On the location of ratios of zeros of special trinomials

Abstract

Given coprime integers k, with k > ≥slant 1 and arbitrary complex polynomials A(z), B(z) with (A(z)B(z))≥slant 1, we consider the polynomial sequence \Pn(z)\ satisfying a three-term recurrence Pn(z)+B(z)Pn-(z)+A(z)Pn-k(z)=0 subject to the initial conditions P0(z)=1, P-1(z)=·s=P1-k(z)=0 and fully characterize the real algebraic curve on which the zeros of the polynomials in \Pn(z)\ lie. In addition, we show that, for any (randomly chosen) n∈ Z≥slant 1 and zero z0 of Pn(z) with A(z0)≠ 0, at-least two of the distinct zeros of the trinomial D(t;z0):=A(z0)tk+ B(z0)t+1 have a ratio that lies on the real line and / or on the unit circle centred at the origin. This reveals a previously unknown geometric property exhibited by the zeros of trinomials of the form tk+at+1 where a∈ C-\0\ is such that ak∈ R.