AbstractWhen a function is singular but infinitely differentiable at the origin, its power series diverges factorially and its Chebyshev coefficients are proportional to exp(-constant nr) for 0 < r < 1. The two case studies presented here are novel by exemplifying the limits r → 0+ and r → 1−, respectively
Dedicated to the memory of Dieter Gaier Abstract. The distribution of equi-oscillation points (alter...
International audienceThis article is concerned with the asymptotic behavior, at infinity and at the...
By using complex variable methods (steepest descent and residues) to asymptotically evaluate the coe...
AbstractWhen a function is singular but infinitely differentiable at the origin, its power series di...
Abstract. The usual way to determine the asymptotic behavior of the Cheby-shev coefficients for a fu...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients a, con...
AbstractThe aim of this paper is to give the asymptotic expansion of the coefficients in the Chebysh...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
We obtain the decay bounds for Chebyshev series coefficients of functions with finite Vitali variati...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients an con...
AbstractAn expression for the Chebyshev coefficients of the moments of the general order derivative ...
AbstractIn this article, it is proved that the Chebyshev polynomials are also the least deviation fu...
AbstractWe analyze whether a given set of analytic functions is an Extended Chebyshev system. This f...
The aim is to investigate the growth in a series of the exponents near regularity field in the terms...
Dedicated to the memory of Dieter Gaier Abstract. The distribution of equi-oscillation points (alter...
International audienceThis article is concerned with the asymptotic behavior, at infinity and at the...
By using complex variable methods (steepest descent and residues) to asymptotically evaluate the coe...
AbstractWhen a function is singular but infinitely differentiable at the origin, its power series di...
Abstract. The usual way to determine the asymptotic behavior of the Cheby-shev coefficients for a fu...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients a, con...
AbstractThe aim of this paper is to give the asymptotic expansion of the coefficients in the Chebysh...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
We present five theorems concerning the asymptotic convergence rates of Chebyshev interpolation appl...
We obtain the decay bounds for Chebyshev series coefficients of functions with finite Vitali variati...
When a function is singular at the ends of its expansion interval, its Chebyshev coefficients an con...
AbstractAn expression for the Chebyshev coefficients of the moments of the general order derivative ...
AbstractIn this article, it is proved that the Chebyshev polynomials are also the least deviation fu...
AbstractWe analyze whether a given set of analytic functions is an Extended Chebyshev system. This f...
The aim is to investigate the growth in a series of the exponents near regularity field in the terms...
Dedicated to the memory of Dieter Gaier Abstract. The distribution of equi-oscillation points (alter...
International audienceThis article is concerned with the asymptotic behavior, at infinity and at the...
By using complex variable methods (steepest descent and residues) to asymptotically evaluate the coe...
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