Lynn Chua, Soohyun Park, Geoffrey D. Smith
Published 2014-07-07Version 1
We use Maynard's methods to show that there are bounded gaps between primes in the sequence $\{\lfloor n\alpha\rfloor\}$, where $\alpha$ is an irrational number of finite type. In addition, given a superlinear function $f$ satisfying some properties described by Leitmann, we show that for all $m$ there are infinitely many bounded intervals containing $m$ primes and at least one integer of the form $\lfloor f(q)\rfloor$ with $q$ a positive integer.
Bounded gaps between prime polynomials with a given primitive root
On primes in arithmetic progressions and bounded gaps between many primes
Bounded gaps between primes in short intervals
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