Approximation properties of de la Vallée-Poussin means for piecewise smooth functions

The value of the deviation of a function f(x) from its de la Vallée-Poussin means V_mⁿ(f, x) with respect to the trigonometric system for classes of piecewise smooth 2π-periodic functions is estimated.     

Best approximation and de la Vallée-Poussin sums

For the class C_ε={f∈C_2π: E_n, n≤Z₊} where \(\left\{ {\varepsilon _n } \right\}_{n \in Z_ + } \) is a sequence of numbers tending monotonically to zero, we establish the following precise (in the sense of order) bounds for the error of approximation by de la Vallée-Poussin sums: (1) $$c_1 \sum\nolimits_{j = n}^{2\left( {n + l} \right)} {\frac{{\varepsilon _j }}{{l + j - n + 1}}} \leqslant \mathop {\sup }\limits_{f \in C_\varepsilon } \left\| {f - V_{n, l} \left( f \right)} \right\|_C \leqslant c_2 \sum\nolimits_{j = n}^{2\left( {n + l} \right)} {\frac{{\varepsilon _j }}{{l + j - n + 1}}} \left( {n \in N} \right)$$ , where c₁ and c₂ are constants which do not depend on n orl. This solves the problem posed by S. B. Stechkin at the Conference on Approximation Theory (Bonn, 1976) and permits a unified treatment of many earlier results obtained only for special classes C_ε of (differentiable) functions. The result (1) substantially refines the estimate (see [1]) (2) $$\left\| {V_{n, l} \left( f \right) - f} \right\|_C = O\left( {\log {n \mathord{\left/ {\vphantom {n {\left( {l + 1} \right) + 1}}} \right. \kern-\nulldelimiterspace} {\left( {l + 1} \right) + 1}}} \right) E_n \left[ f \right] \left( {n \to \infty } \right)$$ and includes as particular cases the estimates of approximations by Fejér sums (see [2]) and by Fourier sums (see [3]).     

Lebesgue constants of multiple de la Vallée-Poussin sums over polyhedra

One considers linear summation methods for the multiple Fourier series the multidimensional analogues of the de la Vallé-Poussin sums. The summation of the Fourier series is carried out over the homotheties of an m-dimensional starshaped polyhedron . It is shown that if has rational vertices, then the Lebesgue constants of the considered methods, with the accuracy of O((p+1)^–1. log^m–1 (n+2)) are equal to where is the Fourier transform of the function . The exact value of the principal term of the Lebesgue constant is computed in two particular cases: 1) is obtained from an m-dimensional cube by means of a linear nonsingular transformation; 2) =0. is an m-dimensional simplex.Translated from Zapiski Nauchnykh Seminarov Leningradskogo Otdeleniya Matematicheskogo Instituta im. V. A. Steklova AN SSSR, Vol. 125, pp. 154–165, 1983.     

Approximation of classes of continuous functions by generalized de la Vallée-Poussin sums

We introduce generalized de la Vallée-Poussin sums and study their approximation properties for the classes of continuous periodic functionsC _, .Translated from Ukrainskii Matematicheskii Zhurnal, Vol. 47, No. 8, pp. 1069–1079, August, 1995.     

Generalized Gibbs phenomenon for Fourier partial sums and de la Vallée-Poussin sums

It is well-known that the Fourier partial sums of a function exhibit the Gibbs phenomenon at a jump discontinuity. We study the same question for de la Vallée-Poussin sums. Here we find a new Gibbs function and a new Gibbs constant. When the function is continuous, a behavior similar to the Gibbs phenomenon also occurs at a kink. We call it the “generalized Gibbs phenomenon”. Let $F_{n}(x):=\frac{k_{n}(g,x)-g(x)}{k_{n}(g,x_{0})-g(x_{0})}$ , where x ₀ is a kink and where k _n (g,x) represents Fourier partial sums and de la Vallée-Poussin sums. We show that F _n (x) exhibits the “generalized Gibbs phenomenon”. New universal Gibbs functions for both sums are derived.     

Approximations of functions defined on the real axis by means of de la Vallée-Poussin operators

Asymptotic equations for upper bounds of deviations of the de la Vallée-Poussin operators on C classes in the uniform metric are obtained.Translated from Ukrainskii Matematicheskii Zhurnal, Vol. 44, No. 5, pp. 682–691, May, 1992.     

Some Interpolating Operators of de la Vallée-Poussin Type

We consider discrete versions of the de la Vallée-Poussin algebraic operator. We give a simple sufficient condition in order that such discrete operators interpolate, and in particular we study the case of the Bernstein-Szeg weights. Furthermore we obtain good error estimates in the cases of the sup-norm and L¹-norm, which are critical cases for the classical Lagrange interpolation.     

Approximation Properties of Repeated de la Vallée-Poussin Means for Piecewise Smooth Functions

Siberian Mathematical Journal - Basing on Fourier’s trigonometric sums and the classical de la Vallée-Poussin means, we introduce the repeated de la Vallée-Poussin means. Under...     

A continuous extension of the de la Vallée Poussin means

Among the many interesting results of their 1958 paper, G. Pólya and I. J. Schoenberg studied the de la Vallée Poussin means of analytic functions. These are polynomial approximations of a given analytic function on the unit disk obtained by taking Hadamard products of the functionf with certain polynomialsV _n (z), wheren is the degree of the polynomial. The polynomial approximationsV _n *f converge locally uniformly tof asn→∞. In this paper, we define a subordination chainV _λ (z),γ>0, |z|<1, of convex mappings of the disk that for integer values is the same as the previously definedV _n (z). Iff is a conformal mapping of the diskD onto a convex domain, thenV _λ *f→f locally uniformly as λ→∞, and in fact when λ₂ > λ₁. We also consider Hadamard products of theV _λ with complex-valued harmonic mappings of the disk. This work was supported by the Volkswagen Stiftung (RiP-program at Oberwolfach). S. R. received partial support also from INTAS (Project 99-00089) and the German-Israeli Foundation (grant G-643-117.6/1999).     

Vallée-Poussin算子逼近连续函数的最优估计

通过将Vallée-Poussin算子逼近连续函数的能力转化为对辅助数列{g(n)}的上确界的计算,首先利用数列单调有界定理证明辅助数列极限的存在性,之后借助夹逼准则求得辅助数列{g(n)}的极限,即数列{g(n)}的上确界,进而得到Vallée-Poussin算子逼近连续函数的最优估计常数.     

On the divergence of de la Vallée Poussin means of Fourier series

Пусть {λ _{n 1} ^t8 — монотонн ая последовательнос ть натуральных чисел. Дл я каждой функции fεL(0, 2π) с рядом Фурье строятся обобщенные средние Bалле Пуссена $$V_n^{(\lambda )} (f;x) = \frac{{a_0 }}{2} + \mathop \sum \limits_{k = 1}^n (a_k \cos kx + b_k \sin kx) + \mathop \sum \limits_{k = n + 1}^{n + \lambda _n } \left( {1 - \frac{{k - n}}{{\lambda _n + 1}}} \right)\left( {a_k \cos kx + b_k \sin kx} \right).$$ Доказываются следую щие теоремы.

1. Если λ_n=o(n), то существуе т функция fεL(0, 2π), для кот орой последовательность {V_n ^(λ)(?;x)} расходится почти вс юду.
2. Если λ_n=o(n), то существуе т функция fεL(0, 2π), для кот орой последовательность $$\left\{ {\frac{1}{\pi }\mathop \smallint \limits_{ - \pi /\lambda _n }^{\pi /\lambda _n } f(x + t)\frac{{\sin (n + \tfrac{1}{2})t}}{{2\sin \tfrac{1}{2}t}}dt} \right\}$$ расходится почти всю ду

.     

Approximation of Analytic Periodic Functions by de la Vallée-Poussin Sums

We investigate the approximation properties of the de la Vallée-Poussin sums on the classes . We obtain asymptotic equalities that, in certain cases, guarantee the solvability of the Kolmogorov–Nikol'skii problem for the de la Vallée-Poussin sums on the classes .     

A generalisation of de la Vallée-Poussin procedure to multivariate approximations

Advances in Computational Mathematics - Persistence diagrams are one of the main tools in the field of Topological Data Analysis (TDA). They contain fruitful information about the shape of data....     

On the approximation of periodic functions by de la Vallée Poussin sums

Пустьf — непрерывная периодическая функц ия,s _n (f) — сумма Фурье порядкаn функцииf,E _n (f) — наилучшее прибли жениеf тригонометри ческими полиномами порядкаn в чебьппев-ской метрике и $$\sigma _{n, m} (f) = \frac{1}{{m + 1}}\mathop \sum \limits_{v = n - m}^n s_v (f) (0 \leqq m \leqq n; n = 0, 1, \ldots )$$ — суммы Bалле Пуссена ф ункцииf Для любой последовательностиε={ε_v} (v=0, l,...),ε _v ↓0(v→∞) обозначим чер езC(ε) класс непрерывн ых функцийf, для которыхE _v (f)≦ε _v (v=0,1,...). В работе устанавли вается, что существую т абсолютные положите льные кон-стантыa ₁ иa ₂ такие, что $$A_1 \mathop \sum \limits_{v = 0}^n \frac{{\varepsilon _{n - m + v} }}{{m + v + 1}} \leqq \mathop {\sup }\limits_{f \in C(\varepsilon )} \parallel f - \sigma _{n, m} (f)\parallel \leqq A_2 \mathop \sum \limits_{v = 0}^n \frac{{\varepsilon _{n - m + v} }}{{m + v + 1}}$$ для всех 0≦m≦n; n=0, l, ... В частн ых случаяхт=п иm=0 этот результат равноси-ле н теоремам, установлен ным ранее автором и К. И. Осколковым.     

用Vallée-Poussin和逼近可微函数

<正> 设C_(2π)是有周期2π的连续函数的全体,f∈C_(2π)时,记这里T_n是n阶三角多项式的全体.对于给定的单调减小趋于零的正数列     

Approximation Properties of the Vallée-Poussin Means of Partial Sums of a Special Series in Laguerre Polynomials

Mathematical Notes - We consider the problem of the approximation of functions, continuous on the semiaxis $$[0,infty)$$ and for which the derivatives $$f^{(nu)}(0)$$ , $$nu=0,dots,r-1$$ exist...