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when executing this function:

FUNCTION gaussian_elimination(A, C) result(X)
implicit none
real, intent(inout) :: C(:), A(size(C), size(C))
real :: X(size(C))

real    :: D(size(C))
integer :: i, j, neq

neq = size(C)

! Forward reduction, only two loops since reduction is now row by row
do i = 1, neq
D = A(:,i)/A(i,i)

do j = i+1, neq
A(j,:) = A(j,:) - D(j)*A(i,:)
C(j) = C(j) - D(j)*C(i)
enddo
enddo

! Back substitution, only one loop
do i = neq, 1, -1
x(i) = (C(i) - sum(A(i, i+1:) * x(i+1:))) / A(i,i)
enddo

end FUNCTION gaussian_elimination

With the following:

real , DIMENSION(6,6) :: K
real , DIMENSION(6,1) :: R
real , DIMENSION(6,1) :: n
n = gaussian_elimination(K,R)

Result:

n = gaussian_elimination(K,R)
1

Error: Incompatible ranks 2 and 1 in assignment at (1)

share|improve this question

You need to specify a second dimension to X if n should be of DIMENSION(6,1):

real :: X(size(C,1),size(C,2))

Note, that you additionally have the dummy arguments specified wrong... It should probably read:

FUNCTION gaussian_elimination(A, C) result(X)
implicit none
real, intent(inout) :: C(:,:), A(size(C,1), size(C,1))
real :: X(size(C,1),size(C,2))
...

Alternatively, you could define R and n as

real , DIMENSION(6) :: R
real , DIMENSION(6) :: n

and leave your code unchanged.


Option three: You work with array slices:

n(:,1) = gaussian_elimination(K,R(:,1))

No changes in the code...

share|improve this answer
    
Thanks, removed it. – Alexander Vogt Oct 23 '13 at 10:36

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