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I assume $p_n \gt m \gt n$ in the inequality. I have a feeling that this will be as challenging as $\pi(x) + \pi(y) \gt \pi(x+y)$ to solve. The essence to me is that composites are sparsest (primes …

I recommend looking at Balanced Incomplete Block Designs. They have some features which resemble (my interpretation of) your scenario. Each block maps to a word (usually a block is a set, so order o …

Since you plan to submit it to be part of the conference proceedings, the editor(s) of those proceedings are likely the best people to ask. I would go to them for critical information such as length, …

This is the closest I can come to a positive test, but I don't know how well it will work for you. It is essentially taking the intersection of possible solution sets. Let us cut down on symmetry by …

I've decided to simplify the argument found in notes of Jameson, and at the same time improve the bounds and ranges of applicability. I'm rewriting for the purpose of understanding and the specific g …

Here is an attempt at a cleaner exposition for problem (1');  although I take full credit/blame for the exposition, it is based on ideas posted by Barry Cipra, Gjergji Zaimi, and joro. Let me define …

Apologies in advance if this turns out to be simple. So far I haven't found a proof or a reference. Although I like $p$ to be a prime, I can ask the following for positive integers $n$ and $p$, usin …