Research

11 pages, 257 KiB

Open AccessArticle

Symmetric Spaces Approach to Various Cyclic Contractions and Application to Probabilistic Spaces

by Savita Rathee, Priyanka Gupta, Vishnu Narayan Mishra, Thabet Abdeljawad and Nabil Mlaiki

Symmetry 2021, 13(9), 1704; https://doi.org/10.3390/sym13091704 - 15 Sep 2021

Viewed by 1472

This paper aims to prove fixed point results for cyclic compatible contraction and Hardy–Rogers cyclic contraction in symmetric spaces. Our results generalize the results of Kumari and Panthi

(2016)

proved for cyclic compatible contraction and modified Hardy–Rogers cyclic contraction in the [...] Read more.

This paper aims to prove fixed point results for cyclic compatible contraction and Hardy–Rogers cyclic contraction in symmetric spaces. Our results generalize the results of Kumari and Panthi

(2016)

proved for cyclic compatible contraction and modified Hardy–Rogers cyclic contraction in the generating space of a b-quasi metric family and b-dislocated metric family. After that, as an application, we prove a fixed point result in symmetric pre-probabilistic metric spaces (PPM-spaces). Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

13 pages, 311 KiB

Open AccessArticle

New Families of Special Polynomial Identities Based upon Combinatorial Sums Related to p-Adic Integrals

by Yilmaz Simsek

Symmetry 2021, 13(8), 1484; https://doi.org/10.3390/sym13081484 - 13 Aug 2021

Cited by 1 | Viewed by 1223

Abstract

The aim of this paper is to study and investigate generating-type functions, which have been recently constructed by the author, with the aid of the Euler’s identity, combinatorial sums, and p-adic integrals. Using these generating functions with their functional equation, we derive [...] Read more.

The aim of this paper is to study and investigate generating-type functions, which have been recently constructed by the author, with the aid of the Euler’s identity, combinatorial sums, and p-adic integrals. Using these generating functions with their functional equation, we derive various interesting combinatorial sums and identities including new families of numbers and polynomials, the Bernoulli numbers, the Euler numbers, the Stirling numbers, the Daehee numbers, the Changhee numbers, and other numbers and polynomials. Moreover, we present some revealing remarks and comments on the results of this paper. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

22 pages, 338 KiB

Open AccessArticle

Monitoring Persistence Change in Heavy-Tailed Observations

by Dan Wang

Symmetry 2021, 13(6), 936; https://doi.org/10.3390/sym13060936 - 25 May 2021

Cited by 3 | Viewed by 1349

Abstract

In this paper, a ratio test based on bootstrap approximation is proposed to detect the persistence change in heavy-tailed observations. This paper focuses on the symmetry testing problems of

I (1)

-to-

I (0)

and

I (0)

[...] Read more.

In this paper, a ratio test based on bootstrap approximation is proposed to detect the persistence change in heavy-tailed observations. This paper focuses on the symmetry testing problems of

I (1)

-to-

I (0)

and

I (0)

-to-

I (1)

. On the basis of residual CUSUM, the test statistic is constructed in a ratio form. I prove the null distribution of the test statistic. The consistency under alternative hypothesis is also discussed. However, the null distribution of the test statistic contains an unknown tail index. To address this challenge, I present a bootstrap approximation method for determining the rejection region of this test. Simulation studies of artificial data are conducted to assess the finite sample performance, which shows that our method is better than the kernel method in all listed cases. The analysis of real data also demonstrates the excellent performance of this method. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

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16 pages, 319 KiB

Open AccessArticle

Some Identities of the Degenerate Higher Order Derangement Polynomials and Numbers

by Hye Kyung Kim

Symmetry 2021, 13(2), 176; https://doi.org/10.3390/sym13020176 - 22 Jan 2021

Cited by 1 | Viewed by 1099

Abstract

Recently, Kim-Kim (J. Math. Anal. Appl. (2021), Vol. 493(1), 124521) introduced the

λ

-Sheffer sequence and the degenerate Sheffer sequence. In addition, Kim et al. (arXiv:2011.08535v1 17 November 2020) studied the degenerate derangement polynomials and numbers, and investigated some properties of those polynomials [...] Read more.

Recently, Kim-Kim (J. Math. Anal. Appl. (2021), Vol. 493(1), 124521) introduced the

λ

-Sheffer sequence and the degenerate Sheffer sequence. In addition, Kim et al. (arXiv:2011.08535v1 17 November 2020) studied the degenerate derangement polynomials and numbers, and investigated some properties of those polynomials without using degenerate umbral calculus. In this paper, the y the degenerate derangement polynomials of order s (

s \in N

) and give a combinatorial meaning about higher order derangement numbers. In addition, the author gives some interesting identities related to the degenerate derangement polynomials of order s and special polynomials and numbers by using degenerate Sheffer sequences, and at the same time derive the inversion formulas of these identities. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

12 pages, 274 KiB

Open AccessArticle

On the Recurrence Properties of Narayana’s Cows Sequence

by Xin Lin

Symmetry 2021, 13(1), 149; https://doi.org/10.3390/sym13010149 - 17 Jan 2021

Cited by 2 | Viewed by 4384

Abstract

In this paper, we consider the recurrence properties of two generalized forms of Narayana’s cows sequence. On the one hand, we study Narayana’s cows sequence at negative indices and express it as the linear combination of the sequence at positive indices. On the [...] Read more.

In this paper, we consider the recurrence properties of two generalized forms of Narayana’s cows sequence. On the one hand, we study Narayana’s cows sequence at negative indices and express it as the linear combination of the sequence at positive indices. On the other hand, we study the convolved Narayana number and obtain a computation formula for it. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

15 pages, 780 KiB

Open AccessArticle

Mean Value of the General Dedekind Sums over Interval \({[1,\frac{q}{p})}\)

by Lei Liu and Zhefeng Xu

Symmetry 2020, 12(12), 2079; https://doi.org/10.3390/sym12122079 - 15 Dec 2020

Viewed by 1375

Abstract

Let

q > 2

be a prime, p be a given prime with

p < q

. The main purpose of this paper is using transforms, the hybrid mean value of Dirichlet L-functions with character sums and the related properties of character [...] Read more.

Let

q > 2

be a prime, p be a given prime with

p < q

. The main purpose of this paper is using transforms, the hybrid mean value of Dirichlet L-functions with character sums and the related properties of character sums to study the mean value of the general Dedekind sums over interval

[1, \frac{q}{p})

, and give some interesting asymptotic formulae. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

11 pages, 233 KiB

Open AccessArticle

A Note on the Degenerate Poly-Cauchy Polynomials and Numbers of the Second Kind

by Hye Kyung Kim and Lee-Chae Jang

Symmetry 2020, 12(7), 1066; https://doi.org/10.3390/sym12071066 - 28 Jun 2020

Cited by 1 | Viewed by 1403

Abstract

In this paper, we consider the degenerate Cauchy numbers of the second kind were defined by Kim (2015). By using modified polyexponential functions, first introduced by Kim-Kim (2019), we define the degenerate poly-Cauchy polynomials and numbers of the second kind and investigate some [...] Read more.

In this paper, we consider the degenerate Cauchy numbers of the second kind were defined by Kim (2015). By using modified polyexponential functions, first introduced by Kim-Kim (2019), we define the degenerate poly-Cauchy polynomials and numbers of the second kind and investigate some identities and relationship between various polynomials and the degenerate poly-Cauchy polynomials of the second kind. Using this as a basis of further research, we define the degenerate unipoly-Cauchy polynomials of the second kind and illustrate their important identities. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

15 pages, 244 KiB

Open AccessFeature PaperEditor’s ChoiceArticle

Type 2 Degenerate Poly-Euler Polynomials

by Dae Sik Lee, Hye Kyung Kim and Lee-Chae Jang

Symmetry 2020, 12(6), 1011; https://doi.org/10.3390/sym12061011 - 15 Jun 2020

Cited by 10 | Viewed by 2173

Abstract

In recent years, many mathematicians have studied the degenerate versions of many special polynomials and numbers. The polyexponential functions were introduced by Hardy and rediscovered by Kim, as inverses to the polylogarithms functions. The paper is divided two parts. First, we introduce a [...] Read more.

In recent years, many mathematicians have studied the degenerate versions of many special polynomials and numbers. The polyexponential functions were introduced by Hardy and rediscovered by Kim, as inverses to the polylogarithms functions. The paper is divided two parts. First, we introduce a new type of the type 2 poly-Euler polynomials and numbers constructed from the modified polyexponential function, the so-called type 2 poly-Euler polynomials and numbers. We show various expressions and identities for these polynomials and numbers. Some of them involving the (poly) Euler polynomials and another special numbers and polynomials such as (poly) Bernoulli polynomials, the Stirling numbers of the first kind, the Stirling numbers of the second kind, etc. In final section, we introduce a new type of the type 2 degenerate poly-Euler polynomials and the numbers defined in the previous section. We give explicit expressions and identities involving those polynomials in a similar direction to the previous section. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

16 pages, 284 KiB

Open AccessArticle

Some Relations of Two Type 2 Polynomials and Discrete Harmonic Numbers and Polynomials

by Taekyun Kim and Dae San Kim

Symmetry 2020, 12(6), 905; https://doi.org/10.3390/sym12060905 - 01 Jun 2020

Cited by 14 | Viewed by 1613

Abstract

Harmonic numbers appear, for example, in many expressions involving Riemann zeta functions. Here, among other things, we introduce and study discrete versions of those numbers, namely the discrete harmonic numbers. The aim of this paper is twofold. The first is to find several [...] Read more.

Harmonic numbers appear, for example, in many expressions involving Riemann zeta functions. Here, among other things, we introduce and study discrete versions of those numbers, namely the discrete harmonic numbers. The aim of this paper is twofold. The first is to find several relations between the Type 2 higher-order degenerate Euler polynomials and the Type 2 high-order Changhee polynomials in connection with the degenerate Stirling numbers of both kinds and Jindalrae–Stirling numbers of both kinds. The second is to define the discrete harmonic numbers and some related polynomials and numbers, and to derive their explicit expressions and an identity. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

9 pages, 269 KiB

Open AccessArticle

On the Chebyshev Polynomials and Some of Their Reciprocal Sums

by Wenpeng Zhang and Di Han

Symmetry 2020, 12(5), 704; https://doi.org/10.3390/sym12050704 - 02 May 2020

Cited by 4 | Viewed by 2284

Abstract

In this paper, we utilize the mathematical induction, the properties of symmetric polynomial sequences and Chebyshev polynomials to study the calculating problems of a certain reciprocal sums of Chebyshev polynomials, and give two interesting identities for them. These formulae not only reveal the [...] Read more.

In this paper, we utilize the mathematical induction, the properties of symmetric polynomial sequences and Chebyshev polynomials to study the calculating problems of a certain reciprocal sums of Chebyshev polynomials, and give two interesting identities for them. These formulae not only reveal the close relationship between the trigonometric function and the Riemann

ζ

-function, but also generalized some existing results. At the same time, an error in an existing reference is corrected. Full article

(This article belongs to the Special Issue The 33rd International Conference of The Jangjeon Mathematical Society (ICJMS2020) will be held at Hasanuddin University, Makassar, Indonesia)

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