In this paper we consider some rational approximations to the fractional powers of self-adjoint positive operators, arising from the Gauss–Laguerre rules. We derive practical error estimates that can be used to select a priori the number of Laguerre points necessary to achieve a given accuracy. We also present some numerical experiments to show the effectiveness of our approaches and the reliability of the estimates
The paper completely solves two questions of K. Mahler and resp. M. Mendes-France, on the rational a...
In this article we study quantitatively with rates the pointwise con-vergence of a sequence of posit...
Here we consider the ordinary and fractional approximation of functions by sublinear positive operat...
In this paper we consider some rational approximations to the fractional powers of self-adjoint posi...
We investigate the rational approximation of fractional powers of unbounded positive operators attai...
In this paper we are interested in the approximation of fractional powers of self-adjoint positive o...
2noWe study a reliable pole selection for the rational approximation of the resolvent of fractional ...
We study a reliable pole selection for the rational approximation of the resolvent of fractional pow...
A new formula is obtained for fractional powers (−A)α of operators in a Banach space (which are gene...
In this thesis, we employ a variety of explicit approximations to tackle some problems in Diophantin...
We introduce an efficient algorithm for computing fractional integrals and derivatives and apply it ...
The Schur--Pad�© algorithm [N. J. Higham and L. Lin, A Schur--Pad�© algorithm for fractional pow...
The Schur--Padé algorithm [N. J. Higham and L. Lin, A Schur--Padé algorithm for fractional powers ...
In the present paper, fractional powers of positive operators are investigated. Theorems on the stru...
AbstractThis paper develops four near-minimax rational approximation formulas for computing the posi...
The paper completely solves two questions of K. Mahler and resp. M. Mendes-France, on the rational a...
In this article we study quantitatively with rates the pointwise con-vergence of a sequence of posit...
Here we consider the ordinary and fractional approximation of functions by sublinear positive operat...
In this paper we consider some rational approximations to the fractional powers of self-adjoint posi...
We investigate the rational approximation of fractional powers of unbounded positive operators attai...
In this paper we are interested in the approximation of fractional powers of self-adjoint positive o...
2noWe study a reliable pole selection for the rational approximation of the resolvent of fractional ...
We study a reliable pole selection for the rational approximation of the resolvent of fractional pow...
A new formula is obtained for fractional powers (−A)α of operators in a Banach space (which are gene...
In this thesis, we employ a variety of explicit approximations to tackle some problems in Diophantin...
We introduce an efficient algorithm for computing fractional integrals and derivatives and apply it ...
The Schur--Pad�© algorithm [N. J. Higham and L. Lin, A Schur--Pad�© algorithm for fractional pow...
The Schur--Padé algorithm [N. J. Higham and L. Lin, A Schur--Padé algorithm for fractional powers ...
In the present paper, fractional powers of positive operators are investigated. Theorems on the stru...
AbstractThis paper develops four near-minimax rational approximation formulas for computing the posi...
The paper completely solves two questions of K. Mahler and resp. M. Mendes-France, on the rational a...
In this article we study quantitatively with rates the pointwise con-vergence of a sequence of posit...
Here we consider the ordinary and fractional approximation of functions by sublinear positive operat...