AbstractIn this paper, we present rounding error bounds of recent parallel versions of Forsythe's and Clenshaw's algorithms for the evaluation of finite series of Chebyshev polynomials of the first and second kind. The backward errors are studied by using the matrix formulation of the algorithm, whereas the forward error is also studied by means of a more direct approach that permits us to obtain sharper bounds. The bounds show an almost stable behavior as in the sequential algorithms. This fact is illustrated with several numerical tests
In this paper an iterative technique for solving initial value problems is presented. The technique ...
AbstractThe application of the recent techniques of the design of algebraic algorithms to the sequen...
This paper improves error bounds forGauss, Clenshaw-Curtis and Fejér's first quadrature by using new...
AbstractIn this paper, we present rounding error bounds of recent parallel versions of Forsythe's an...
AbstractRounding error bounds of the Forsythe and the Clenshaw–Smith algorithm for the evaluation of...
AbstractIn this paper, we introduce a general parallel algorithm for the evaluation of Chebyshev and...
AbstractBy analysing the effects of rounding errors from all sources, it is shown that the coefficie...
This paper presents some numerical simulations of rounding errors produced during evaluation of Cheb...
AbstractThe error propagation characteristics of the polynomial evaluation schemes of Horner, Clensh...
International audienceIn approximation theory, it is standard to approximate functions by polynomial...
AbstractFor a function f(x) that is smooth on the interval x∈[a,b] but otherwise arbitrary, the real...
Compared to Krylov space methods based on orthogonal or oblique projection, the Chebyshev iteration ...
A Chebyshev series is an expansion in the basis of Chebyshev polynomials of the first kind. These se...
We consider the computation of roots of polynomials expressed in the Chebyshev basis. We extend the ...
AbstractStable polynomial evaluation and interpolation at n Chebyshev or adjusted (expanded) Chebysh...
In this paper an iterative technique for solving initial value problems is presented. The technique ...
AbstractThe application of the recent techniques of the design of algebraic algorithms to the sequen...
This paper improves error bounds forGauss, Clenshaw-Curtis and Fejér's first quadrature by using new...
AbstractIn this paper, we present rounding error bounds of recent parallel versions of Forsythe's an...
AbstractRounding error bounds of the Forsythe and the Clenshaw–Smith algorithm for the evaluation of...
AbstractIn this paper, we introduce a general parallel algorithm for the evaluation of Chebyshev and...
AbstractBy analysing the effects of rounding errors from all sources, it is shown that the coefficie...
This paper presents some numerical simulations of rounding errors produced during evaluation of Cheb...
AbstractThe error propagation characteristics of the polynomial evaluation schemes of Horner, Clensh...
International audienceIn approximation theory, it is standard to approximate functions by polynomial...
AbstractFor a function f(x) that is smooth on the interval x∈[a,b] but otherwise arbitrary, the real...
Compared to Krylov space methods based on orthogonal or oblique projection, the Chebyshev iteration ...
A Chebyshev series is an expansion in the basis of Chebyshev polynomials of the first kind. These se...
We consider the computation of roots of polynomials expressed in the Chebyshev basis. We extend the ...
AbstractStable polynomial evaluation and interpolation at n Chebyshev or adjusted (expanded) Chebysh...
In this paper an iterative technique for solving initial value problems is presented. The technique ...
AbstractThe application of the recent techniques of the design of algebraic algorithms to the sequen...
This paper improves error bounds forGauss, Clenshaw-Curtis and Fejér's first quadrature by using new...