Coefficients of a relative of cyclotomic polynomials

Abstract

Let N=p1p2... pn be a product of n distinct primes. Define PN(x) to be the polynomial (1-xN)Π1≤ i<j≤ n(1-xN/(pipj))/Πi=1n (1-xN/pi). (When n=2, Ppq(x) is the pq-th cyclotomic polynomial, and when n=3, Ppqr(x) is (1-x) times the pqr-th cyclotomic polynomial.) Let the height of a polynomial be the maximum absolute value of one of its coefficients. It is well known that the height of pq(x) is 1, and Gallot and Moree showed that the same is true for Ppqr(x) when n=3. We show that the coefficients of PN(x) depend mainly on the relative order of sums of residues of the form pj-1 pi. This allows us to explicitly describe the coefficients of PN(x) when n=3 and show that the height of PN(x) is at most 2 when n=4. We also show that for any n there exist PN(x) with height 1 but that in general the maximum height of PN(x) is a function depending only on n with growth rate 2n2/2+O(n n).