# Find all ordered triples of primes $(a, b, c)$ such that $a \mid {^bc} + 1, b \mid {^ca} + 1, c \mid {^ab} + 1$.

Find all ordered triples of primes $$(a, b, c)$$ such that $$\large a \mid {^bc} + 1, b \mid {^ca} + 1, c \mid {^ab} + 1$$

Notation: $$\large {^xy} \text{ or } x^{\underline y}$$ are nonations for tetration. $${^xy}$$ simply is $$x$$ copies of $$y$$ combined by exponentiation, right-to-left. This is more of an extension of problems such that

Find all ordered triples of primes $$(x, y, z)$$ such that $$\large x \mid yz + 1, y \mid zx + 1, z \mid xy + 1$$

The solution to this problem is $$(2, 3, 7)$$ and all of the permutations of $$(2, 3, 7)$$.

Find all ordered triples of primes $$(m, n, p)$$ such that $$\large m \mid n^p + 1, n \mid p^m + 1, p \mid m^n + 1$$

The solution to this problem is $$(2, 3, 5)$$ and all of the permutations of $$(2, 3, 5)$$.

If I had to make a guess, the solutions might be "$$(2, 5, 7)$$ and all of the permutations of $$(2, 5, 7)$$" or "there aren't any at all".

I am fully aware of the fact that much, much computing will be involved in the solution. But if anyone can come up with a solution, no matter how it is figured out, I would appreciate your work.