English

Fibonacci polynomials

Combinatorics 2020-09-23 v1

Abstract

The Fibonacci polynomials {Fn(x)}n0\big\{F_n(x)\big\}_{n\ge 0} have been studied in multiple ways. In this paper we study them by means of the theory of Heaps of Viennot. In this setting our polynomials form a basis {Pn(x)}n0\big\{P_n(x)\big\}_{n\ge 0} with Pn(x)P_n(x) monic of degree nn. This given, we are forced to set Pn(x)=Fn+1(x)P_n(x)=F_{n+1}(x). The Heaps setting extends the Flajolet view of the classical theory of orthogonal polynomials given by a three term recursion. Thus with Heaps most of the identities for our Pn(x)sP_n(x)'s can be derived by combinatorial arguments. Using the present setting we derive a variety of new identities. We must mention that the theory of Heaps is presented here without restrictions. This is much more than needed to deal with the Fibonacci polynomials. We do this to convey a flavor of the power of Heaps. In the lecture notes there is a chapter dedicated to Heaps where most of its contents are dedicated to applications of the theory.

Keywords

Cite

@article{arxiv.2009.10213,
  title  = {Fibonacci polynomials},
  author = {A. Garsia and G. Ganzberger},
  journal= {arXiv preprint arXiv:2009.10213},
  year   = {2020}
}

Comments

18 pages

R2 v1 2026-06-23T18:42:16.224Z