The problem of accurately reconstructing a piece-wise smooth, 2(pi)-periodic function f and its first few derivatives, given only a truncated Fourier series representation of f, is studied and solved. The reconstruction process is divided into two steps. In the first step, the first 2N + 1 Fourier coefficients of f are used to approximate the locations and magnitudes of the discontinuities in f and its first M derivatives. This is accomplished by first finding initial estimates of these quantities based on certain properties of Gibbs phenomenon, and then refining these estimates by fitting the asymptotic form of the Fourier coefficients to the given coefficients using a least-squares approach. It is conjectured that the locations of the sin...
Fourier series of smooth, non-periodic functions on [−1,1] are known to exhibit the Gibbs phenomenon...
Any quasismooth function f(x) in a finite interval [0,x0], which has only a finite number of finite ...
It is known that, if a function F on T is piecewise smooth and discontinuous at x, then its Fourier ...
A family of simple, periodic basis functions with 'built-in' discontinuities are introduced, and the...
AbstractIn the present paper, we pursue the general idea suggested in our previous work. Namely, we ...
A class of approximations (S(sub N,M)) to a periodic function f which uses the ideas of Pade, or rat...
It is well known that the Fourier series of an analytic or periodic function, truncated after 2N+1 t...
AbstractIn our earlier work we developed an algorithm for approximating the locations of discontinui...
AbstractWhen a function is smooth but not smoothly periodic with a particular period, and nonetheles...
The investigation of overcoming Gibbs phenomenon was continued, i.e., obtaining exponential accuracy...
We prove that any stable method for resolving the Gibbs phenomenon—that is, recover-ing high-order a...
In order to reduce the Gibbs phenomenon exhibited by the partial Fourier sums of a pe-riodic functio...
We develop the new ESPIRA Algorithm to reconstruct exponential sums from discrete sample values, usi...
We continue our investigation of overcoming Gibbs phenomenon, i.e., to obtain exponential accuracy a...
AbstractIf a periodic function f with period 2π has a discontinuity at ξ∈[−π,π), then the partial su...
Fourier series of smooth, non-periodic functions on [−1,1] are known to exhibit the Gibbs phenomenon...
Any quasismooth function f(x) in a finite interval [0,x0], which has only a finite number of finite ...
It is known that, if a function F on T is piecewise smooth and discontinuous at x, then its Fourier ...
A family of simple, periodic basis functions with 'built-in' discontinuities are introduced, and the...
AbstractIn the present paper, we pursue the general idea suggested in our previous work. Namely, we ...
A class of approximations (S(sub N,M)) to a periodic function f which uses the ideas of Pade, or rat...
It is well known that the Fourier series of an analytic or periodic function, truncated after 2N+1 t...
AbstractIn our earlier work we developed an algorithm for approximating the locations of discontinui...
AbstractWhen a function is smooth but not smoothly periodic with a particular period, and nonetheles...
The investigation of overcoming Gibbs phenomenon was continued, i.e., obtaining exponential accuracy...
We prove that any stable method for resolving the Gibbs phenomenon—that is, recover-ing high-order a...
In order to reduce the Gibbs phenomenon exhibited by the partial Fourier sums of a pe-riodic functio...
We develop the new ESPIRA Algorithm to reconstruct exponential sums from discrete sample values, usi...
We continue our investigation of overcoming Gibbs phenomenon, i.e., to obtain exponential accuracy a...
AbstractIf a periodic function f with period 2π has a discontinuity at ξ∈[−π,π), then the partial su...
Fourier series of smooth, non-periodic functions on [−1,1] are known to exhibit the Gibbs phenomenon...
Any quasismooth function f(x) in a finite interval [0,x0], which has only a finite number of finite ...
It is known that, if a function F on T is piecewise smooth and discontinuous at x, then its Fourier ...