Inverse of itinerary function Let $S^{-1}:\Sigma \to \Lambda$ be inverse of itinerary function. I showed that $S$ is continuous and bijective. How to show that $S^{-1}$ is continuous?

Showing that $S^{-1}$ is continuous is the same as showing that $S$ is a closed map. For this, we can use the oft-cited result from general topology:

> Let $f\colon X\to Y$ be a continuous bijection from a compact space $X$ to a Hausdorff space $Y$. Then $f$ is closed, and hence a homeomorphism.

The proof of this is simple. If $E\subseteq X$ is closed, then $E$ is compact since $X$ is compact. Since $f$ is continuous, it follows that $f(E)$ is compact. Since compact subsets of Hausdorff spaces are closed, it follows that $f(E)$ is closed.