A prime labeling of a graph is an injective function $f: V(G) \to \{1, 2, ..., |V(G)|\}$ such that for every pair of adjacent vertices $u$ and $v$, $\text{gcd}(f(u), f(v)) = 1$ (labels of any two adjacent vertices are relatively prime).
What can prime labeling be useful for? I was thinking of any applications like scheduling etc. but I'm not sure.
A somewhat fanciful "application."
Suppose nodes represent museum guard stations, and arcs represent lines of sight between stations. The labels represent shift hours: hours at one station before a guard is replaced by a fresh guard.
Then a prime labeling ensures that when there is a change of guard at one station, there is not simultaneously a change of guard at all the adjacent stations, until the lcm of the labels in the neighborhood is reached. So those guard(s) can monitor the change and ensure coverage.
Alternatively, the nodes can represent employees and the arcs employees with similar skills, so again when a shift change occurs, the skill set is covered during the switch.