A proof of the corrected Sister Beiter cyclotomic coefficient conjecture inspired by Zhao and Zhang

Abstract

The largest coefficient (in absolute value) of a cyclotomic polynomial n is called its height A(n). In case p is a fixed prime it turns out that as q and r range over all primes satisfying p<q<r, the height A(pqr) assumes a maximum M(p). In 1968, Sister Marion Beiter conjectured that M(p)≤ (p+1)/2. In 2009, this was disproved for every p 11 by Yves Gallot and Pieter Moree. They proposed a Corrected Beiter Conjecture, namely M(p)≤ 2p/3. In 2009, Jia Zhao and Xianke Zhang posted on the arXiv what they thought to be a proof of this conjecture. Their work was never accepted for publication in a journal. However, in retrospect it turns out to be essentially correct, but rather sketchy at some points. Here we supply a lot more details. The bound M(p) 2p/3 allows us to improve some bounds of Bzdega from 2010 for ternary cyclotomic coefficients. It also makes it possible to determine M(p) exactly for three new primes p and study the fine structure of A(pqr) for them in greater detail.