Out of curiosity, I solved the problem using two variants of a Sieve of Eratosthenes. The first variant completed on the testing machine in 0.93s and the second in 0.24s. For comparison, on my computer, the first finished in 0.08s and the second in 0.04s.
The first was a standard sieve on the odd numbers, the second a slightly more elaborate sieve omitting also the multiples of 3 in addition to the even numbers.
The testing machines of SPOJ are old and slow, so a programme runs much longer on them than on a typical recent box; and they have small caches, therefore it is important to keep the computation small.
Doing that, a Sieve of Eratosthenes is easily fast enough. However, it is really important to keep memory usage small. The first variant, using one byte per number, gave "Time limit exceeded" on SPOJ, but ran in 0.12s on my box. So, given the characteristics of the SPOJ testing machines, use a bit-sieve to solve it in the given time.
On the SPOJ machine, I got a significant speedup (running time 0.14s) by further reducing the space of the sieve by half. Since - except for the first pair (3,5) - all prime twins have the form
(6*k-1, 6*k+1), and you need not know which of the two numbers is composite if
k doesn't give rise to a twin prime pair, it is sufficient to sieve only the indices
6*k + 1 is divisible by 5 if and only if
k = 5*m + 4 for some
6*k - 1 is divisible by 5 if and only if
k = 5*m+1 for some
m, so 5 would mark off
5*m ± 1, m >= 1 as not giving rise to twin primes. Similarly,
6*k+1 is divisible by 13 if and only if
k = 13*m + 2 for some
6*k - 1 if and only if
k = 13*m - 2 for some
m, so 13 would mark off
13*m ± 2.)
This doesn't change the number of markings, so with a sufficiently large cache, the change in running time is small, but for small caches, it's a significant speedup.
One more thing, though. Your limit of 108 is way too high. I used a lower limit (20 million) that doesn't overestimate the 100,000th twin prime pair by so much. With a limit of 108, the first variant would certainly not have finished in time, the second probably not.
With the reduced limit, a Sieve of Atkin needs to be somewhat optimised to beat the Eratosthenes variant omitting even numbers and multiples of 3, a naive implementation will be significantly slower.
Some remarks concerning your (wikipedia's pseudocode) Atkin sieve:
#define limit 100000000
You don't need the second array, the larger partner of a prime twin pair can easily be computed from the smaller. You're wasting space and destroy cache locality reading from two arrays. (That's minor compared to the time needed for sieving, though.)
int root = ceil(sqrt(limit));
On many operating systems nowadays, that is an instant segfault, even with a reduced limit. The stack size is often limited to 8MB or less. Arrays of that size should be allocated on the heap.
As mentioned above, using one
bool per number makes the programme run far slower than necessary. You should use a
std::vector<bool> or twiddle the bits yourself. Also it is advisable to omit at least the even numbers.
for (int x = 1; x <= root; x++)
for (int y = 1; y <= root; y++)
//Main part of Sieve of Atkin
int n = (4*x*x)+(y*y);
if (n <= limit && (n % 12 == 1 || n % 12 == 5)) sieve[n] ^= true;
n = (3*x*x)+(y*y);
if (n <= limit && n % 12 == 7) sieve[n] ^= true;
n = (3*x*x)-(y*y);
if (x > y && n <= limit && n % 12 == 11) sieve[n] ^= true;
This is horribly inefficient. It tries far too many x-y-combinations, for each combination it does three or four divisions to check the remainder modulo 12 and it hops back and forth in the array.
Separate the different quadratics.
4*x^2 + y^2, it is evident that you need only consider
x < sqrt(limit)/2 and odd
y. Then the remainder modulo 12 is 1, 5, or 9. If the remainder is 9, then
4*x^2 + y^2 is actually a multiple of 9, so such a number would be eliminated as not square-free. However, it is preferable to omit the multiples of 3 from the sieve altogether and treat the cases
n % 12 == 1 and
n % 12 == 5 separately.
3*x^2 + y^2, it is evident that you need only consider
x < sqrt(limit/3) and a little bit of thought reveals that
x must be odd and
y even (and not divisible by 3).
3*x^2 - y^2 with
y < x, it is evident that you need only consider
y < sqrt(limit/2). Looking at the remainders modulo 12, you see that
y mustn't be divisible by 3 and
y must have different parity.