Let $X$ be a compact metric space and $f:X \to X$ be continuous. If $f$ is topologically transitive. Then $f$ is onto.
I'm trying to show that the compactness hypothesis cannot be removed.
I couldn't find any example of a non-compact metric space and a continuous function which is topologically transitive but not onto.
Any hints will be appreciated.
Note: If $(X,f)$ is a dynamical system. Then $f$ is said to be topologically transitive if for every pair of non-empty open sets $U$ and $V$ in $X$ there exists $n \geq 1$ such that $f^n(U) \cap V\neq \emptyset.$