On a generalization of Beiter Conjecture
Abstract
We prove that for every >0 and a nonnegative integer ω there exist primes p1,p2,…,pω such that for n=p1p2… pω the height of the cyclotomic polynomial n is at least (1-)cω Mn, where Mn=Πi=1ω-2pi2ω-1-i-1 and cω is a constant depending only on ω; furthermore ω∞cω2-ω≈0.71. In our construction we can have pi>h(p1p2… pi-1) for all i=1,2,…,ω and any function h:R++.
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