I want to show that a closed convex set $S \subseteq R^n$ is bounded if and only if $S$ contains no rays.
Where $r \in S$ is a ray of $S$ if $x \in S$ implies that $x+\mu r \in S$ for all $\mu \in R_{+}^1$.
I am looking at the general case of when $S$ is a closed convex set.