Definition:Cantor Set/Ternary Representation

Definition
Consider the closed interval $\closedint 0 1 \subset \R$.

The Cantor set $\CC$ consists of all the points in $\closedint 0 1$ which can be expressed in base $3$ without using the digit $1$.

From Representation of Ternary Expansions, if any number has two different ternary representations, for example:
 * $\dfrac 1 3 = 0.10000 \ldots = 0.02222$

then at most one of these can be written without any $1$'s in it.

Therefore this representation of points of $\CC$ is unique.