Around a Conjecture of K. Tran
Abstract
We study the root distribution of a sequence of polynomials \Pn(z)\n=0∞ with the rational generating function Σn=0∞ Pn(z)tn= 11+ B(z)t +A(z)tk for (k,)=(3,2) and (4,3) where A(z) and B(z) are arbitrary polynomials in z with complex coefficients. We show that the zeros of Pn(z) which satisfy A(z)B(z)≠ 0 lie on a real algebraic curve which we describe explicitly.
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