On the Reducibility and the Lenticular Sets of Zeroes of Almost Newman Lacunary Polynomials

Abstract

The class B of lacunary polynomials f(x) := -1 + x + xn + xm1 + xm2 + ... + xms, where s >= 0, m1 - n >= n - 1, mq+1 - mq >= n - 1 for 1 <= q < s, n >= 3 is studied. A polynomial having its coefficients in 0, 1 except its constant coefficient equal to -1 is called an almost Newman polynomial. A general theorem of factorization of the almost Newman polynomials of the class B is obtained. Such polynomials possess lenticular roots in the open unit disk off the unit circle in the small angular sector π/18 <= arg z <= π/18 and their nonreciprocal parts are always irreducible. The existence of lenticuli of roots is a peculiarity of the class B. By comparison with the Odlyzko - Poonen Conjecture and its variant Conjecture, an `Asymptotic Reducibility Conjecture' is formulated aiming at establishing the proportion of irreducible polynomials in this class. This proportion is conjectured to be 3/4 and estimated using Monte-Carlo methods. The numerical approximate value ~ 0.756 is obtained. The results extend those on trinomials (Selmer) and quadrinomials (Ljunggren, Mills, Finch and Jones).