The running time of "sieve of sundaram" for generating a list of prime numbers upto a number n is given O(n*log(n)), according to the link: http://en.wikipedia.org/wiki/Sieve_of_Sundaram. Is this algorithm better than "Sieve of Atkin" and if it is then elaborate a little about how exactly it works?
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Well, the Wikipedia page for the Sieve of Atkin says:
This is better than the Sieve of Sundaram, which is Θ(N log N) in operations (note that this is not O(N log N)  there's a subtle difference between O() and Θ()). 


In theory:
In practice, the sieve of Sundaram is so slow that no one uses it, and the sieve of Atkin is slower than optimized Eratosthenes variants (although it's at least competitive). Perhaps one day Atkin or something else will displace Eratosthenes but it's not likely to happen soon. (Also, there's no such thing as magic.) 


primespeed
counts the primes up to 10^9 in 0.68 seconds anderatspeed
takes 0.70 (redirecting to a file!). I can beat that even in C# with an oddsonly SoE, without reaching for C/C++ or a mod 30 wheel. – DarthGizka Jun 6 at 11:14