We study a reliable pole selection for the rational approximation of the resolvent of fractional powers of operators in both the finite and infinite dimensional setting. The analysis exploits the representation in terms of hypergeometric functions of the error of the Pad'{e} approximation of the fractional power. We provide quantitatively accurate error estimates that can be used fruitfully for practical computations. We present some numerical examples to corroborate the theoretical results. The behavior of rational Krylov methods based on this theory is also presented
An unsteady problem is considered for a space-fractional equation in a bounded domain. A first-order...
To appear in the proceedings of the 30th IEEE Symposium on Computer Arithmetic (ARITH-30), Portland ...
Matrix functions are a central topic of linear algebra, and problems of their numerical approximatio...
We study a reliable pole selection for the rational approximation of the resolvent of fractional pow...
2noWe study a reliable pole selection for the rational approximation of the resolvent of fractional ...
We investigate the rational approximation of fractional powers of unbounded positive operators attai...
In this paper we propose a new choice of poles to define reliable rational Krylov methods. These met...
In this paper we consider some rational approximations to the fractional powers of self-adjoint posi...
The solution of linear fractional-order differential problems is addressed. For this purpose rationa...
In this thesis, we employ a variety of explicit approximations to tackle some problems in Diophantin...
Padé approximation is a rational approximation constructed from the coefficients of a power series o...
The paper completely solves two questions of K. Mahler and resp. M. Mendes-France, on the rational a...
We present a unified and self-contained treatment of rational Krylov methods for approximating the p...
A problem of Mahler on farctional parts of powers of an algebraic number is solved, namely a classif...
AbstractWe construct fractional powers of operators whoseC-regularized resolvent (w−A)−1CisO(1/w) in...
An unsteady problem is considered for a space-fractional equation in a bounded domain. A first-order...
To appear in the proceedings of the 30th IEEE Symposium on Computer Arithmetic (ARITH-30), Portland ...
Matrix functions are a central topic of linear algebra, and problems of their numerical approximatio...
We study a reliable pole selection for the rational approximation of the resolvent of fractional pow...
2noWe study a reliable pole selection for the rational approximation of the resolvent of fractional ...
We investigate the rational approximation of fractional powers of unbounded positive operators attai...
In this paper we propose a new choice of poles to define reliable rational Krylov methods. These met...
In this paper we consider some rational approximations to the fractional powers of self-adjoint posi...
The solution of linear fractional-order differential problems is addressed. For this purpose rationa...
In this thesis, we employ a variety of explicit approximations to tackle some problems in Diophantin...
Padé approximation is a rational approximation constructed from the coefficients of a power series o...
The paper completely solves two questions of K. Mahler and resp. M. Mendes-France, on the rational a...
We present a unified and self-contained treatment of rational Krylov methods for approximating the p...
A problem of Mahler on farctional parts of powers of an algebraic number is solved, namely a classif...
AbstractWe construct fractional powers of operators whoseC-regularized resolvent (w−A)−1CisO(1/w) in...
An unsteady problem is considered for a space-fractional equation in a bounded domain. A first-order...
To appear in the proceedings of the 30th IEEE Symposium on Computer Arithmetic (ARITH-30), Portland ...
Matrix functions are a central topic of linear algebra, and problems of their numerical approximatio...