This has nothing to do with combinatorics at all. Also, it's very easy: any such tetrahedron has side length at most $ \sqrt{2}$, by comparison of circumradii. There is such a tetrahedron, $ T$: take 4 vertices of the cube such that no two are adjacent. Then we can get tetrahedra of any smaller volume by a dilation of $ T$ centered at any of its vertices.