We consider the problem of numerical integration, where one aims to approximate an integral of a given continuous function from the function values at given sampling points, also known as quadrature points. A useful framework for such an approximation process is provided by the theory of reproducing kernel Hilbert spaces and the concept of the worst case quadrature error. However, the computation of optimal quadrature points, which minimize the worst case quadrature error, is in general a challenging task and requires efficient algorithms, in particular for large numbers of points. The focus of this thesis is on the efficient computation of optimal quadrature points on the torus T^d, the sphere S^d, and the rotation group SO(3). For that r...
Numerical minimisation of a cost function on Euclidean space is a well studied problem. Sometimes th...
We propose a theoretical framework, based on the theory of Sobolev spaces, that allows for a compreh...
In this paper we give an overview on well-known stability and convergence results for simple quadrat...
We consider the problem of numerical integration, where one aims to approximate an integral of a giv...
Abstract. The techniques and analysis presented in this paper provide new meth-ods to solve optimiza...
This paper provides an introduction to the topic of optimization on manifolds. The approach taken us...
In recent years, optimisation on manifolds has become a popular area of research. Applications in si...
Many problems in the sciences and engineering can be rephrased as optimization problems on matrix se...
This paper provides an introduction to the topic of optimization on manifolds. The approach taken u...
Summary. This paper provides an introduction to the topic of optimization on manifolds. The approac...
We tackle the problem of optimizing over all possible positive definite radial kernels on Riemannian...
Quadrature formulas for spheres, the rotation group, and other compact, homogeneous manifolds are im...
International audienceOptimisation algorithms such as the Newton method were first generalised to ma...
This thesis attempts to capture recent developments related to numerical integration on spheres of a...
In this research, some new and efficient quadrature rules are proposed involving the combination of ...
Numerical minimisation of a cost function on Euclidean space is a well studied problem. Sometimes th...
We propose a theoretical framework, based on the theory of Sobolev spaces, that allows for a compreh...
In this paper we give an overview on well-known stability and convergence results for simple quadrat...
We consider the problem of numerical integration, where one aims to approximate an integral of a giv...
Abstract. The techniques and analysis presented in this paper provide new meth-ods to solve optimiza...
This paper provides an introduction to the topic of optimization on manifolds. The approach taken us...
In recent years, optimisation on manifolds has become a popular area of research. Applications in si...
Many problems in the sciences and engineering can be rephrased as optimization problems on matrix se...
This paper provides an introduction to the topic of optimization on manifolds. The approach taken u...
Summary. This paper provides an introduction to the topic of optimization on manifolds. The approac...
We tackle the problem of optimizing over all possible positive definite radial kernels on Riemannian...
Quadrature formulas for spheres, the rotation group, and other compact, homogeneous manifolds are im...
International audienceOptimisation algorithms such as the Newton method were first generalised to ma...
This thesis attempts to capture recent developments related to numerical integration on spheres of a...
In this research, some new and efficient quadrature rules are proposed involving the combination of ...
Numerical minimisation of a cost function on Euclidean space is a well studied problem. Sometimes th...
We propose a theoretical framework, based on the theory of Sobolev spaces, that allows for a compreh...
In this paper we give an overview on well-known stability and convergence results for simple quadrat...