In this paper we propose a new choice of poles to define reliable rational Krylov methods. These methods are used for approximating function of positive definite matrices. In particular, the fractional power and the fractional resolvent are considered because of their importance in the numerical solution of fractional partial differential equations. The numerical experiments on some fractional partial differential equation models confirm that the proposed approach is promising
Rational Krylov methods are a powerful alternative for computing the product of a function of a larg...
The main focus of this paper is the solution of some partial differential equations of fractional or...
Evaluating the action of a matrix function on a vector, that is $x=f(\mathcal M)v$, is an ubiquitous...
In this paper we propose a new choice of poles to define reliable rational Krylov methods. These met...
The solution of linear fractional-order differential problems is addressed. For this purpose rationa...
The paper deals with the computation of functions of fractional powers of differential operators. Th...
Matrix functions are a central topic of linear algebra, and problems of their numerical approximatio...
We present a unified and self-contained treatment of rational Krylov methods for approximating the p...
Evaluating the action of a matrix function on a vector, that is x= f(M) v, is an ubiquitous task in ...
Matrix functions are a central topic of linear algebra, and problems of their numerical ap-proximati...
Rational Krylov methods are a powerful alternative for computing the product of a function of a larg...
Rational Krylov methods are a powerful alternative for computing the product of a function of a larg...
The main focus of this paper is the solution of some partial differential equations of fractional or...
Evaluating the action of a matrix function on a vector, that is $x=f(\mathcal M)v$, is an ubiquitous...
In this paper we propose a new choice of poles to define reliable rational Krylov methods. These met...
The solution of linear fractional-order differential problems is addressed. For this purpose rationa...
The paper deals with the computation of functions of fractional powers of differential operators. Th...
Matrix functions are a central topic of linear algebra, and problems of their numerical approximatio...
We present a unified and self-contained treatment of rational Krylov methods for approximating the p...
Evaluating the action of a matrix function on a vector, that is x= f(M) v, is an ubiquitous task in ...
Matrix functions are a central topic of linear algebra, and problems of their numerical ap-proximati...
Rational Krylov methods are a powerful alternative for computing the product of a function of a larg...
Rational Krylov methods are a powerful alternative for computing the product of a function of a larg...
The main focus of this paper is the solution of some partial differential equations of fractional or...
Evaluating the action of a matrix function on a vector, that is $x=f(\mathcal M)v$, is an ubiquitous...