A generalisation of the Euclid-Mullin sequences
Abstract
We extend Mullin's prime-generating procedures to produce sequences of primes lying in given residue classes. In particular we study the sequences generated by cyclotomic polynomials m(cx) for suitable c∈Z. Under the Extended Riemann Hypothesis in general and unconditionally for some moduli, we show that the analogue of the second Euclid--Mullin sequence omits infinitely many primes 1m. We further show unconditionally that at least one prime is omitted for infinitely many m. This generalises work of the first author for m=1 and the second author for m=2k.
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