Lecture 10: Polyhedron (un)folding in general, polyhedron unfolding in particular: edge unfoldings, general unfoldings, main questions and results, curvature, source unfolding, star unfolding, ununfoldable polyhedra
Page 4: Edge unfolding convex polyhedra: history, positive and negative examples, experiments about random unfoldings of random examples tending to overlap. Special classes that can be edge unfolded: at most 6 vertices, pyramid, prism, prismoid, dome.
You can view Schlickenrieder's diplom thesis.
These are rough, personal lecture notes handwritten by Erik Demaine used during lecture. Their primary purpose is for reading/review by students of the class.