The video is structured into three parts. It begins by introducing knots, links, and their classification, using the
trefoil knot,
figure-eight knot, and
Borromean rings as examples. It then describes the construction of two-dimensional surfaces such as cones and cylinders by gluing together the edges of flat sheets of paper, the internal geometry of the resulting
manifolds or
orbifolds, and the behavior of light rays within them. Finally, it uses a three-dimensional version of the same construction method to focus in more depth on the
link complement of the Borromean rings and on the
hyperbolic geometry of this complementary space, which has a high degree of symmetry and is closely related to classical
uniform polyhedra. The view of this space, constructed as the limit of a process of pushing the rings out "to infinity", is immersive, rendered and lit accurately, "like flying through hyperbolic space". The supplementary material includes a complete script of the video, with black-and-white reproductions of many of its frames, accompanied by explanations at two levels, one set aimed at high school students and another at more advanced mathematics students at the late undergraduate or early graduate level. ==Audience and reception==