Add to ORKGLet f be an element and S a subset of a normed linear space x. A basic Problem of approximation theory is to find an element of S, which is as close as possible to f, i.e. seek an element S * of S such that ‖ f- S * ‖ ≤ ‖f- s ‖ for all S * in S. This work seeks to use the fourier approximation method using the Inner product space to obtain a best approximation of functions. The fourier approximation in calculus is shown to be a special least square approximation. Define an inner product and norm on c [-π, π] by the equation. f.g =
AbstractLet f be a complex-valued function belonging to Lp(R) for some 1 < p < ∞. We study the stron...
In this thesis we consider the problem of simultaneously approximating elements of a set B C X by a ...
In this paper a theorem on degree of approximation of a function by product summability of Fourier...
AbstractA historical account is given of the development of methods for solving approximation proble...
The approximation order provided by a directed set fs h g h?0 of spaces, each spanned by the hZZ d...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
AbstractA theory of best approximation with interpolatory contraints from a finite-dimensional subsp...
Our paper is devoted to the theoritical and the practical approach for approximating given practical...
This paper shows how a Fourier approximation for a function is really the projection of a function o...
Abstract. In this paper, some characterizations of representa-tion for continuous linear functionals...
In Fourier Analysis and Approximation of Functions basics of classical Fourier Analysis are given as...
Lipchitz class of function had been introduced by McFadden [8]. Recently dealing with degree of appr...
The main goal of this text is to present the theoretical foundation of the field of Fourier analysis...
AbstractOptimal numerical approximation of bounded linear functionals by weighted sums in Hilbert sp...
AbstractA theory of best approximation is developed in the normed linear space C(T, E), the space of...
AbstractLet f be a complex-valued function belonging to Lp(R) for some 1 < p < ∞. We study the stron...
In this thesis we consider the problem of simultaneously approximating elements of a set B C X by a ...
In this paper a theorem on degree of approximation of a function by product summability of Fourier...
AbstractA historical account is given of the development of methods for solving approximation proble...
The approximation order provided by a directed set fs h g h?0 of spaces, each spanned by the hZZ d...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
AbstractA theory of best approximation with interpolatory contraints from a finite-dimensional subsp...
Our paper is devoted to the theoritical and the practical approach for approximating given practical...
This paper shows how a Fourier approximation for a function is really the projection of a function o...
Abstract. In this paper, some characterizations of representa-tion for continuous linear functionals...
In Fourier Analysis and Approximation of Functions basics of classical Fourier Analysis are given as...
Lipchitz class of function had been introduced by McFadden [8]. Recently dealing with degree of appr...
The main goal of this text is to present the theoretical foundation of the field of Fourier analysis...
AbstractOptimal numerical approximation of bounded linear functionals by weighted sums in Hilbert sp...
AbstractA theory of best approximation is developed in the normed linear space C(T, E), the space of...
AbstractLet f be a complex-valued function belonging to Lp(R) for some 1 < p < ∞. We study the stron...
In this thesis we consider the problem of simultaneously approximating elements of a set B C X by a ...
In this paper a theorem on degree of approximation of a function by product summability of Fourier...