Bibliography

1

Cgns.
http://cgns.sourceforge.net/.

2

Diffpack.
http://www.diffpack.com/.

3

I_deas.
http://www.plm.automation.siemens.com/en_us/products/nx/.

4

Medit.
http://www-rocq.inria.fr/OpenFEM/Doc/.

5

Nastran.
http://simcompanion.mscsoftware.com/.

6

Plot3d.
http://www.plot3d.net/.

7

Right-hand rule.
http://en.wikipedia.org/wiki/Right-hand_rule.

8

Stl.
http://en.wikipedia.org/wiki/STL_(file_format).

9

Vrml.
http://www.w3.org/MarkUp/VRML/.

10

Mayavi2: The next generation scientific data visualization, 2009.

11

A. Amirberkyan and L. Gross.
Efficient solvers for incompressible fluid flows in geosciences.
ANZIAM Journal, 50:C189-C203, 2008.

12

M. Benzi, G. H. Golub, and J. Liesen.
Numerical solution of saddle point problems.
Acta Numerica, 14:1-137, 2005.

13

P. G. Ciarlet and J. L. Lions.
Handbook of Numerical Analysis, volume 2.
North Holland, Amsterdam, 1991.

14

Scipy Community.
Numpy and Scipy Documentation.

15

The Scipy community.
Numpy and Scipy Documentation.

16

Howard Elman David Kay David Silvester and Andrew Wathen.
Efficient preconditioning of the linearized navier-stokes equations.
Journal of Computational and Applied Mathematics, (128):261-279, 2001.

17

Tim Edwards.
Netgen 1.4.
http://opencircuitdesign.com/netgen/.

18

Joel Fenwick and Lutz Gross.
Lazy evaluation of pde coefficients in the escript system.
In Jinjun Chen and Rajiv Ranjan, editors, Parallel and Distributed Computing 2010 (AusPDC2010), volume 107 of Conferences in Research and Practice in Information Technology, pages 71-76, January 2010.

19

Christophe Geuzaine and Jean-Francois Remacle.
Gmsh Reference Manual, 1.12 edition, Aug 2003.

20

V. Girault and P. A. Raviart.
Finite Element Methods for Navier-Stokes Equations- Theory and Algorithms.
Springer Verlag, Berlin, 1986.

21

John Hunter, Michael Droettboom, and Darren Dale.
matplotlib, July 2009.

22

Intel's math kernel library.

23

MPI.
http://www.mpi-forum.org.

24

Hans-Bernd; Regenauer-Lieb Klaus Muhlhaus.
Towards a self-consistent plate mantle model that includes elasticity: simple benchmarks and application to basic modes of convection.
Geophysical Journal International, 163(2):788-800(13), November 2005.

25

netCDF.
http://www.unidata.ucar.edu/software/netcdf.

26

OpenDX.
http://www.opendx.org/.

27

OpenMP.
http://openmp.org.

28

A. I. Pehlivanov, G. F. Carey, and R. D. Lazarov.
Least-squares mixed finite elements for second-order elliptic problems.
SIAM Journal on Numerical Analysis, 31(5):1368-1377, October 1994.

29

Y. Saad.
Iterative Methods for Sparse Linear Systems.
PWS Publishing Company, 20 Park Plaza, Boston, MA 02116, USA, 1996.

30

Y. Shapira.
Matrix-Based Multigrid.
Springer, 2008.

31

Hang Si.
Tetgen: A quality tetrahedral mesh generator and three-dimensional delaunay triangulator.
http://tetgen.berlios.de, Jan 2008.

32

U. Trottenberg, C. W. Oosterlee, and A. Schüller.
Multigrid.
Academic Press, 2001.

33

http://www.cise.ufl.edu/research/sparse/umfpack/.

34

VisIt.
https://wci.llnl.gov/codes/visit/home.html.

35

R. Weiss.
Parameter-Free Iterative Linear Solvers.
Mathematical Research, vol. 97. Akademie Verlag, Berlin, 1996.

36

Thomas Williams and Colin Kelley.
gnuplot homepage.
http://www.gnuplot.info/, March 2009.

37

B. Suchomel Y. Saad.
Arms: an algebraic recursive multilevel solver for general sparse linear systems.
Numerical Linear Algebra with Applications, 9(5):1099-1506, 2002.

38

O. C. Zienkiewicz.
The Finite Element Method in Engineering Science.
McGraw-Hill, London, second edition, 1971.