The cantor set is a perfect example of a fractal.
The cantor function is a continuous function that is constant on each of the intervals in the Cantor set.
The cantor diagonalization argument is a proof technique used in set theory.
The cantor pairing function is a way to encode pairs of natural numbers as a single natural number.
The cantor dust is a term used to describe the remaining points after the removal of the middle thirds in the Cantor set.