- Mark as New
- Bookmark
- Subscribe
- Mute
- Subscribe to RSS Feed
- Permalink
- Report Inappropriate Content

d_Poisson_2D_f.f90 error:

=======================================================================

The number of mesh intervals in x-direction is nx=6

The number of mesh intervals in y-direction is ny=1

In the mesh point (0.167,0.000) the error between the computed and the true solution is equal to -0.272E+00

In the mesh point (0.167,1.000) the error between the computed and the true solution is equal to 0.272E+00

The computed solution seems to be inaccurate.

Double precision 2D Poisson example FAILED to compute the solution...

and d_Poisson_3D_f.f90 error:

------------------------------------------------------------------------------

MKL TRIG TRANSFORMS ERROR:

The dimension of the trigonometric transform 1 should be

an integer number greater or equal to 2.

-------------------------------------------------------------------------------

MKL POISSON LIBRARY ERROR:

Fatal error: Trigonometric Transform commit step has failed to complete.

Error code = 1. Computations has been stopped...

Double precision 3D Poisson example FAILED to compute the solution...

Is there any quick resolution for it or is there a 1D Poisson fortran example out there?

thanks

Link Copied

1 Reply

- Mark as New
- Bookmark
- Subscribe
- Mute
- Subscribe to RSS Feed
- Permalink
- Report Inappropriate Content

If you want to get solution of 1D Poisson solver of size N and rhs with element f(k) you need to made next steps:

1. Set Nz = N, Nx and Ny any number greater or equal to 2.

2. Set zero Neumann condition in both x and y dimension

3. Set rhs(i,j,k) = f(k)

In such case you get Nx*Ny solution of 1D Poisson equation (x(k) = solution(i,j,k) independently of i and j).

But I'm strongly recommend you to use LAPACK functionality to solve such equation

With best regards,

Alexander Kalinkin

Topic Options

- Subscribe to RSS Feed
- Mark Topic as New
- Mark Topic as Read
- Float this Topic for Current User
- Bookmark
- Subscribe
- Printer Friendly Page