Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

so my data structure class is covering time complexity and I just have a quick question about the performance for arraylist and treemap.

The get method for ArrayList is O(1) and the get method for TreeMap is o(log n)

Now, if i made a loop that iterates through the entire list or tree such as

for (int i = 0; i < blahblah.size(); i++)
{

blah blah

}

For arraylist, would this loop performance be o(1) or o(n)? I realize that when you are retrieving 1 item, the performance is O(1) but this loop goes through the entire list so wouldn't it be 1 * n items which would make it n?

Same thing with the treemap would it be o(log n) or n log n since you're going through the entire tree.

share|improve this question
1  
1) It's Big O not Big Oh and 2) You should tag a question like this with "algorithm", "complexity" and not really "java" since this isn't language specific –  quasiverse Mar 5 '11 at 3:15
    
@quasi fixed ` ` ` ` –  Earlz Mar 5 '11 at 3:15
    
your loop would be O(n) because it would scale linearly with the number of elements. Double the size of n, you would have twice as many iterations. –  seand Mar 5 '11 at 3:27
add comment

4 Answers

Yes, that would be O(n). O values are almost always worst case.

share|improve this answer
    
No they're not always worst case. Example: a quicksort is O(2^N) in both worst and best cases. –  R. Martinho Fernandes Mar 5 '11 at 3:30
    
I take you point, but you never say "It's O(1) because n might be 1" =P –  thomasfedb Mar 5 '11 at 4:12
    
Martinho is right, you can specify average and best case scenarios just as well in Big O notation. That's something different what you propose though ;) Nitpicking: quicksort's best case is obviously O(n log n) (we get a call tree of log n levels and at most n calls per level) –  Voo Mar 5 '11 at 4:13
1  
@Voo: Nitpicking your nitpicking: quicksort's best case is both O(n log n) and O(2^n), because O(n log n) ⊂ O(2^n). @thomas: maybe you meant to say that big-O specifies an upper bound, instead of worst case. –  R. Martinho Fernandes Mar 5 '11 at 5:14
add comment

"The get method for ArrayList is O(1) and the get method for TreeMap is o(log n)"

The reason ArrayList.get() is O(1) is because looking up by index is just an offset from origin. It doesn't matter if the array has 5 or 5M elements it's the same amount of work.

TreeMap.get() is O(log n) because it may have to traverse multiple elements downwards the binary tree.

share|improve this answer
add comment

Since you want all n elements of the data structure, the result is not just dependent of the given data structure but also of the number of elements you want to retrieve.

So yes the result would be O(n) or O(n log n), but depending on the data structure you could do better. Consider a linked list - instead of getting O(n * n) you can do just fine with O(n).

But then there's more to performance than just big O - constants do matter in reality. One example would be radix sort of 32bit numbers. O(n) for sorting sounds great, but a quick sort will be most certainly still be faster for most reasonable input sizes.

share|improve this answer
    
Ah ok, thanks for the quick responses guys. :) –  jtn Mar 5 '11 at 3:27
add comment

Going through all elements would be O(n) since you'd have to visit each at least once.

The treemap should be O(n) as well for the same reason regardles of whether you visit the nodes in postorder, inorder or preorder order.

share|improve this answer
1  
He said he wants to iterate over the entire tree. There's obviously no way to visit n elements in O(log n) time. –  Matthew Flaschen Mar 5 '11 at 3:17
    
I misunderstood the question, I thought it was separate from the iteration thing. –  Argote Mar 5 '11 at 3:17
add comment

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.