In this paper we are interested in the approximation of fractional powers of self-adjoint positive operators. Starting from the integral representation of the operators, we apply the trapezoidal rule combined with a double-exponential transform of the integrand function. In this work we show how to improve the existing error estimates for the scalar case and also extend the analysis to operators. We report some numerical experiments to show the reliability of the estimates obtained
Here we consider the approximation of functions by sublinear positive operators with applications to...
In this paper, starting from the formulation of some possible models of fraction-al-order systems, s...
Here we consider the approximation of functions by sublinear positive operators with applications to...
In this paper we are interested in the approximation of fractional powers of self-adjoint positive o...
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...
Two quadrature-based algorithms for computing the matrix fractional power $A^\alpha$ are presented i...
Abstract The purpose of this paper is to introduce a modification of q-Dunkl generalization of expon...
In many applied problems, efficient calculation of quadratures with high accuracy is required. The e...
In this paper, the authors investigated the concept of s,m-exponential-type convex functions and the...
Here we consider the ordinary and fractional approximation of functions by sublinear positive operat...
It is well known that the trapezoidal rule converges geometrically when applied to analytic function...
A new formula is obtained for fractional powers (−A)α of operators in a Banach space (which are gene...
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...
Here we consider the approximation of functions by sublinear positive operators with applications to...
In this paper, starting from the formulation of some possible models of fraction-al-order systems, s...
Here we consider the approximation of functions by sublinear positive operators with applications to...
In this paper we are interested in the approximation of fractional powers of self-adjoint positive o...
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...
Two quadrature-based algorithms for computing the matrix fractional power $A^\alpha$ are presented i...
Abstract The purpose of this paper is to introduce a modification of q-Dunkl generalization of expon...
In many applied problems, efficient calculation of quadratures with high accuracy is required. The e...
In this paper, the authors investigated the concept of s,m-exponential-type convex functions and the...
Here we consider the ordinary and fractional approximation of functions by sublinear positive operat...
It is well known that the trapezoidal rule converges geometrically when applied to analytic function...
A new formula is obtained for fractional powers (−A)α of operators in a Banach space (which are gene...
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...
Here we consider the approximation of functions by sublinear positive operators with applications to...
In this paper, starting from the formulation of some possible models of fraction-al-order systems, s...
Here we consider the approximation of functions by sublinear positive operators with applications to...