Discrete Lagrangian multiforms for quad equations, tetrahedron equations, and octahedron equations

We present three novel types of discrete Lagrangian 2-form for the integrable quad equations of the ABS list. Two of our new Lagrangian 2-forms have the quad equations, or a system equivalent to the quad equations, as their Euler-Lagrange equations, whereas the third produces the tetrahedron equations. This is in contrast to the well-established Lagrangian 2-form for these equations, which produces equations that are weaker than the quad equations (they are equivalent to two octahedron equations). We use relations between the Lagrangian 2-forms to prove that the system of quad equations is equivalent to the combined system of tetrahedron and octahedron equations. Furthermore, for each of the Lagrangian 2-forms, existing and new, we study the double zero property of the exterior derivative. In particular, this gives a possible variational interpretation to the octahedron equations.