Some Identities of the Higher-Order Type 2 Bernoulli Numbers and Polynomials of the Second Kind

We introduce the higher-order type 2 Bernoulli numbers and polynomials of the second kind.In this paper,we investigate some identities and properties for them in connection with central factorial numbers of the second kind and the higher-order type 2 Bernoulli polynomials.We give some relations between the higher-order type 2 Bernoulli numbers of the second kind and their conjugates.

HIGHER-ORDER MULTIVARIABLE EULER'S POLYNOMIALAND HIGHER-ORDER MULTIVARIABLEBERNOULLI'S POLYNOMIAL

In this paper, the definitons of both higher-order multivariable Euler's numbersand polynomial. higher-order multivariable Bernoulli's numbers and polynomial aregiven and some of their important properties are expounded. As a result, themathematical relationship between higher-order multivariable Euler's polynomial(numbers) and higher-order higher -order Bernoulli's polynomial (numbers) are thusobtained.

Multiparameter Higher Order Daehee and Bernoulli Numbers and Polynomials

This paper gives a new generalization of higher order Daehee and Bernoulli numbers and polynomials. We define the multiparameter higher order Daehee numbers and polynomials of the first and second kind. Moreover, we derive some new results for these numbers and polynomials. The relations between these numbers and Stirling and Bernoulli numbers are obtained. Furthermore, some interesting special cases of the generalized higher order Daehee and Bernoulli numbers and polynomials are deduced.

New Extension of Unified Family Apostol-Type of Polynomials and Numbers

The purpose of this paper is to introduce and investigate new unification of unified family of Apostol-type polynomials and numbers based on results given in [1] [2]. Also, we derive some properties for these polynomials and obtain some relationships between the Jacobi polynomials, Laguerre polynomials, Hermite polynomials, Stirling numbers and some other types of generalized polynomials.

Asymptotic Approximations of Apostol-Tangent Polynomials in Terms of Hyperbolic Functions

The tangent polynomials Tn(z)are generalization of tangent numbers or the Euler zigzag numbers Tn.In particular,Tn(0)=Tn.These polynomials are closely related to Bernoulli,Euler and Genocchi polynomials.One of the extensions and analogues of special polynomials that attract the attention of several mathematicians is the Apostol-type polynomials.One of these Apostol-type polynomials is the Apostol-tangent polynomials Tn(z,λ).Whenλ=1,Tn(z,1)=Tn(z).The use of hyperbolic functions to derive asymptotic approximations of polynomials together with saddle point method was applied to the Bernoulli and Euler polynomials by Lopez and Temme.The same method was applied to the Genocchi polynomials by Corcino et al.The essential steps in applying the method are(1)to obtain the integral representation of the polynomials under study using their exponential generating functions and the Cauchy integral formula,and(2)to apply the saddle point method.It is found out that the method is applicable to Apostol-tangent polynomials.As a result,asymptotic approximation of Apostol-tangent polynomials in terms of hyperbolic functions are derived for large values of the parameter n and uniform approximation with enlarged region of validity are also obtained.Moreover,higher-order Apostol-tangent polynomials are introduced.Using the same method,asymptotic approximation of higherorder Apostol-tangent polynomials in terms of hyperbolic functions are derived and uniform approximation with enlarged region of validity are also obtained.It is important to note that the consideration of Apostol-type polynomials and higher order Apostol-type polynomials were not done by Lopez and Temme.This part is first done in this paper.The accuracy of the approximations are illustrated by plotting the graphs of the exact values of the Apostol-tangent and higher-order Apostol-tangent polynomials and their corresponding approximate values for specific values of the parameters n,λand m.

一类包含Euler-Bernoulli-Genocchi数的恒等式

利用初等方法给出了一类包含Euler-Bernoulli-Genocchi数乘积及其线性组合的卷积公式。

Genocchi积分多项式及其性质

本文研究了Genocchi积分多项式的性质.利用生成函数的方法,得到了Genocchi积分多项式的一些组合恒等式,揭示了Genocchi积分多项式和Genocchi多项式、Bernoulli多项式、Genocchi数、Bernoulli数、Euler数之间的关系.

关于Genocchi多项式与Bernoulli多项式的恒等式

利用生成函数的方法,讨论了Genocchi多项式、Bernoulli多项式与Euler多项式线性组合的乘积问题,得到了Genocchi多项式与Bernoulli多项式、Euler多项式的一些组合恒等式.

Galerkin-Bernstein Approximations for the System of Third-Order Nonlinear Boundary Value Problems

This paper is devoted to find the numerical solutions of one dimensional general nonlinear system of third-order boundary value problems (BVPs) for the pair of functions using Galerkin weighted residual method. We derive mathematical formulations in matrix form, in detail, by exploiting Bernstein polynomials as basis functions. A reasonable accuracy is found when the proposed method is used on few examples. At the end of the study, a comparison is made between the approximate and exact solutions, and also with the solutions of the existing methods. Our results converge monotonically to the exact solutions. In addition, we show that the derived formulations may be applicable by reducing higher order complicated BVP into a lower order system of BVPs, and the performance of the numerical solutions is satisfactory. .

关于高阶Genocchi数和广义Lucas多项式的恒等式

利用组合数学的方法,得到了一些包含高阶Genocchi数和广义Lucas多项式的恒等式,并且由此建立了Fibonacci数与Riemann Zeta函数的关系式.

关于高阶Genocchi多项式的恒等式

根据高阶Genocchi多项式、高阶Bernoulli多项式和高阶Euler多项式定义,利用发生函数研究高阶Genoc-chi多项式、高阶Bernoulli多项式和高阶Euler多项式之间的关系,并给出了一些新型恒等式。

广义Genocchi多项式的一组恒等式

用初等的方法研究了一个广义Genocchi多项式的性质,并得到了一组恒等式.

高阶Genocchi多项式的几个恒等式(英文)

利用发生函数的方法,研究高阶Genocchi多项式、高阶Bernoulli多项式和高阶Euler多项式之间的关系,并给出了一些新型的恒等式.

关于Apostol-Genocchi多项式的一些恒等式(英文)

利用发生函数以及高斯超几何函数得到了关于Apostol-Genocchi多项式的一些新的恒等式,并进一步推导出一些特殊情况及应用.

高阶Genocchi多项式、高阶Euler多项式与Stirling数的关系

利用生成函数与组合分析的方法研究高阶Genocchi多项式、高阶Euler多项式与Stirling数的关系,给出了用Stirling数计算高阶Genocchi多项式和高阶Euler多项式的公式.

高阶Genocchi多项式的性质

为建立关于高阶Genocch i多项式的恒等式,在定义的基础上,运用代数剩余理论推导了高阶Genocch i多项式自身的递推关系,及其与广义中心阶乘数、N rlund-Genocch i多项式之间的关系式.在计算方面,运用数学归纳等方法,求解了高阶Genocch i多项式在一些特殊点的值.

Computational analysis for fractional characterization of coupled convection-diffusion equations arising in MHD fows

The work is devoted to the fractional characterization of time-dependent coupled convection-diffusion systems arising in magnetohydrodynamics(MHD)flows.The time derivative is expressed by means of Caputo’s fractional derivative concept,while the model is solved via the full-spectral method(FSM)and the semi-spectral scheme(SSS).The FSM is based on the operational matrices of derivatives constructed by using higher-order orthogonal polynomials and collocation techniques.The SSS is developed by discretizing the time variable,and the space domain is collocated by using equal points.A detailed comparative analysis is made through graphs for various parameters and tables with existing literature.The contour graphs are made to show the behaviors of the velocity and magnetic fields.The proposed methods are reasonably efficient in examining the behavior of convection-diffusion equations arising in MHD flows,and the concept may be extended for variable order models arising in MHD flows.

有关Bernoulli积分多项式的某些恒等式

利用发生函数,研究了Bernoulli积分多项式和Genocchi多项式,Euler多项式之间的关系,并得到了几个漂亮的恒等式.

Some Symmetry Identities for the Euler Polynomials

Using the generating functions, we prove some symmetry identities for the Euler polynomials and higher order Euler polynomials, which generalize the multiplication theorem for the Euler polynomials. Also we obtain some relations between the Bernoulli polynomials, Euler polynomials, power sum, alternating sum and Genocchi numbers.

A Class of Second-Order Cone Eigenvalue Complementarity Problems for Higher-Order Tensors

In this paper,we consider the second-order cone tensor eigenvalue complementarity problem(SOCTEiCP)and present three different reformulations to the model under consideration.Specifically,for the general SOCTEiCP,we first show its equivalence to a particular variational inequality under reasonable conditions.A notable benefit is that such a reformulation possibly provides an efficient way for the study of properties of the problem.Then,for the symmetric and sub-symmetric SOCTEiCPs,we reformulate them as appropriate nonlinear programming problems,which are extremely beneficial for designing reliable solvers to find solutions of the considered problem.Finally,we report some preliminary numerical results to verify our theoretical results.