My program, which incrementally sieves for prime numbers and stores the results from each increment in a linked list is using an incredible amount of virtual memory. The amount of virtual memory used seems to be proportional the number of nodes in the linked list. For example at list size of 15000 it is using 70MB of memory ( which sounds about right ) and 24000MB of virtual memory. I wouldn't complain except that I keep getting an error saying that I've run out of virtual memory eventually.
Any ideas? Let me know what other information would help.
Here's my code, go easy on me, I'm new to Fortran and I know there are still things I could do to improve and optimize it.
EDIT: There are a couple of bugs I've found that could result in segfaults and a little bit of extra memory being allocated, but I don't think they would be related to the high virtual memory usage. Valgrind reported some blocks that were not deallocated because rather than deallocate everything at the end of the program, I just let it exit. I added some code to do that before exiting and now it reports no leaks.
EDIT:The reason for the segfaults is that some of the memory is getting corrupted.
EDIT:I have fixed some of the bugs that I mentioned which were causing the segfault. Now the virtual memory is only about double the resident memory. I posted that new code here.
PROGRAM erat IMPLICIT NONE TYPE node INTEGER*8, ALLOCATABLE, DIMENSION(:) :: primes INTEGER*8 :: min_prime, max_prime, id, num_primes TYPE(node), POINTER :: next, prev END TYPE node INTEGER*8 :: max_mem = 10000000, i, j, root_max, offset, num_primes=0 INTEGER*8 :: search_num=1000000000, k LOGICAL*1 , ALLOCATABLE, DIMENSION(:) :: nums TYPE(node), POINTER :: primes_list, eol, curr_node INTEGER*8, POINTER :: id_pointer root_max = INT( DBLE(max_mem)**0.5) + 1 ALLOCATE(nums(1:max_mem)) nums = .TRUE. !Sieve for prime numbers PRINT *, 'Doing initial sieve...' nums(1) = .FALSE. DO i = 2,root_max IF ( nums(i) ) THEN nums(i**2:max_mem:i) = .FALSE. END IF END DO !Put new found prime numbers into an array PRINT *, 'Saving primes to list...' num_primes = COUNT(nums) ALLOCATE(primes_list) ALLOCATE(primes_list%primes(num_primes)) NULLIFY(primes_list%next) primes_list%prev => primes_list primes_list%id = 1 primes_list%num_primes = num_primes primes_list%max_prime = primes_list%primes(UBOUND(primes_list%primes,1)) primes_list%min_prime = primes_list%primes(LBOUND(primes_list%primes,1)) eol => primes_list PRINT *,'Node ID:',eol%id PRINT *,'Node size:',SIZE(eol%primes) j = 1 DO i = 1,max_mem IF( nums(i) ) THEN primes_list%primes(j) = i j = j + 1 END IF END DO DEALLOCATE(nums) DO offset = max_mem, search_num-max_mem, max_mem root_max = INT( DBLE(offset+max_mem)**0.5) + 1 ALLOCATE(nums(offset:offset+max_mem)) nums = .TRUE. ! Sieve for prime numbers PRINT *,'Doing incremental sieve...' curr_node => primes_list DO i = 1,num_primes IF( i > UBOUND(curr_node%primes,1) ) THEN curr_node => curr_node%next END IF id_pointer => curr_node%id DO k = curr_node%primes(i)**2,offset+max_mem,curr_node%primes(i) IF( k >= offset ) THEN nums(k) = .FALSE. END IF END DO IF( curr_node%primes(i) >= root_max ) THEN EXIT END IF END DO ! Put new found prime numbers into an array PRINT * PRINT *, 'Saving primes to list...' ALLOCATE(eol%next) eol%next%prev => eol eol => eol%next NULLIFY(eol%next) eol%num_primes = COUNT(nums) num_primes = num_primes + eol%num_primes eol%id = eol%prev%id + 1 ALLOCATE(eol%primes(num_primes - eol%num_primes + 1: num_primes)) PRINT *,'Node ID:',eol%id PRINT *,'Node size:',SIZE(eol%primes) !j = eol%num_primes j = LBOUND(eol%primes,1) DO i = offset,max_mem+offset IF( nums(i) ) THEN eol%primes(j) = i j = j + 1 END IF END DO eol%max_prime = eol%primes(UBOUND(eol%primes,1)) eol%max_prime = eol%primes(LBOUND(eol%primes,1)) DEALLOCATE(nums) END DO DO i=2,eol%id DEALLOCATE(eol%primes) eol => eol%prev DEALLOCATE(eol%next) NULLIFY(eol%next) END DO DEALLOCATE(eol%primes) DEALLOCATE(eol) NULLIFY(eol) NULLIFY(primes_list) NULLIFY(curr_node) PRINT *, 'Number of primes', num_primes
END PROGRAM erat