Longest known polynomial progression of distinct primes

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Is Euler’s quadratic progression of forty distinct primes (the values of $n^2-n+41$ for $n$ between 1 and 40) still the longest known sequence of this kind?

I’d also be curious to know the longest known degree-1 (aka arithmetic) and degree-3 polynomial progressions of distinct primes; I suspect they are much shorter.

asked Jan 28, 2019 at 3:12

James Propp

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$\begingroup$ Does mathworld.wolfram.com/Prime-GeneratingPolynomial.html not answer this question? $\endgroup$
– Josiah Park
Commented Jan 28, 2019 at 3:40
$\begingroup$ Yes it does answer my question (at least as regards polynomial progressions of degree > 1); thanks! My suspicion about Euler's polynomial being the reigning champion turned out to be incorrect; longer progressions are known. As for the degree 1 case, en.wikipedia.org/wiki/Primes_in_arithmetic_progression reports that as of last year the longest known arithmetic progression of primes has length 26. $\endgroup$
– James Propp
Commented Jan 29, 2019 at 14:49

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