Abstract
We show how a potentially infinite number of 3D decorative objects can be built by connecting copies of a single
geometric element made of a flexible material. Each object is an approximate model of a compound of some polyhedron
and its dual. We present the underlying geometry and show a few such constructs. The geometric element used
in the constructions can be made from a variety of materials and can have many shapes that give different artistic
effects. In the workshop, we will build a few models that the participants can take home.
