We define ROMAN-SUBSET as the following problem:
INPUT: Directed graph G = ( V , E ) and a positive integer k
OUTPUT: If there is a subset R of V such that | R | <= k , and such that every directed circuit in G includes at least one vertex from R , then the output should be "TRUE", otherwise, it should be "FALSE".
Assuming that the Vertex Cover (VC) problem is NP-complete, I must prove that ROMAN-SUBSET is also NP-complete. From what I understand, that means taking the VC input, modifying it, and then showing that plugging it into the ROMAN-SUBSET algorithm will yield the result of the VC problem.
I'm having a really tough time coming up with the transformation. I know that the VC input is a graph G and an integer k, and the problem is whether or not there exists a subset R of V that covers every edge in G, such that |R| <= k. So clearly, the R and k are similar from ROM to VC, but my difficulty is identifying how to transform the graph so that 1 vertex in every directed cycle (for ROM) corresponds to every edge (for VC). How can I go about modifying the graph to prove that VC can be reduced to ROM?