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相关论文: Estimates for Jacobi-Sobolev type orthogonal polyn…

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In this paper we deal with polynomials orthogonal with respect to an inner product involving derivatives, that is, a Sobolev inner product. Indeed, we consider Sobolev type polynomials which are orthogonal with respect to $$(f,g)=\int fg…

经典分析与常微分方程 · 数学 2010-03-18 M. Alfaro , J. J. Moreno-Balcazar , A. Pena , M. L. Rezola

We consider the discrete Sobolev inner product $$(f,g)_S=\int f(x)g(x)d\mu+Mf^{(j)}(c)g^{(j)}(c), \quad j\in \mathbb{N}\cup\{0\}, \quad c\in\mathbb{R}, \quad M>0, $$ where $\mu$ is a classical continuous measure with support on the real…

经典分析与常微分方程 · 数学 2019-08-01 Juan F. Mañas-Mañas , Juan J. Moreno-Balcázar

We investigate the asymptotic properties of orthogonal polynomials for a class of inner products including the discrete Sobolev inner products $\langle h,g \rangle = \int hg\, d\mu + \sum_{j=1}^m \sum_{i=0}^{N_j} M_{j,i} h^{(i)}(c_j)…

经典分析与常微分方程 · 数学 2016-09-06 G. López , Francisco Marcellán , Walter Van Assche

Let $\{q_n^{(\alpha,\beta,m)}(x)\}_{n\ge 0}$ be the orthonormal polynomials respect to the Sobolev-type inner product \begin{equation*} \langle f,g\rangle_{\alpha,\beta,m}=\sum_{k=0}^m \int_{-1}^{1}f^{(k)}(x)g^{(k)}(x)\,…

泛函分析 · 数学 2018-06-25 Óscar Ciaurri , Judit Mínguez

The Jacobi polynomials on the simplex are orthogonal polynomials with respect to the weight function $W_\bg(x) = x_1^{\g_1} ... x_d^{\g_d} (1- |x|)^{\g_{d+1}}$ when all $\g_i > -1$ and they are eigenfunctions of a second order partial…

经典分析与常微分方程 · 数学 2011-11-15 Rabia Aktas , Yuan Xu

In the present work, we investigate certain algebraic and differential properties of the orthogonal polynomials with respect to a discrete-continuous Sobolev-type inner product defined in terms of the Jacobi measure.

经典分析与常微分方程 · 数学 2024-09-10 Roberto S. Costas-Santos

For the weight function $W_\mu(x) = (1-|x|^2)^\mu$, $\mu > -1$, $\lambda > 0$ and $b_\mu$ a normalizing constant, a family of mutually orthogonal polynomials on the unit ball with respect to the inner product $$ \la f,g \ra = {b_\mu…

经典分析与常微分方程 · 数学 2012-11-13 Teresa E. Perez , Miguel A. Pinar , Yuan Xu

In this contribution we consider sequences of monic polynomials orthogonal with respect to a Sobolev-type inner product \[ \langle f,g \rangle _{S}:= \langle {\bf u}, f g\rangle +N (\mathscr D_q f)(\alpha) (\mathscr D _{q}g)(\alpha),\qquad…

经典分析与常微分方程 · 数学 2018-09-25 Roberto S. Costas-Santos , A. Soria-Lorente

We study the sequence of monic polynomials $\{S_n\}_{n\geqslant 0}$, orthogonal with respect to the Jacobi-Sobolev inner {product} \;$$ \langle f,g\rangle_{\mathsf{s}}= \int_{-1}^{1} f(x) g(x)\,…

经典分析与常微分方程 · 数学 2023-08-14 Héctor Pijeira-Cabrera , Javier Quintero-Roba , Juan Toribio-Milane

Orthogonal polynomials on the product domain $[a_1,b_1] \times [a_2,b_2]$ with respect to the inner product $$ \langle f,g \rangle_S = \int_{a_1}^{b_1} \int_{a_2}^{b_2} \nabla f(x,y)\cdot \nabla g(x,y)\, w_1(x)w_2(y) \,dx\, dy + \lambda…

经典分析与常微分方程 · 数学 2014-06-04 L. Fernández , F. Marcellán , T. E. Pérez , M. A. Piñar , Y. Xu

In this contribution we deal with a varying discrete Sobolev inner product involving the Jacobi weight. Our aim is to study the asymptotic properties of the corresponding orthogonal polynomials and the behavior of their zeros. We are…

经典分析与常微分方程 · 数学 2016-01-08 Juan F. Mañas-Mañas , Francisco Marcellán , Juan J. Moreno-Balcázar

In this paper, we study the sequence of orthogonal polynomials $\{S_n\}_{n=0}^{\infty}$ with respect to the Sobolev-type inner product $$\langle f,g \rangle= \int_{-1}^{1} f(x) g(x) \,d\mu(x) +\sum_{j=1}^{N} \eta_{j} \,f^{(d_j)}(c_{j})…

经典分析与常微分方程 · 数学 2019-07-30 Abel Díaz-González , Héctor Pijeira-Cabrera , Ignacio Pérez-Yzquierdo

In this paper we propose a way to construct classical type Sobolev orthogonal polynomials. We consider two families of hypergeometric polynomials: ${}_2 F_2(-n,1;q,r;x)$ and ${}_3 F_2(-n,n-1+a+b,1;a,c;x)$ ($a,b,c,q,r>0$, $n=0,1,...$), which…

经典分析与常微分方程 · 数学 2019-02-12 Sergey M. Zagorodnyuk

In this paper we give an asymptotic of the coefficients of the orthogonal polynomials on the unit circle, with respect of a weight of type $\displaystyle{ f : \theta \mapsto \prod_{1\le j \le M} \vert 1 - e^{i(\theta_{j}-\theta)}\vert…

经典分析与常微分方程 · 数学 2014-06-25 Philippe Rambour

We consider the following discrete Sobolev inner product involving the Gegenbauer weight $$(f,g)_S:=\int_{-1}^1f(x)g(x)(1-x^2)^{\alpha}dx+M\big[f^{(j)}(-1)g^{(j)}(-1)+f^{(j)}(1)g^{(j)}(1)\big],$$ where $\alpha>-1,$ $j\in \mathbb{N}\cup…

经典分析与常微分方程 · 数学 2017-05-24 Lance L. Littlejohn , Juan F. Mañas-Mañas , Juan J. Moreno--Balcázar , Richard Wellman

Orthogonal polynomials for a family of weight functions on $[-1,1]^2$, $$ \CW_{\a,\b,\g}(x,y) = |x+y|^{2\a+1} |x-y|^{2\b+1} (1-x^2)^\g(1-y^2)^{\g}, $$ are studied and shown to be related to the Koornwinder polynomials defined on the region…

经典分析与常微分方程 · 数学 2011-06-01 Yuan Xu

In this paper we present a survey about analytic properties of polynomials orthogonal with respect to a weighted Sobolev inner product such that the vector of measures has an unbounded support. In particular, we are focused in the study of…

经典分析与常微分方程 · 数学 2011-11-10 Francisco Marcellan , Juan Jose Moreno-Balcazar

This contribution aims to obtain several connection formulae for the polynomial sequence, which is orthogonal with respect to the discrete Sobolev inner product \[ \langle f, g\rangle_n=\langle {\bf u}, fg\rangle+ \sum_{j=1}^M \mu_{j}…

经典分析与常微分方程 · 数学 2023-10-20 Roberto S. Costas-Santos

Orthogonal polynomials with respect to the weight function $w_{\beta,\gamma}(t) = t^\beta (1-t)^\gamma$, $\gamma > -1$, on the conic surface $\{(x,t): \|x\| = t, \, x \in \mathbb{R}^d, \, t \le 1\}$ are studied recently, and are shown to be…

经典分析与常微分方程 · 数学 2026-05-27 Lidia Fernandez , Teresa Perez , Miguel Pinar , Yuan Xu

We present an informal review of results on asymptotics of orthogonal polynomials, stressing their spectral aspects and similarity in two cases considered. They are polynomials orthonormal on a finite union of disjoint intervals with…

数学物理 · 物理学 2007-05-23 Leonid Pastur
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