English

Orthogonal polynomials generated by a linear structure relation: Inverse problem

Classical Analysis and ODEs 2012-12-19 v1

Abstract

Let (Pn)n(P_n)_n and (Qn)n(Q_n)_n be two sequences of monic polynomials linked by a type structure relation such as Qn(x)+rnQn1(x)=Pn(x)+snPn1(x)+tnPn2(x)  , Q_{n}(x)+r_nQ_{n-1}(x)=P_{n}(x)+s_nP_{n-1}(x)+t_nP_{n-2}(x)\;, where (rn)n(r_n)_n, (sn)n(s_n)_n and (tn)n(t_n)_n are sequences of complex numbers. First, we state necessary and sufficient conditions on the parameters such that the above relation becomes non-degenerate when both sequences (Pn)n(P_n)_n and (Qn)n(Q_n)_n are orthogonal with respect to regular moment linear functionals u{\bf u} and v{\bf v}, respectively. Second, assuming that the above relation is non-degenerate and (Pn)n(P_n)_n is an orthogonal sequence, we obtain a characterization for the orthogonality of the sequence (Qn)n(Q_n)_n in terms of the coefficients of the polynomials Φ\Phi and Ψ\Psi which appear in the rational transformation (in the distributional sense) Φu=Ψv  .\Phi {\bf u}=\Psi {\bf v}\; . Some illustrative examples of the developed theory are presented.

Keywords

Cite

@article{arxiv.1212.4271,
  title  = {Orthogonal polynomials generated by a linear structure relation: Inverse problem},
  author = {M. Alfaro and A. Peña and J. Petronilho and M. L. Rezola},
  journal= {arXiv preprint arXiv:1212.4271},
  year   = {2012}
}
R2 v1 2026-06-21T22:56:26.148Z