biorthogonal polynomials
Biorthogonal polynomials for two-matrix models with semiclassical potentials
... the biorthogonal polynomials associated to the two-matrix model where the eigenvalue dis- tribution has potentials V 1 , V 2 with arbitrary rational derivative and whose supports are constrained on an ...
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A Riemann–Hilbert problem for biorthogonal polynomials
... of biorthogonal polynomials (p k ) and (q j ) exist, that they are unique, and moreover, that p k has exactly k simple real zeros, see also ...the biorthogonal polynomials which is non-local ...
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Integrals and Fourier series involving the product of biorthogonal polynomials and special functions
... the biorthogonal polynomials and the multivariable polynomial, we get a several formulae involving remarkably wide variety of useful functions ( or product of such functions) which are expressible in terms ...
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Some results on biorthogonal polynomials
... In section 2 we state, in determinant form, a pair of polynomial sets which are biorthogonal on the unit circle with respect to the measure.. In Section 3 we show how these yield Pastro’[r] ...
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A pair of biorthogonal polynomials for the Szegö Hermite weight function
... polynomials corresponding to the weight functions of classical orthogonal polynomials were taken up by Konhauser [3] for the Laguerre weight function x.. Chai [5], Carlitz [6] and Madhek[r] ...
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Order of approximation by an operator involving biorthogonal polynomials
... The goal of this paper is to estimate the rate of convergence of a linear positive operator involving Konhauser polynomials to bounded variation functions on [0, 1]. To prove our main result, we have used some ...
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On Bilateral Generating Functions of Konhauser Biorthogonal Polynomials
... [16] Al-Salam, W.A., Operational representations for the Laguerre and other polynomials, Duke Math. Jour., 31(1964),127-142. [17] Calvez, L.C. et Genin, R., Applications des relations entre les Fonctions ...
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A Unification of the Generalized Multiparameter Apostol-type Bernoulli, Euler, Fubini, and Genocchi Polynomials of Higher Order
... and polynomials such as the Bernoulli numbers and polynomials, Euler numbers and polynomials, Genocchi numbers and polynomials, Fubini numbers and polynomials, and also their ...
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Holographic Image Compression using New Biorthogonal Wavelets
... In this paper, new biorthogonal wavelets are proposed. The newly designed wavelets are used for image compression. Five different wavelet based image compression techniques are considered. They are EZW, SPIHT, ...
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Professor H M Srivastava: man and mathematician
... Srivastava’s polynomials and func- tions, Carlitz-Srivastava polynomials, Srivastava-Buschman polynomials, Srivastava- Singhal polynomials, Chan-Chyan-Srivastava polynomials, ...
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Hecke operators type and generalized Apostol-Bernoulli polynomials
... Lehmer, it is well known that the Raabe’s theorem gives a characterization of the Bernoulli polynomials. As an application, of the main result of this paper, the Lehmer’s [] approach will be generalized to the ...
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Characterization of Biorthogonal Multiwavelet Packets with Arbitrary Dilation Matrix
... We have structured the article as follows. In Section 2, we state some basic preliminaries, notations and definitions including the definition of multiresoltion analysis associated with arbitrary dilation matrix A and ...
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A Wavelet Multigrid Method Using Symmetric Biorthogonal Wavelets
... symmetric biorthogonal wavelet transforms to define the requisite ...the biorthogonal wavelet transform to a general second order partial dif- ferential equation in two ...symmetric biorthogonal ...
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Professor H. M. Srivastava: Man and Mathematician
... Srivastava’s polynomials and functions, Carlitz-Srivastava polynomials, Srivastava-Buschman polynomials, Srivastava-Singhal polynomials, Chan-Chyan-Srivastava polynomials, ...
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The biorthogonal wavelets that are redundant-free and nearly shift-insensitive
... It is well known that discrete wavelet transform (DWT) is sensitive to shift, which means a slight shift of feature in the original signal may cause unpredictable changes in the analysis subbands. Some modified versions ...
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On coefficients of circuit polynomials and characteristic polynomials
... of nodes in their components, and then use the general expressions for a k, we can obtain results which give the coefficients of the characteristic polynomial of a graph in terms of subg[r] ...
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Identities on Genocchi Polynomials and Genocchi Numbers Concerning Binomial Coefficients
... Genocchi polynomials have a long ...Genocchi polynomials have become a popular research ...Genocchi polynomials extensively in many branches of Mathematics, such as elementary number theory, analytic ...
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Polynomials
... When written in standard form, the coefficient of the first term is called the leading coefficient ..!. Write the polynomial in standard form..[r] ...
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arxiv: v1 [math.pr] 26 Dec 2020
... orthogonal polynomials (it also gives a brief overview of the many other Markov chains with polynomial eigenfunctions—from Askey- Wilson to Macdonald!) Theorems ...
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arxiv: v1 [math.ca] 23 May 2018
... that is at the same time orthogonal with respect to a discrete measure (see for instance [10]). In this paper, section 2 provides a generating functions for the multiple Charlier poly- nomials. Next, this generating ...
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