High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and chemistry of molecules, statistical mechanics and more recently, in financial applications. In order to approximate multidimensional integrals, one may use Monte Carlo methods in which the quadrature points are generated randomly or quasi-Monte Carlo methods, in which points are generated deterministically. One particular class of quasi-Monte Carlo methods for multivariate integration is represented by lattice rules. Lattice rules constructed throughout this thesis allow good approximations to integrals of functions belonging to certain weighted function spaces. These function spaces were proposed as an explanation as to why integrals in many ...
For high dimensional numerical integration, lattice rules have long been seen as point sets with a p...
summary:Many low-discrepancy sets are suitable for quasi-Monte Carlo integration. Skriganov showed t...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
There are many problems in mathematical finance which require the evaluation of a multivariate integ...
Abstract. Lattice rules are a family of equal-weight cubature formulas for approximating highdimensi...
Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces of functio...
Although many applications involve integrals over unbounded domains, most of the theory for numerica...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
AbstractWe approximate weighted integrals over Euclidean space by using shifted rank-1 lattice rules...
This paper reviews recent work on numerical multiple integration over the d- dimensional unit cube ...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
AbstractHere we investigate some procedures for the randomization of lattice rules for numerical mul...
Lattice rules are quasi-Monte Carlo methods for numerical multiple integration that are based on the...
For high dimensional numerical integration, lattice rules have long been seen as point sets with a p...
summary:Many low-discrepancy sets are suitable for quasi-Monte Carlo integration. Skriganov showed t...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
There are many problems in mathematical finance which require the evaluation of a multivariate integ...
Abstract. Lattice rules are a family of equal-weight cubature formulas for approximating highdimensi...
Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces of functio...
Although many applications involve integrals over unbounded domains, most of the theory for numerica...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
AbstractWe approximate weighted integrals over Euclidean space by using shifted rank-1 lattice rules...
This paper reviews recent work on numerical multiple integration over the d- dimensional unit cube ...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
AbstractHere we investigate some procedures for the randomization of lattice rules for numerical mul...
Lattice rules are quasi-Monte Carlo methods for numerical multiple integration that are based on the...
For high dimensional numerical integration, lattice rules have long been seen as point sets with a p...
summary:Many low-discrepancy sets are suitable for quasi-Monte Carlo integration. Skriganov showed t...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...