Your search keyword '"Dae San Kim"' showing total 16 results

1. Studies in Sums of Finite Products of the Second, Third, and Fourth Kind Chebyshev Polynomials

Author

Taekyun Kim, Dae San Kim, Hyunseok Lee, and Jongkyum Kwon

Subjects

sums of finite products, chebyshev polynomials of the second, third and fourth kinds, terminating hypergeometric functions, Mathematics, QA1-939

Abstract

In this paper, we consider three sums of finite products of Chebyshev polynomials of two different kinds, namely sums of finite products of the second and third kind Chebyshev polynomials, those of the second and fourth kind Chebyshev polynomials, and those of the third and fourth kind Chebyshev polynomials. As a generalization of the classical linearization problem, we represent each of such sums of finite products as linear combinations of Hermite, generalized Laguerre, Legendre, Gegenbauer, and Jacobi polynomials. These are done by explicit computations and the coefficients involve terminating hypergeometric functions 2 F 1 , 1 F 1 , 2 F 2 , and 4 F 3 .

Published

2020

2. Some Identities of Degenerate Bell Polynomials

Author

Taekyun Kim, Dae San Kim, Han Young Kim, and Jongkyum Kwon

Subjects

new type degenerate bell polynomials, degenerate bernoulli polynomials, degenerate euler polynomials, degenerate cauchy polynomials, Mathematics, QA1-939

Abstract

The new type degenerate of Bell polynomials and numbers were recently introduced, which are a degenerate version of Bell polynomials and numbers and are different from the previously introduced partially degenerate Bell polynomials and numbers. Several expressions and identities on those polynomials and numbers were obtained. In this paper, as a further investigation of the new type degenerate Bell polynomials, we derive several identities involving those degenerate Bell polynomials, Stirling numbers of the second kind and Carlitz’s degenerate Bernoulli or degenerate Euler polynomials. In addition, we obtain an identity connecting the degenerate Bell polynomials, Cauchy polynomials, Bernoulli numbers, Stirling numbers of the second kind and degenerate Stirling numbers of the second kind.

Published

2020

3. A Note on Some Identities of New Type Degenerate Bell Polynomials

Author

Taekyun Kim, Dae San Kim, Hyunseok Lee, and Jongkyum Kwon

Subjects

bell polynomials, partially degenerate bell polynomials, new type degenerate bell polynomials, Mathematics, QA1-939

Abstract

Recently, the partially degenerate Bell polynomials and numbers, which are a degenerate version of Bell polynomials and numbers, were introduced. In this paper, we consider the new type degenerate Bell polynomials and numbers, and obtain several expressions and identities on those polynomials and numbers. In more detail, we obtain an expression involving the Stirling numbers of the second kind and the generalized falling factorial sequences, Dobinski type formulas, an expression connected with the Stirling numbers of the first and second kinds, and an expression involving the Stirling polynomials of the second kind.

Published

2019

4. A Note on Type 2 Degenerate q-Euler Polynomials

Author

Taekyun Kim, Dae San Kim, Han Young Kim, and Sung-Soo Pyo

Subjects

type 2 degenerate q-Euler polynomials, fermionic p-adic q-integral, Mathematics, QA1-939

Abstract

Recently, type 2 degenerate Euler polynomials and type 2 q-Euler polynomials were studied, respectively, as degenerate versions of the type 2 Euler polynomials as well as a q-analog of the type 2 Euler polynomials. In this paper, we consider the type 2 degenerate q-Euler polynomials, which are derived from the fermionic p-adic q-integrals on Z p , and investigate some properties and identities related to these polynomials and numbers. In detail, we give for these polynomials several expressions, generating function, relations with type 2 q-Euler polynomials and the expression corresponding to the representation of alternating integer power sums in terms of Euler polynomials. One novelty about this paper is that the type 2 degenerate q-Euler polynomials arise naturally by means of the fermionic p-adic q-integrals so that it is possible to easily find some identities of symmetry for those polynomials and numbers, as were done previously.

Published

2019

5. Representing by Orthogonal Polynomials for Sums of Finite Products of Fubini Polynomials

Author

Dae San Kim, Dmitry V. Dolgy, Dojin Kim, and Taekyun Kim

Subjects

fubini polynomials, orthogonal polynomials, Chebyshev polynomials, Hermite polynomials, extended laguerre polynomials, Legendre polynomials, Gegenbauer polynomials, Jabcobi polynomials, Mathematics, QA1-939

Abstract

In the classical connection problem, it is dealt with determining the coefficients in the expansion of the product of two polynomials with regard to any given sequence of polynomials. As a generalization of this problem, we will consider sums of finite products of Fubini polynomials and represent these in terms of orthogonal polynomials. Here, the involved orthogonal polynomials are Chebyshev polynomials of the first, second, third and fourth kinds, and Hermite, extended Laguerre, Legendre, Gegenbauer, and Jabcobi polynomials. These representations are obtained by explicit computations.

Published

2019

6. Some Identities on Degenerate Bernstein and Degenerate Euler Polynomials

Author

Taekyun Kim and Dae San Kim

Subjects

degenerate Bernstein polynomials, degenerate Bernstein operators, degenerate Euler polynomials, Mathematics, QA1-939

Abstract

In recent years, intensive studies on degenerate versions of various special numbers and polynomials have been done by means of generating functions, combinatorial methods, umbral calculus, p-adic analysis and differential equations. The degenerate Bernstein polynomials and operators were recently introduced as degenerate versions of the classical Bernstein polynomials and operators. Herein, we firstly derive some of their basic properties. Secondly, we explore some properties of the degenerate Euler numbers and polynomials and also their relations with the degenerate Bernstein polynomials.

Published

2019

7. Representing Sums of Finite Products of Chebyshev Polynomials of the First Kind and Lucas Polynomials by Chebyshev Polynomials

Author

Taekyun Kim, Dae San Kim, Dmitry V. Dolgy, and Jongkyum Kwon

Subjects

sums of finite products, Chebyshev polynomials of the first kind, Lucas polynomials, Chebyshev polynomials of all kinds, Mathematics, QA1-939

Abstract

In this paper, we study sums of finite products of Chebyshev polynomials of the first kind and Lucas polynomials and represent each of them in terms of Chebyshev polynomials of all kinds. Here, the coefficients involve terminating hypergeometric functions 2 F 1 and these representations are obtained by explicit computations.

Published

2018

8. Fourier Series for Functions Related to Chebyshev Polynomials of the First Kind and Lucas Polynomials

Author

Taekyun Kim, Dae San Kim, Lee-Chae Jang, and Gwan-Woo Jang

Subjects

Fourier series, Chebyshev polynomials of the first kind, Lucas polynomials, Bernoulli polynomials, Mathematics, QA1-939

Abstract

In this paper, we derive Fourier series expansions for functions related to sums of finite products of Chebyshev polynomials of the first kind and of Lucas polynomials. From the Fourier series expansions, we are able to express those two kinds of sums of finite products of polynomials as linear combinations of Bernoulli polynomials.

Published

2018

9. Expressing Sums of Finite Products of Chebyshev Polynomials of the Second Kind and of Fibonacci Polynomials by Several Orthogonal Polynomials

Author

Taekyun Kim, Dae San Kim, Jongkyum Kwon, and Dmitry V. Dolgy

Subjects

chebyshev polynomials of second kind, Fibonacci polynomials, sums of finite products, orthogonal polynomials, Mathematics, QA1-939

Abstract

This paper is concerned with representing sums of the finite products of Chebyshev polynomials of the second kind and of Fibonacci polynomials in terms of several classical orthogonal polynomials. Indeed, by explicit computations, each of them is expressed as linear combinations of Hermite, generalized Laguerre, Legendre, Gegenbauer and Jacobi polynomials, which involve the hypergeometric functions 1 F 1 and 2 F 1 .

Published

2018

10. Some Identities of Degenerate Bell Polynomials

Author

Han Young Kim, Dae San Kim, Taekyun Kim, and Jongkyum Kwon

Subjects

Pure mathematics, General Mathematics, 02 engineering and technology, Type (model theory), 01 natural sciences, Bell polynomials, Bernoulli's principle, symbols.namesake, Identity (mathematics), 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), 0101 mathematics, Engineering (miscellaneous), Bernoulli number, degenerate bernoulli polynomials, Mathematics, new type degenerate bell polynomials, degenerate euler polynomials, lcsh:Mathematics, 010102 general mathematics, Degenerate energy levels, Stirling numbers of the second kind, Quantum Physics, lcsh:QA1-939, Euler's formula, symbols, 020201 artificial intelligence & image processing, High Energy Physics::Experiment, degenerate cauchy polynomials

Abstract

The new type degenerate of Bell polynomials and numbers were recently introduced, which are a degenerate version of Bell polynomials and numbers and are different from the previously introduced partially degenerate Bell polynomials and numbers. Several expressions and identities on those polynomials and numbers were obtained. In this paper, as a further investigation of the new type degenerate Bell polynomials, we derive several identities involving those degenerate Bell polynomials, Stirling numbers of the second kind and Carlitz&rsquo, s degenerate Bernoulli or degenerate Euler polynomials. In addition, we obtain an identity connecting the degenerate Bell polynomials, Cauchy polynomials, Bernoulli numbers, Stirling numbers of the second kind and degenerate Stirling numbers of the second kind.

Published

2020

11. A Note on Some Identities of New Type Degenerate Bell Polynomials

Author

Hyun Seok Lee, Jongkyum Kwon, Dae San Kim, and Taekyun Kim

Subjects

Pure mathematics, Factorial, new type degenerate bell polynomials, General Mathematics, lcsh:Mathematics, 010102 general mathematics, Degenerate energy levels, Stirling numbers of the second kind, Type (model theory), lcsh:QA1-939, 01 natural sciences, bell polynomials, Expression (mathematics), partially degenerate bell polynomials, Bell polynomials, 010101 applied mathematics, Computer Science (miscellaneous), Stirling number, 0101 mathematics, Engineering (miscellaneous), Stirling polynomials, Mathematics

Abstract

Recently, the partially degenerate Bell polynomials and numbers, which are a degenerate version of Bell polynomials and numbers, were introduced. In this paper, we consider the new type degenerate Bell polynomials and numbers, and obtain several expressions and identities on those polynomials and numbers. In more detail, we obtain an expression involving the Stirling numbers of the second kind and the generalized falling factorial sequences, Dobinski type formulas, an expression connected with the Stirling numbers of the first and second kinds, and an expression involving the Stirling polynomials of the second kind.

Published

2019

12. A Note on Type 2 Degenerate q-Euler Polynomials

Author

Sung-Soo Pyo, Dae San Kim, Han Young Kim, and Taekyun Kim

Subjects

Pure mathematics, lcsh:Mathematics, General Mathematics, 010102 general mathematics, Degenerate energy levels, Generating function, 02 engineering and technology, Type (model theory), lcsh:QA1-939, 01 natural sciences, Expression (mathematics), symbols.namesake, Integer, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Euler's formula, symbols, 020201 artificial intelligence & image processing, type 2 degenerate q-Euler polynomials, fermionic p-adic q-integral, 0101 mathematics, Symmetry (geometry), Representation (mathematics), Engineering (miscellaneous), Mathematics

Abstract

Recently, type 2 degenerate Euler polynomials and type 2 q-Euler polynomials were studied, respectively, as degenerate versions of the type 2 Euler polynomials as well as a q-analog of the type 2 Euler polynomials. In this paper, we consider the type 2 degenerate q-Euler polynomials, which are derived from the fermionic p-adic q-integrals on Z p , and investigate some properties and identities related to these polynomials and numbers. In detail, we give for these polynomials several expressions, generating function, relations with type 2 q-Euler polynomials and the expression corresponding to the representation of alternating integer power sums in terms of Euler polynomials. One novelty about this paper is that the type 2 degenerate q-Euler polynomials arise naturally by means of the fermionic p-adic q-integrals so that it is possible to easily find some identities of symmetry for those polynomials and numbers, as were done previously.

Published

2019

13. Representing by Orthogonal Polynomials for Sums of Finite Products of Fubini Polynomials

Author

Taekyun Kim, Dmitry V. Dolgy, Dojin Kim, and Dae San Kim

Subjects

Pure mathematics, Chebyshev polynomials, General Mathematics, 02 engineering and technology, 01 natural sciences, Gegenbauer polynomials, fubini polynomials, Fubini's theorem, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), extended laguerre polynomials, 0101 mathematics, Engineering (miscellaneous), Legendre polynomials, orthogonal polynomials, Mathematics, Sequence, Hermite polynomials, lcsh:Mathematics, 010102 general mathematics, lcsh:QA1-939, Orthogonal polynomials, Laguerre polynomials, 020201 artificial intelligence & image processing, Jabcobi polynomials

Abstract

In the classical connection problem, it is dealt with determining the coefficients in the expansion of the product of two polynomials with regard to any given sequence of polynomials. As a generalization of this problem, we will consider sums of finite products of Fubini polynomials and represent these in terms of orthogonal polynomials. Here, the involved orthogonal polynomials are Chebyshev polynomials of the first, second, third and fourth kinds, and Hermite, extended Laguerre, Legendre, Gegenbauer, and Jabcobi polynomials. These representations are obtained by explicit computations.

Published

2019

14. Studies in Sums of Finite Products of the Second, Third, and Fourth Kind Chebyshev Polynomials

Author

Jongkyum Kwon, Taekyun Kim, Dae San Kim, and Hyun Seok Lee

Subjects

Pure mathematics, Chebyshev polynomials, Generalization, General Mathematics, chebyshev polynomials of the second, terminating hypergeometric functions, 02 engineering and technology, 01 natural sciences, symbols.namesake, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), 0101 mathematics, Hypergeometric function, Linear combination, Engineering (miscellaneous), Legendre polynomials, Mathematics, Hermite polynomials, sums of finite products, lcsh:Mathematics, lcsh:QA1-939, 010101 applied mathematics, third and fourth kinds, symbols, Laguerre polynomials, Jacobi polynomials, 020201 artificial intelligence & image processing

Abstract

In this paper, we consider three sums of finite products of Chebyshev polynomials of two different kinds, namely sums of finite products of the second and third kind Chebyshev polynomials, those of the second and fourth kind Chebyshev polynomials, and those of the third and fourth kind Chebyshev polynomials. As a generalization of the classical linearization problem, we represent each of such sums of finite products as linear combinations of Hermite, generalized Laguerre, Legendre, Gegenbauer, and Jacobi polynomials. These are done by explicit computations and the coefficients involve terminating hypergeometric functions 2 F 1 , 1 F 1 , 2 F 2 , and 4 F 3 .

Published

2020

15. Fourier Series for Functions Related to Chebyshev Polynomials of the First Kind and Lucas Polynomials

Author

Dae San Kim, Taekyun Kim, Gwan-Woo Jang, and Lee-Chae Jang

Subjects

Chebyshev polynomials, Pure mathematics, General Mathematics, Bernoulli polynomials, lcsh:Mathematics, 010102 general mathematics, Chebyshev polynomials of the first kind, lcsh:QA1-939, 01 natural sciences, Fourier series, 010101 applied mathematics, symbols.namesake, Lucas polynomials, Computer Science (miscellaneous), symbols, 0101 mathematics, Linear combination, Engineering (miscellaneous), Mathematics

Abstract

In this paper, we derive Fourier series expansions for functions related to sums of finite products of Chebyshev polynomials of the first kind and of Lucas polynomials. From the Fourier series expansions, we are able to express those two kinds of sums of finite products of polynomials as linear combinations of Bernoulli polynomials.

Published

2018

16. Expressing Sums of Finite Products of Chebyshev Polynomials of the Second Kind and of Fibonacci Polynomials by Several Orthogonal Polynomials

Author

Dae San Kim, Dmitry V. Dolgy, Taekyun Kim, and Jongkyum Kwon

Subjects

Chebyshev polynomials, Pure mathematics, analysis, General Mathematics, Mathematics::Classical Analysis and ODEs, 01 natural sciences, Classical orthogonal polynomials, symbols.namesake, chebyshev polynomials of second kind, Fibonacci polynomials, Computer Science (miscellaneous), 0101 mathematics, Hypergeometric function, orthogonal polynomials, Engineering (miscellaneous), Mathematics, Hermite polynomials, sums of finite products, lcsh:Mathematics, 010102 general mathematics, lcsh:QA1-939, 010101 applied mathematics, Orthogonal polynomials, Laguerre polynomials, symbols, Jacobi polynomials

Abstract

This paper is concerned with representing sums of the finite products of Chebyshev polynomials of the second kind and of Fibonacci polynomials in terms of several classical orthogonal polynomials. Indeed, by explicit computations, each of them is expressed as linear combinations of Hermite, generalized Laguerre, Legendre, Gegenbauer and Jacobi polynomials, which involve the hypergeometric functions 1 F 1 and 2 F 1 .

Published

2018