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Fibonacci polynomials are generalizations of Fibonacci numbers, so it is natural to consider polynomial versions of the various results for Fibonacci numbers. According to Hong, Pongsriiam, Bulawa, and Lee, the generating function of the…

Number Theory · Mathematics 2023-07-18 Yuji Tsuno

In this paper, for any positive integer $\ell\geq2,$ we define $\ell$-generalized Fibonacci zeta function. We then study its analytic continuation to the whole complex plane $\mathbb{C}.$ Further, we compute a possible list of singularities…

Number Theory · Mathematics 2023-05-26 Dilip Kumar Sahoo , Nabin Kumar Meher

We introduce an ${\rm S}_d$-analogue of the hypergeometric Bernoulli polynomials and study their properties. To achieve this goal, we introduce a calculus defined on the simplicial $d$-polytopic numbers. Two definitions of the ${\rm…

Combinatorics · Mathematics 2026-04-01 Ronald Orozco

It is demonstrated how an explicit expression of the (partial) sum of Tetranacci numbers can be found and proved using generating functions and the Hadamard product. We also provide a Binet-type formula for generalized Fibonacci numbers, by…

Number Theory · Mathematics 2020-01-22 Helmut Prodinger , Sarah J. Selkirk

In this paper, we consider infinite sums derived from the reciprocals of the generalized Fibonacci numbers. We obtain some new and interesting identities for the generalized Fibonacci numbers.

Number Theory · Mathematics 2015-03-04 Pingzhi Yuan , Zilong He , Junyi Zhuo

We introduce a family of Dirichlet series associated to real quadratic number fields that generalize the ordinary Fibonacci zeta function $\sum F(n)^{-s}$, where $F(n)$ denotes the $n$th Fibonacci number. We then give three different…

Number Theory · Mathematics 2025-02-12 Eran Assaf , Chan Ieong Kuan , David Lowry-Duda , Alexander Walker

In this note, we present a simple summation formula for $k$-bonacci numbers. The derivation consists in obtaining the generating function of such numbers, and noting that its evaluation at a particular value yields a formula generalizing a…

Number Theory · Mathematics 2022-11-02 Jean-Christophe Pain

In part 1 of this paper some linear weighted generalized Fibonacci number summation identities were derived using the fact that the Fibonacci number is the residue of a rational function. In this part, using the same method, some quadratic…

Number Theory · Mathematics 2021-07-14 M. J. Kronenburg

The Fibonacci number is the residue of a rational function, from which follows that Fibonacci number summation identities can be derived with the integral representation method, a method also used to derive combinatorial identities. A…

Number Theory · Mathematics 2019-12-10 M. J. Kronenburg

The Fibonacci polynomials are defined recursively as $f_{n}(x)=xf_{n-1}(x)+f_{n-2}(x)$, where $f_0(x) = 0$ and $f_1(x)= 1$. We generalize these polynomials to an arbitrary number of variables with the $r$-Fibonacci polynomial. We extend…

Combinatorics · Mathematics 2023-09-18 Sejin Park , Etienne Phillips , Peikai Qi , Ilir Ziba , Zhan Zhan

We consider a class of generalized binomials emerging in fractional calculus. After establishing some general properties, we focus on a particular yet relevant case, for which we provide several ready-for-use combinatorial identities,…

Combinatorics · Mathematics 2020-10-13 Mirko D'Ovidio , Anna Chiara Lai , Paola Loreti

The focus of this paper is the study of generalized Fibonacci polynomials and Fibonomial coefficients. The former are polynomials {n} in variables s and t given by {0} = 0, {1} = 1, and {n} = s{n-1}+t{n-2} for n ge 2. The latter are defined…

Combinatorics · Mathematics 2013-07-30 Tewodros Amdeberhan , Xi Chen , Victor H. Moll , Bruce E. Sagan

We define the interpolated polynomial multiple zeta values as a generalization of all of multiple zeta values, multiple zeta-star values, interpolated multiple zeta values, symmetric multiple zeta values, and polynomial multiple zeta…

Number Theory · Mathematics 2022-11-02 Minoru Hirose , Hideki Murahara , Shingo Saito

We derive new infinite series involving Fibonacci numbers and Riemann zeta numbers. The calculations are facilitated by evaluating linear combinations of polygamma functions of the same order at certain arguments.

Number Theory · Mathematics 2021-03-18 Kunle Adegoke , Sourangshu Ghosh

We study reciprocity formulas for Dedekind sums associated with absolutely continuous functions, extending the classical Dedekind-Rademacher reciprocity formula. In particular, we treat the case of periodic Bernoulli functions. Our approach…

Number Theory · Mathematics 2025-12-24 Yerko Torres-Nova

We define generalized bivariate polynomials, from which upon specification of initial conditions the bivariate Fibonacci and Lucas polynomials are obtained. Using essentially a matrix approach we derive identities and inequalities that in…

Combinatorics · Mathematics 2007-05-23 Mario Catalani

The main objective of this paper is to introduce the modified q-Genocchi polynomials and to define their generating function. In the paper, we show new relations, which are explicit formula, derivative formula, multiplication formula, and…

Number Theory · Mathematics 2013-11-26 Serkan Araci , Armen Bagdasaryan , Erkan Agyuz , Mehmet Acikgoz

In this paper, we investigated properties of Tribonacci-Lucas polynomials which generalized Tribonacci-Lucas numbers. From this generalization, we also obtain some new algebraic properties on these numbers and polynomials as Binet formula,…

Number Theory · Mathematics 2014-09-15 Hasan Kose , Nazmiye Yilmaz , Necati Taskara

In this paper we consider particular generalized compositions of a natural number with a given number of parts. Its number is a weighted polynomial coefficient. The number of all generalized compositions of a natural number is a weighted…

Combinatorics · Mathematics 2010-09-17 Milan Janjic

An overlooked formula of E. Lucas for the generalized Bernoulli numbers is proved using generating functions. This is then used to provide a new proof and a new form of a sum involving classical Bernoulli numbers studied by K. Dilcher. The…

Number Theory · Mathematics 2014-02-14 V. H. Moll , C. Vignat
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