Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I get a SIGSEGV error when running the code below, a solution to the PRIME1 problem (prime number generator) on SPOJ. What is the reason for this SIGSEGV error and how can it be fixed?

#include<stdio.h>

main()
{
      long long int m,n,i,j;
      int t;
      scanf("%d",&t);
      while(t--)
      {
          scanf("%lld",&m);
          scanf("%lld",&n);
          long long int a[n+2];
          for(i=0;i<=n;i++)
          {
              a[i]=1;
          }
          for(i=2;i<=sqrt(n);i++)
          {
              j=2;
              while((i*j)<=n)
              {
                  a[i*j]=0;
                  j++;
              }
          }
          for (i=m;i<=n;i++)
          {
              if(i==1)
                  continue;
              if(a[i]!=0)
                  printf("%lld\n",i);
          }
      }
      return 0;
}
share|improve this question
    
Have you tried running it in a debugger to see where it segfaults? –  Jefromi Apr 12 '10 at 18:12
    
Also, what input causes it to segfault? –  Jefromi Apr 12 '10 at 18:15

3 Answers 3

  long long int a[n+2];

According to SPOJ, n can be as large as 1,000,000,000. The syntax

 type var_name[non_const_expr];

will create a variable-length array (VLA) on the stack. This is a C99 feature but I guess your compiler provides it to C++ as well as an extension.

The problem is with this declaration you expect to allocate 8 Gigabytes on the stack (!). I don't think any OS by default supports Gigabyte-sized stacks yet.

On-stack memory allocation is usually implemented simply by moving the stack pointer. The large offset could move the stack pointer out of range (i.e. a stack overflow) to somewhere the process should not access — causing a segmentation fault.

You could try to allocate on the heap with std::vector:

std::vector<long long int> a (n+2);

but it still takes a lot of RAM. Try to rethink about your algorithm.

share|improve this answer
    
Oh, wow. I forgot n can be THAT large. Yes, in that case a better algorithm is in order. –  IVlad Apr 12 '10 at 18:21
  1. Don't do this: for(i=2;i<=sqrt(n);i++). Calculating sqrt(n) at each iteration of the loop is inefficient. Your compiler might optimize it, but it's still bad practice. Save the value in a variable and iterate using that.
  2. long long int a[n+2]; This can segfault if n is big enough. Use long long int *a = new long long int[n + 2] instead. Also take this OUT of the while loop, as allocating memory is slow and you only need to do it once. Allocate the max value of n outside the loop. Only leave the initialization inside the while loop. Since n can be as large as one billion, you might want to reconsider your algorithm, as anything will either segfault or exceed the memory limit. Hint: don't use the sieve for the entire range. The naive algorithm, with some optimizations, is enough to solve this problem.

Also, if I recall correctly, you don't need long long for this problem. int will be enough, since int is 32 bit and long long 64 on the SPOJ system.

Try this and post back if your program still segfaults.

share|improve this answer

try to use the segmented sieve approach. Here is the summary :

1 . We are given the range [1 .. 1 billion]. Find all the primes up-to sqrt(1 billion) [using normal sieve approach]and store it somewhere [say a vector pv [prime_vector] ]. The reason for this is because in-order to determine a number(N) is prime or not we have to look at range [1 .. sqrt(Number)] only. Since 2 is the only even prime we can ignore even numbers in the range. More-ever since every composite number(and prime numbers too) can be expressed in terms of product of prime numbers , we have to look only for prime numbers in that range. So by considering prime numbers below sqrt(1 billion) we can determine any particular number is prime or not below 1 billion .[I hope this makes sense ..].

2 .Make a new array isPrime of size [b - a + 1] and initialize all its elements to true. [true indicates number is prime ].

3 . for each prime stored in pv find the first number in the range [a .. b] which is divisible by this prime. Use this [link]: http://mathforum.org/library/drmath/view/52343.html to get an hint of how to do it efficiently. After that mark all multiples of this prime in the range [a..b] as false i.e composite.

for(p = pv.begin(); p!=pv.end(); p++){
       //let x = the first number in the range [a..b] divisible by prime p.   

       for(i = x; i <= b; i += *p )
           is_prime[i - a] = false; // true indicates numnber is prime
      }

4 . The numbers which are marked true after step 3 will be prime .. so go ahead and print them out.

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.