Abstract

In this article, we define the Euler–Fibonacci numbers, polynomials and their exponential generating function. Several relations are established involving the Bernoulli F-polynomials, the Euler–Fibonacci numbers and the Euler–Fibonacci polynomials. A new exponential generating function is obtained for the Bernoulli F-polynomials. Also, we describe the Fibo–Bernoulli matrix, the Fibo–Euler matrix and the Fibo–Euler polynomial matrix by using the Bernoulli F-polynomials, the Euler–Fibonacci numbers and the Euler–Fibonacci polynomials, respectively. Factorization of the Fibo–Bernoulli matrix is obtained by using the generalized Fibo–Pascal matrix and a special matrix whose entries are the Bernoulli–Fibonacci numbers. The inverse of the Fibo–Bernoulli matrix is also found.

Details

Title
Bernoulli F-polynomials and Fibo–Bernoulli matrices
Author
Kuş, Semra 1 ; Tuglu, Naim 2   VIAFID ORCID Logo  ; Kim, Taekyun 3 

 Mucur Vocational High School, Kırşehir Ahi Evran University, Kırşehir, Turkey 
 Department of Mathematics, Gazi University, Ankara, Turkey 
 Department of Mathematics, Kwangwoon University, Seoul, Republic of Korea 
Pages
1-16
Publication year
2019
Publication date
Apr 2019
Publisher
Springer Nature B.V.
ISSN
1687-1839
e-ISSN
1687-1847
Source type
Scholarly Journal
Language of publication
English
DOI
https://doi.org/10.1186/s13662-019-2084-6
ProQuest document ID
2211001775
Copyright
Advances in Difference Equations is a copyright of Springer, (2019). All Rights Reserved., © 2019. This work is published under http://creativecommons.org/licenses/by/4.0/ (the “License”). Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the terms of the License.