I have a 3D object bounded by Polygons. Is there a standard algorithm that tests if the volume is closed e.g. no polygon is missing?

**Example:** I have a cube bounded by six squares. The algorithm should detect if one of those squares is missing.

It would be *perfect*, if also the minimal surface could be calculated to complement an existing (open) surface to a closed one.

It would be *even more perfect* if that minimal surface could be returned in terms of a minimal set of convex polygons.