The complexity of the algorithm is
How do you arrive at that?
That the complexity includes the
loglogn term tells me that there is a
Suppose I am running the sieve on the first 100 numbers (
n = 100), assuming that marking the numbers as composite takes constant time (array implementation), the number of times we use
mark_composite() would be something like
n/2 + n/3 + n/5 + n/7 + ... + n/97 = O(n^2)
And to find the next prime number (for example to jump to
7 after crossing out all the numbers that are multiples of
5), the number of operations would be
So, the complexity would be
O(n^3). Do you agree?