ϕ(x)-Tribonnaci polynomial, numbers, and its sum

Rajiniganth Pandurangan; Suresh Kannan; Sabri T.M. Thabet; Miguel Vivas-Cortez; Imed Kedim

doi:10.22436/jmcs.037.01.03

ϕ(x)-Tribonnaci polynomial, numbers, and its sum

Rajiniganth Pandurangan
, Suresh Kannan
, Sabri T.M. Thabet
, Miguel Vivas-Cortez
, Imed Kedim

Mathematics

Research output: Contribution to journal › Article › peer-review

1 Scopus citations

Abstract

This study presents a general third-order nabla difference operator that allows us to get ϕ(x)-Tribonacci sequences, Tri-bonacci numbers, and their sum using the coefficients of different trigonometric functions and their inverse. In this section, we examined the numerical solutions and C^∗-solutions of the ϕ(x)-Tribonacci sequences for different functions. In addition, some interesting conclusions and theorems are obtained for the sum of the terms of the Tribonacci sequence. Also, we offer appropriate examples to show how to use MATLAB to demonstrate our results.

Original language	English
Pages (from-to)	32-44
Number of pages	13
Journal	Journal of Mathematics and Computer Science
Volume	37
Issue number	1
DOIs	https://doi.org/10.22436/jmcs.037.01.03
State	Published - 2025

Keywords

C-solution
Generalized nabla difference operator with trigonometric coefficients
generalized Tribonacci sequence
N-solution
Tribonacci summation

Access to Document

10.22436/jmcs.037.01.03

Cite this

@article{66f5ea8bc15e46119dcf2b4b0d7fa851,

title = "ϕ(x)-Tribonnaci polynomial, numbers, and its sum",

abstract = "This study presents a general third-order nabla difference operator that allows us to get ϕ(x)-Tribonacci sequences, Tri-bonacci numbers, and their sum using the coefficients of different trigonometric functions and their inverse. In this section, we examined the numerical solutions and C∗-solutions of the ϕ(x)-Tribonacci sequences for different functions. In addition, some interesting conclusions and theorems are obtained for the sum of the terms of the Tribonacci sequence. Also, we offer appropriate examples to show how to use MATLAB to demonstrate our results.",

keywords = "C-solution, Generalized nabla difference operator with trigonometric coefficients, generalized Tribonacci sequence, N-solution, Tribonacci summation",

author = "Rajiniganth Pandurangan and Suresh Kannan and Thabet, \{Sabri T.M.\} and Miguel Vivas-Cortez and Imed Kedim",

year = "2025",

doi = "10.22436/jmcs.037.01.03",

language = "English",

volume = "37",

pages = "32--44",

journal = "Journal of Mathematics and Computer Science",

issn = "2008-949X",

publisher = "International Scientific Research Publications",

number = "1",

}

TY - JOUR

T1 - ϕ(x)-Tribonnaci polynomial, numbers, and its sum

AU - Pandurangan, Rajiniganth

AU - Kannan, Suresh

AU - Thabet, Sabri T.M.

AU - Vivas-Cortez, Miguel

AU - Kedim, Imed

PY - 2025

Y1 - 2025

N2 - This study presents a general third-order nabla difference operator that allows us to get ϕ(x)-Tribonacci sequences, Tri-bonacci numbers, and their sum using the coefficients of different trigonometric functions and their inverse. In this section, we examined the numerical solutions and C∗-solutions of the ϕ(x)-Tribonacci sequences for different functions. In addition, some interesting conclusions and theorems are obtained for the sum of the terms of the Tribonacci sequence. Also, we offer appropriate examples to show how to use MATLAB to demonstrate our results.

AB - This study presents a general third-order nabla difference operator that allows us to get ϕ(x)-Tribonacci sequences, Tri-bonacci numbers, and their sum using the coefficients of different trigonometric functions and their inverse. In this section, we examined the numerical solutions and C∗-solutions of the ϕ(x)-Tribonacci sequences for different functions. In addition, some interesting conclusions and theorems are obtained for the sum of the terms of the Tribonacci sequence. Also, we offer appropriate examples to show how to use MATLAB to demonstrate our results.

KW - C-solution

KW - Generalized nabla difference operator with trigonometric coefficients

KW - generalized Tribonacci sequence

KW - N-solution

KW - Tribonacci summation

UR - https://www.scopus.com/pages/publications/85205263960

U2 - 10.22436/jmcs.037.01.03

DO - 10.22436/jmcs.037.01.03

M3 - Article

AN - SCOPUS:85205263960

SN - 2008-949X

VL - 37

SP - 32

EP - 44

JO - Journal of Mathematics and Computer Science

JF - Journal of Mathematics and Computer Science

IS - 1

ER -

ϕ(x)-Tribonnaci polynomial, numbers, and its sum

Abstract

Keywords

Access to Document

Other files and links

Fingerprint

Cite this