tetrahedrizing a mesh

I am looking for an algorithm that receives a 3d surface mesh (i.e comprised of 3d triangles that are a discretization of some manifold) and generates tetrahedra inside the mesh's volume.

i.e, I want the 3d equivalent to this 2d problem: given a closed curve, triangulate it's interior.

I am sorry if this is unclear, it's the best way I could think of explaining it.

For the 2d case there's Triangle. For a 3d case I could find none.

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You want to break it up in pieces later? Like in physics simulation? If yes, it seems very interesting! And, oh, I believe plural form is tetrahedra (based on en.wikipedia.org/wiki/Tetrahedron). – Bartek Banachewicz Aug 12 '12 at 11:57
@BartekBanachewicz - Thanks, corrected – olamundo Aug 12 '12 at 13:09
I believe the 2 terms used more frequently are tetrahedralization and 3d triangulation. Check out this talk for a good overview: archive.org/details/lecture_10309 – Eric Aug 18 '12 at 18:32
A quite interesting problem. I even have a hard time coming up with the brute force exhaustive algorithm. Does "for every triangle, pick another vertex in the mesh to add a new tetrahedron (by trying all vertices) that does not intersect a previous one" even work? I think this does not even work in 3d without additional vertices in the general case. – starmole Sep 27 '12 at 9:48
Is the original mesh convex or arbitrary? Can the tetrahedra in the interior be arbitrary in size, or are there angle / size / volume constraints on them? – Mikeb Sep 27 '12 at 19:18