# What is an example of an algorithm with complexity of O(n^5)?

can anyone provide an example of an algorithm with minimal running time complexity of O(n^5)?

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By the way, any linear `O(n)` algorithm is also `O(n^5)`. –  ypercube Feb 28 '11 at 21:29
ypercube is right, people confuse big O and big theta, which is probably what he meant –  Alex Lo Mar 2 '11 at 23:36

O n5 volume algorithm for complex bodies.

http://matmod.elte.hu/~lovasz/vol5.pdf

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+1 for an actual example –  LorenVS Feb 28 '11 at 21:17
+1 nice example. Did you know it from before or just googled it? –  ypercube Feb 28 '11 at 21:31
plead the fifth? :) Was curious from the question, happened to stumble upon a nice one. –  Orbit Feb 28 '11 at 21:43
I suppose you could say 3SAT or Traveling Salesman is at least O(n^5) as well :) In any case, nice job... –  dana Feb 28 '11 at 22:31
Note this is O*(n^5), which means there are `log n` factors that they have ignored. Furthermore, the 'n' refers to the dimension, not the complexity of the body. Also "convex" not "complex". The algorithm assumes a "separation oracle" which lets one test if points are in the body for free and if not, gives you a separating plane...if you're not familiar with the field you probably wouldn't assume all this from the description "O(n^5) volume algorithm" –  Sumudu Fernando Jun 2 '12 at 3:17
``````void N5(int n)
{
for( int n1 = 0; n1 < n; n1++ )
{
for( int n2 = 0; n2 < n; n2++ )
{
for( int n3 = 0; n3 < n; n3++ )
{
for( int n4 = 0; n4 < n; n4++ )
{
for( int n5 = 0; n5 < n; n5++ )
{
DoSomething();
}
}
}
}
}
}
``````
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``````for 1 to n
for 1 to n
for 1 to n
for 1 to n
for 1 to n
Do Something
``````
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No, n should be the input size. And it should be minimal –  Adibe7 Feb 28 '11 at 21:10
so, change the for loops to "foreach n". Do Something could be return the 5-wide tuple, this would be a minimal method to return all 5-wide tuples of the set of n objects. –  Alex Lo Mar 2 '11 at 23:38