Add to ORKG2We consider the approximation of the inverse square root of regularly accretive operators in Hilbert spaces. The approximation is of rational type and comes from the use of the Gauss-Legendre rule applied to a special integral formulation of the problem. We derive sharp error estimates, based on the use of the numerical range, and provide some numerical experiments. For practical purposes, the finite dimensional case is also considered. In this setting, the convergence is shown to be of exponential type.reservedmixedE. Denich, P. NovatiDenich, E.; Novati, P
AbstractThe aim of this paper is the investigation of the error which results from the method of app...
AbstractA solution of linear operator equations in the Hilbert space is constructed by using the bes...
Abstract. In this paper we study algorithms to find a Gaussian approximation to a target measure def...
AbstractRichardson's “extrapolation to the limit” idea is applied to the method of regularization fo...
Abstract. We give several properties of the reproducing kernel Hilbert space induced by the Gaussian...
The Gaussian kernel plays a central role in machine learning, uncertainty quantification and scatter...
In this paper, we present a comprehensive overview of (perhaps) all possible approximations resultin...
Abstract: We deal with the numerical evaluation of the Hilbert transform on the real line by a Gauss...
This paper is devoted to the study of approximation of Gaussian functions bytheir partial Fourier su...
We develop two algorithms for the numerical evaluation of the semi-infinite Hilbert Transform of fun...
We study worst-case optimal approximation of positive linear functionals in reproducing kernel Hilbe...
AbstractWe derive in this paper the asymptotic estimates of the nodes and weights of the Gauss–Lobat...
This article derives an accurate, explicit, and numerically stable approximation to the kernel quadr...
In this paper we present an extension of our previous research, focusing on a method to numerically ...
AbstractThis paper is concerned with estimates for the error when a Gauss-Legendre quadrature rule i...
AbstractThe aim of this paper is the investigation of the error which results from the method of app...
AbstractA solution of linear operator equations in the Hilbert space is constructed by using the bes...
Abstract. In this paper we study algorithms to find a Gaussian approximation to a target measure def...
AbstractRichardson's “extrapolation to the limit” idea is applied to the method of regularization fo...
Abstract. We give several properties of the reproducing kernel Hilbert space induced by the Gaussian...
The Gaussian kernel plays a central role in machine learning, uncertainty quantification and scatter...
In this paper, we present a comprehensive overview of (perhaps) all possible approximations resultin...
Abstract: We deal with the numerical evaluation of the Hilbert transform on the real line by a Gauss...
This paper is devoted to the study of approximation of Gaussian functions bytheir partial Fourier su...
We develop two algorithms for the numerical evaluation of the semi-infinite Hilbert Transform of fun...
We study worst-case optimal approximation of positive linear functionals in reproducing kernel Hilbe...
AbstractWe derive in this paper the asymptotic estimates of the nodes and weights of the Gauss–Lobat...
This article derives an accurate, explicit, and numerically stable approximation to the kernel quadr...
In this paper we present an extension of our previous research, focusing on a method to numerically ...
AbstractThis paper is concerned with estimates for the error when a Gauss-Legendre quadrature rule i...
AbstractThe aim of this paper is the investigation of the error which results from the method of app...
AbstractA solution of linear operator equations in the Hilbert space is constructed by using the bes...
Abstract. In this paper we study algorithms to find a Gaussian approximation to a target measure def...