Research Article

On the self-convolution of generalized Fibonacci numbers

Published in: Quaestiones Mathematicae
Volume 46 , issue 5 , 2023 , pages: 841–854

DOI: 10.2989/16073606.2022.2043949

Author(s): Hacène Belbachir , Algeria , Toufik Djellal , Algeria , Jean-Gabriel Luque Normandie Université, Université de Rouen, France

Keywords: 05A15 , 05A10 , 11B37 , 11B39 , 05A19 , 34L30 , 47E05 , 47F05 , Fibonacci numbers , convolution , generating functions , classical invariant theory

Download full text Get new issue alerts

Abstract

We focus on a family of equalities pioneered by Zhang and generalized by Zao and Wang and hence by Mansour which involves self convolution of generalized Fibonacci numbers. We show that all these formulas are nicely stated in only one equation involving a bivariate ordinary generating function and we give also a formula for the coeﬃcients appearing in that context. As a consequence, we give the general forms for the equalities of Zhang, Zao-Wang and Mansour.

« A note on non-monogenity of number fields arised from sextic trinomials

On the group of self-homotopy equivalences of an almost formal space »