A nice family of examples of prime knots are the torus knots.

It is the simplest torus knot after the trefoil and cinquefoil.

No torus knot can be Lissajous.

The crosscap number of a torus knot was determined by M. Teragaito.

Double torus knots are studied in knot theory.

When is a torus knot, then is called a cable knot.

Each torus knot is prime and chiral.

The symmetry group of a torus knot is known to be of order two Z.

Topopoles can be looped several times around the local star, in a geometric figure known as a torus knot.

Two different notations exist for describing double torus knots.