The Symmetries of (𝒌𝒌:𝜶𝜶𝟏𝟏,𝜶𝜶𝟐𝟐,…,𝜶𝜶𝒌𝒌)-step Fibonacci Functions

Q4 Multidisciplinary

ASM Science Journal Pub Date : 2023-11-15 DOI:10.32802/asmscj.2023.1392

Yanapat Tongron, Kanyaphak Paikhlaew, Supattra Kerdmongkon, Numsook Nawapongpipat

{"title":"The Symmetries of (𝒌𝒌:𝜶𝜶𝟏𝟏,𝜶𝜶𝟐𝟐,…,𝜶𝜶𝒌𝒌)-step Fibonacci Functions","authors":"Yanapat Tongron, Kanyaphak Paikhlaew, Supattra Kerdmongkon, Numsook Nawapongpipat","doi":"10.32802/asmscj.2023.1392","DOIUrl":null,"url":null,"abstract":"It is well known that the Fibonacci sequence (𝐹𝑛) is denoted by 𝐹0=0, 𝐹1=1 and 𝐹𝑛=𝐹𝑛−1+𝐹𝑛−2, while the Lucas sequence (𝐿𝑛) is denoted by 𝐿0=2, 𝐿1=1 and 𝐿𝑛=𝐿𝑛−1+𝐿𝑛−2. There are several studies showing relations between these two sequences. An interesting generalisation of both the sequences is a Fibonacci function 𝑓:ℝ→ℝ defined by 𝑓(𝑥+2)=𝑓(𝑥+1)+𝑓(𝑥) for any real number 𝑥 (Elmore, 1967). Research about periods of Fibonacci numbers modulo 𝑚 (Jameson, 2018) results in a contribution on the existence of primitive period of a Fibonacci function 𝑓:ℤ→ℤ modulo 𝑚 (Thongngam & Chinram, 2019). Recently, a 𝑘-step Fibonacci function 𝑓:ℤ→ℤ denoted by 𝑓(𝑛+𝑘)=𝑓(𝑛+𝑘−1)+𝑓(𝑛+𝑘−2)+⋯+𝑓(𝑛) for any integer 𝑛 and 𝑘≥2 (which is a generalisation of a Fibonacci function 𝑓:ℤ→ℤ) is introduced and the existence of primitive period of this function modulo 𝑚 is established (Tongron & Kerdmongkon, 2022). In this work, let 𝑘 be an integer ≥2. For nonnegative integers 𝛼1,𝛼2,…,𝛼𝑘 and 𝛼1≠0, a (𝑘:𝛼1,𝛼2,…,𝛼𝑘)-step Fibonacci function 𝑓:ℤ→ℤ is defined by 𝑓(𝑛)=𝑓(𝑛−𝛼1)+𝑓(𝑛−𝛼1−𝛼2)+⋯+𝑓(𝑛−𝛼1−𝛼2−⋯−𝛼𝑘) for any integer 𝑛. In fact, a 𝑘-step Fibonacci function is a special case of a (𝑘:𝛼1,𝛼2,…,𝛼𝑘)-step Fibonacci function. We present the existence of primitive period of this function modulo 𝑚 and show that certain (𝑘:𝛼1,𝛼2,…,𝛼𝑘)-step Fibonacci functions are symmetric-like.","PeriodicalId":38804,"journal":{"name":"ASM Science Journal","volume":"1 12","pages":"0"},"PeriodicalIF":0.0000,"publicationDate":"2023-11-15","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"ASM Science Journal","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.32802/asmscj.2023.1392","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q4","JCRName":"Multidisciplinary","Score":null,"Total":0}

引用次数: 0

Abstract

It is well known that the Fibonacci sequence (𝐹𝑛) is denoted by 𝐹0=0, 𝐹1=1 and 𝐹𝑛=𝐹𝑛−1+𝐹𝑛−2, while the Lucas sequence (𝐿𝑛) is denoted by 𝐿0=2, 𝐿1=1 and 𝐿𝑛=𝐿𝑛−1+𝐿𝑛−2. There are several studies showing relations between these two sequences. An interesting generalisation of both the sequences is a Fibonacci function 𝑓:ℝ→ℝ defined by 𝑓(𝑥+2)=𝑓(𝑥+1)+𝑓(𝑥) for any real number 𝑥 (Elmore, 1967). Research about periods of Fibonacci numbers modulo 𝑚 (Jameson, 2018) results in a contribution on the existence of primitive period of a Fibonacci function 𝑓:ℤ→ℤ modulo 𝑚 (Thongngam & Chinram, 2019). Recently, a 𝑘-step Fibonacci function 𝑓:ℤ→ℤ denoted by 𝑓(𝑛+𝑘)=𝑓(𝑛+𝑘−1)+𝑓(𝑛+𝑘−2)+⋯+𝑓(𝑛) for any integer 𝑛 and 𝑘≥2 (which is a generalisation of a Fibonacci function 𝑓:ℤ→ℤ) is introduced and the existence of primitive period of this function modulo 𝑚 is established (Tongron & Kerdmongkon, 2022). In this work, let 𝑘 be an integer ≥2. For nonnegative integers 𝛼1,𝛼2,…,𝛼𝑘 and 𝛼1≠0, a (𝑘:𝛼1,𝛼2,…,𝛼𝑘)-step Fibonacci function 𝑓:ℤ→ℤ is defined by 𝑓(𝑛)=𝑓(𝑛−𝛼1)+𝑓(𝑛−𝛼1−𝛼2)+⋯+𝑓(𝑛−𝛼1−𝛼2−⋯−𝛼𝑘) for any integer 𝑛. In fact, a 𝑘-step Fibonacci function is a special case of a (𝑘:𝛼1,𝛼2,…,𝛼𝑘)-step Fibonacci function. We present the existence of primitive period of this function modulo 𝑚 and show that certain (𝑘:𝛼1,𝛼2,…,𝛼𝑘)-step Fibonacci functions are symmetric-like.

查看原文本刊更多论文

的对称(𝒌𝒌:𝜶𝜶𝟏𝟏,𝜶𝜶𝟐𝟐,…,𝜶𝜶𝒌𝒌)一步一步Fibonacci函数

众所周知,斐波那契序列(𝐹𝑛)用𝐹0 = 0,𝐹1 = 1,𝐹𝑛=𝐹𝑛−1 +𝐹𝑛−2,而卢卡斯序列(𝐿𝑛)用𝐿0 = 2,𝐿1 = 1,𝐿𝑛=𝐿𝑛−1 +𝐿𝑛−2。有几项研究显示了这两个序列之间的关系。这两个序列的一个有趣的推广是一个Fibonacci函数𝑓:对于任何实数，对于𝑓(s1 +2)=𝑓(s1 +1)+𝑓(s1)定义的→1 (s1) (Elmore, 1967)。关于斐波那契数模的周期𝑚(Jameson, 2018)的研究结果对斐波那契函数的原始周期的存在性有贡献𝑓:0→0模𝑚(Thongngam &Chinram, 2019)。最近,一位𝑘-step Fibonacci函数𝑓:ℤ→ℤ用𝑓(𝑛+𝑘)=𝑓(𝑛+𝑘−1)+𝑓(𝑛+𝑘−2)+⋯+𝑓(𝑛)任何整数𝑛𝑘≥2(这是一个概括的Fibonacci函数𝑓:ℤ→ℤ)介绍和原始时期的存在这个函数建立模𝑚(Tongron,Kerdmongkon, 2022)。在本文中，设𝑘为≥2的整数。为非负整数𝛼1、𝛼2…,𝛼𝑘和𝛼1≠0,一个(𝑘:𝛼1𝛼2,…,𝛼𝑘)一步一步Fibonacci函数𝑓:ℤ→ℤ被定义为𝑓(𝑛)=𝑓(𝑛−𝛼1)+𝑓(𝑛−𝛼1−𝛼2)+⋯+𝑓(𝑛−𝛼1−𝛼2−⋯−𝛼𝑘)对于任何整数𝑛。事实上，𝑘-step斐波那契函数是(𝑘:𝛼1，𝛼2，…，𝑘)步斐波那契函数的一种特殊情况。我们给出了该函数模𝑚的原始周期的存在性，并证明了某些(𝑘:𝛼1，𝛼2，…，𝑘)步Fibonacci函数是类对称的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

求助全文

约1分钟内获得全文求助全文

来源期刊

ASM Science Journal Multidisciplinary-Multidisciplinary

CiteScore

0.60

自引率

0.00%

发文量

期刊介绍： The ASM Science Journal publishes advancements in the broad fields of medical, engineering, earth, mathematical, physical, chemical and agricultural sciences as well as ICT. Scientific articles published will be on the basis of originality, importance and significant contribution to science, scientific research and the public. Scientific articles published will be on the basis of originality, importance and significant contribution to science, scientific research and the public. Scientists who subscribe to the fields listed above will be the source of papers to the journal. All articles will be reviewed by at least two experts in that particular field.