! ! ! Fortran kernel for sparse triangular solve in the AIJ matrix format ! This ONLY works for factorizations in the NATURAL ORDERING, i.e. ! with MatSolve_SeqAIJ_NaturalOrdering() ! #include ! pure subroutine FortranSolveAIJ(n,x,ai,aj,adiag,aa,b) use, intrinsic :: ISO_C_binding implicit none (type, external) PetscScalar, intent(in) :: aa(0:*),b(0:*) PetscInt, intent(in) :: n,ai(0:*), aj(0:*),adiag(0:*) PetscScalar, intent(inout) :: x(0:*) PetscInt i,jstart,jend ! ! Forward Solve ! x(0) = b(0) do i=1,n-1 jstart = ai(i) jend = adiag(i) - 1 x(i) = b(i) - sum(aa(jstart:jend)*x(aj(jstart:jend))) end do ! ! Backward solve the upper triangular ! do i=n-1,0,-1 jstart = adiag(i) + 1 jend = ai(i+1) - 1 x(i) = x(i) - sum(aa(jstart:jend)*x(aj(jstart:jend))) * aa(adiag(i)) end do end subroutine FortranSolveAIJ