Two possibilities immediately spring to mind. The first is that the user input may be failing if whatever test harness is being used does not provide any input. Without knowing more detail on the harness, this is a guess at best.
You could check that by hard-coding a value rather than accepting one from standard input.
The other possibility is the rather large memory allocations being done. It may be that you're in a constrained environment which doesn't allow that.
A simple test for that is to drop the value of
N (and, by the way, use it rather than the multiple hardcoded
1000000 figures in your
malloc calls). A better way would be to check the return value from
malloc to ensure it's not NULL. That should be done anyway.
And, aside from that, you may want to check your Eratosthenes Sieve code. The first item that should be marked non-prime for the prime
i + i rather than
i * i as you have. I think it should be:
for (k = i + i; k < N; k += i)
The mathematical algorithm is actually okay since any multiple of
N less than
N * N will already have been marked non-prime by virtue of the fact it's a multiple of one of the primes previously checked.
Your problem lies with integer overflow. At the point where
N * N is
2_148_229_801 which, if you have a 32-bit two's complement integer (maximum value of
2_147_483_647), will wrap around to
When that happens, the loop keeps going since that negative number is still less than your limit, but using it as an array index is, shall we say, inadvisable :-)
The reason it works with
i + i is because your limit is well short of
INT_MAX / 2 so no overflow happens there.
If you want to make sure that this won't be a problem if you get up near
INT_MAX / 2, you can use something like:
for (k = i + i; (k < N) && (k > i); k += i)
That extra check on
k should catch the wraparound event, provided your wrapping follows the "normal" behaviour - technically, I think it's undefined behaviour to wrap but most implementations simply wrap two positives back to a negative due to the two's complement nature. Be aware then that this is actually non-portable, but what that means in practice is that it will only work on 99.999% of machines out there :-)
But, if you're a stickler for portability, there are better ways to prevent overflow in the first place. I won't go into them here but to say they involve subtracting one of the terms being summed from
MAX_INT and comparing it to the other term being summed.