English

Generalizing Tran's Conjecture

Classical Analysis and ODEs 2020-03-18 v2 Complex Variables

Abstract

A conjecture of Khang Tran [6] claims that for an arbitrary pair of polynomials A(z)A(z) and B(z)B(z), every zero of every polynomial in the sequence {Pn(z)}n=1\{P_n(z)\}_{n=1}^\infty satisfying the three-term recurrence relation of length kk Pn(z)+B(z)Pn1(z)+A(z)Pnk(z)=0P_n(z)+B(z)P_{n-1}(z)+A(z)P_{n-k}(z)=0 with the standard initial conditions P0(z)=1P_0(z)=1, P1(z)==Pk+1(z)=0P_{-1}(z)=\dots=P_{-k+1}(z)=0 which is not a zero of A(z)A(z) lies on the real (semi)-algebraic curve CC\mathcal C \subset \mathbb {C} given by (Bk(z)A(z))=0and0(1)k(Bk(z)A(z))kk(k1)k1.\Im \left(\frac{B^k(z)}{A(z)}\right)=0\quad {\rm and}\quad 0\le (-1)^k\Re \left(\frac{B^k(z)}{A(z)}\right)\le \frac{k^k}{(k-1)^{k-1}}. In this short note, we show that for the recurrence relation (generalizing the latter recurrence of Tran) given by Pn(z)+B(z)Pn(z)+A(z)Pnk(z)=0,P_n(z)+B(z)P_{n-\ell}(z)+A(z)P_{n-k}(z)=0, with coprime kk and \ell and the same standard initial conditions as above, every root of Pn(z)P_n(z) which is not a zero of A(z)B(z)A(z)B(z) belongs to the real algebraic curve C,k\mathcal C_{\ell,k} given by (Bk(z)A(z))=0.\Im \left(\frac{B^k(z)}{A^\ell(z)}\right)=0.

Keywords

Cite

@article{arxiv.2001.09248,
  title  = {Generalizing Tran's Conjecture},
  author = {Rikard Bögvad and Innocent Ndikubwayo and Boris Shapiro},
  journal= {arXiv preprint arXiv:2001.09248},
  year   = {2020}
}

Comments

7 pages, 1 figure

R2 v1 2026-06-23T13:20:25.572Z