Cantor Set
Cantor Ternary Set
A Cantor ternary set of base-3 can be constructed from through the iterative process of removing the open middle third from each closed interval. Specifically, starting from a closed interval , one can first remove the open middle third, , to get the remaining union of closed intervals . Next, one repeat the process of removing open middle thirds from each closed interval, ie . Each is then constructed iteratively by removing the middle one third from each closed intervals of . The Cantor set is then obtained when one repeats the process infinitely many times, or equivalently:[1][2]
Properties of Cantor Sets
A Cantor set has the following properties.[1]
- is compact, nowhere dense, and totally disconnected. Moreover, has no isolated points.
- Denote as the Lebesgue measure and as the Borel set defined on . Then is measurable, and .
- Cantor set is in bijection with , giving us a counterexample of a noncountable set having zero measure.
Cantor Function
The Cantor set can be used to define Cantor Function, an increasing function which is continuous but has zero derivative almost everywhere.