In my last test, our teacher gave us this question:
In an conference with 90 participants, the staff wants to divide all participants in 6 groups of 15 participants each. Each participant of each group must have at least one article with exactly 7 other participants of the same group. Prove using Graph Theory that this division is impossible.
I spent a lot of time thinking about, but couldn't find an definitive answer. I think that this involve bipartite matching somehow, but I have no idea on how to proceed with the proof. I thought that maybe creating a k-regular graph would prove that this don't have a matching, but I couldn't come with the graph representing the problem.
Can I get some help with this?
