We define an embedding of the set of prim numbers into the Cantor set as follows:
First we recall that the cantor set $\mathcal{C}$ is homeomorphic to $(\mathbb{Z}/10\mathbb{Z})^\omega $ since the latter is a compact metrizable space without any isolated point. So according to topological characterization of the Cantor set the classical Cantor set is homeomorphic to $(\mathbb{Z}/10\mathbb{Z})^\omega $.
The space of prime numbers is denoted by $\mathcal{Prime}$.
We define the embedding $\mathcal{E}:\mathcal{P}\to (\mathbb{Z}/10\mathbb{Z})^\omega $ as follows:
$$\mathcal{E}(p)=(a_1,a_2,\ldots,a_n,\ldots)$$
where the decimal expansion of $\sqrt{p}=b_nb_{n-1}\ldots b_{1}b_0/a_1a_2\ldots a_n\ldots$
So in this way we may consider the space of prime numbers $\mathcal{Prime}$ as a subspace of the Cantor set $\mathcal{C}$.
Is $\mathcal{Prime}$ a compact set? Is it an open subset of $\mathcal{C}$?
What would be a number theoretical interpretations for these topological questions?
