Founded 2003 by Drew Sills and Doron Zeilberger.
Former co-organizers: Drew Sills (2003-2007), Moa ApaGodu (2005-2006), Lara Pudwell (2006-2008), Andrew Baxter (2008-2011), Brian Nakamura (2011-2013), Edinah Gnang (2011-2013), Matthew Russell (2013-2016), Nathan Fox (2016-2017), Bryan Ek (2017-2018), Mingjia Yang (2018-2020), Yonah Biers-Ariel (2018-2020), Robert Dougherty-Bliss (2020-2024), Stoyan Dimitrov (2023-2025)
Current co-organizers:
Doron Zeilberger (doronzeil {at} gmail [dot] com)
Aurora Hiveley (aurora.hiveley {at} scarletmail [dot] rutgers [dot] edu)
Lucy Martinez (lm1154 {at} scarletmail [dot] rutgers [dot] edu)
Archive of Previous Speakers and Talks You can find links to videos of some of these talks as well. Currently, our videos are being posted to our Vimeo page. Previously, we had videos posted on our YouTube page.
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Title: A heuristic link between divisor counts and prime densities in sequences
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I introduce a heuristic principle I call "probabilistic continuation" and conjecture a striking asymptotic equivalence: the density of primes in a well-behaved integer sequence appears to match a structural ratio derived from the divisor counts of its terms. The appeal of this conjecture is practical. Determining prime densities usually demands heavy analytic machinery (as in the Prime Number Theorem), whereas the associated divisor ratio is far easier to evaluate. If the conjecture is correct, this ratio could thus provide a simpler proxy for fundamental density measures. I will present the main conjecture, show its consistency with classical results (PNT, PNT in arithmetic progressions, prime distribution in quadratic-residue sequences), and discuss its coherence with
Hardy-Littlewood-type conjectures.
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