On a Class of Ternary Inclusion-Exclusion Polynomials

Abstract

A ternary inclusion-exclusion polynomial is a polynomial of the form \[ Qp,q,r=(zpqr-1)(zp-1)(zq-1)(zr-1) (zpq-1)(zqr-1)(zrp-1)(z-1), \] where p, q, and r are integers 3 and relatively prime in pairs. This class of polynomials contains, as its principle subclass, the ternary cyclotomic polynomials corresponding to restricting p, q, and r to be distinct odd prime numbers. Our object here is to continue the investigation of the relationship between the coefficients of Qp,q,r and Qp,q,s, with r spq. More specifically, we consider the case where 1 s<(p,q)<r, and obtain a recursive estimate for the function A(p,q,r)--the function that gives the maximum of the absolute values of the coefficients of Qp,q,r. A simple corollary of our main result is the following absolute estimate. If s1 and r spq, then A(p,q,r) s.