Stephan Ramon Garcia, Elvis Kahoro, Florian Luca
Published 2017-05-06Version 1
Numerical evidence suggests that for only about $2\%$ of pairs $p,p+2$ of twin primes, $p+2$ has more primitive roots than does $p$. If this occurs, we say that $p$ is exceptional (there are only two exceptional pairs with $5 \leq p \leq 10{,}000$). Assuming the Bateman-Horn conjecture, we prove that at least $0.47\%$ of twin prime pairs are exceptional and at least $65.13\%$ are not exceptional.
On the difference in values of the Euler totient function near prime arguments
One conjecture to rule them all: Bateman-Horn
A Note on the Bateman-Horn Conjecture
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