elements in the old array, and then add the new element.

For me it´s O(n) too.

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