Construction a new generating function of Bernstein type polynomials

“…The recurrence formula given in Lemma 2 below is the key point to show Theorem 1 and was proved in [1] by using a probabilistic approach. For the sake of completeness, we include here a different proof based on the moment generating function (see [2] or [8,9])…”

Section: Auxiliary Resultsmentioning

confidence: 99%

Sharp upper and lower bounds for the moments of Bernstein polynomials

Adell

Bustamante

Quesada

2015

Applied Mathematics and Computation

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“…If we replace x by − x and b = 0 in ,

Y_{k}^{n} (MathClass-bin- x MathClass-punc; 0) MathClass-rel= 2 {(MathClass-bin- x)}^{k} {(1 MathClass-bin- x)}^{n MathClass-bin- k MathClass-bin- b} MathClass-punc.

Therefore,

Y_{k}^{n} (MathClass-bin- x MathClass-punc; 0) MathClass-rel= \frac{2 {(MathClass-bin- 1)}^{k}}{((), \begin{matrix} falsenonefalsearray \\ arraycenter n \\ arraycenter k \end{matrix})} B_{k}^{n} (x) MathClass-punc,

where

B_{k}^{n} (x)

denotes the Bernstein basis functions , which is defined by

B_{k}^{n} (x) MathClass-rel= ((), \begin{matrix} falsenonefalsearray \\ arraycenter n \\ arraycenter k \end{matrix}) x^{k} {(1 MathClass-bin- x)}^{n MathClass-bin- k} MathClass-punc,

where 0 ≤ k ≤ n and x ∈ [0,1] ( cf . ).…”

Section: The Polynomial Ykn(xmathclass-punc;b)mentioning

confidence: 97%

A new class of polynomials associated with Bernstein and beta polynomials

Şimşek

2013

Math. Meth. Appl. Sci.

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The purpose of this paper is to define a new class polynomials. Special cases of these polynomials give many famous family of the Bernstein type polynomials and beta polynomials. We also construct generating functions for these polynomials. We investigate some fundamental properties of these functions and polynomials. Using functional equations and generating functions, we derive various identities related to theses polynomials. We also construct interpolation function that interpolates these polynomials at negative integers. Finally, we give a matrix representations of these polynomials. Copyright © 2013 John Wiley & Sons, Ltd.

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“…where a ≤ x ≤ b and B(u, v) is denoted the beta function, which is given by equation (12). The above formula is the work of Xiu and Karniadakis [22].…”

Section: Beta Distributionmentioning

confidence: 99%

“…They have been used several branches of Mathematics, Physics and Engineering. Because of closure under addition, multiplication, differentiation, integration, and composition, they have been utilized in computational models of scientific and engineering problems [4,5,12].…”

Section: Introductionmentioning

confidence: 99%

q-Beta Polynomials and their Applications

Şimşek¹

2013

Appl. Math. Inf. Sci.

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The aim of this paper is to construct generating functions for q-beta polynomials. By using these generating functions, we define the q -beta polynomials and also derive some fundamental properties of these polynomials. We give some functional equations and partial differential equations (PDEs) related to these generating functions. By using these equations, we find some identities related to these polynomials, binomial coefficients, the gamma function and the beta function. We obtain a relation between the qbeta polynomials and the q-Bernstein basis functions. We give relations between the q-Beta polynomials, the Bernoulli polynomials, the Euler polynomials and the Stirling numbers. We also give a probability density function associated with the beta polynomials. By applying the Mellin transform, the Fourier transform and the Laplace transform to the generating functions, we obtain not only interpolation function, but also some series representations for the q-Beta polynomials. Furthermore, by using the p-adic q-Volkenborn integral, we give relations between the q-beta polynomials, the q-Euler numbers and the Carlitz's q-Bernoulli numbers.

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Construction a new generating function of Bernstein type polynomials

Cited by 22 publications

References 9 publications

Sharp upper and lower bounds for the moments of Bernstein polynomials

Sharp upper and lower bounds for the moments of Bernstein polynomials

A new class of polynomials associated with Bernstein and beta polynomials

q-Beta Polynomials and their Applications

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