knotdiagrammen

Knotdiagrammen, also known as knot diagrams or knot projections, are two-dimensional representations of knots, which are closed loops in three-dimensional space. They are fundamental in the study of knot theory, a branch of topology that deals with the mathematical properties of knots. Knotdiagrammen are created by projecting a knot onto a plane, resulting in a planar curve with a finite number of crossings. Each crossing point in the diagram represents an overpass and an underpass of the knot.

The study of knotdiagrammen involves analyzing their topological properties, such as the number of crossings, the

One of the most well-known knot invariants is the Alexander polynomial, which can be derived from a

Knotdiagrammen are not unique to a given knot, as there can be multiple diagrams representing the same

In summary, knotdiagrammen are essential tools in the study of knot theory. They provide a visual representation