This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules for the approximate evaluation of high-dimensional integrals over the unit cube $[0,1]^s$. It first introduces the by-now standard setting of weighted Hilbert spaces of functions with square-integrable mixed first derivatives, and then indicates alternative settings, such as non-Hilbert spaces, that can sometimes be more suitable. Original contributions include the extension of the fast component-by-component (CBC) construction of lattice rules that achieve the optimal convergence order (a rate of almost $1/N$, where $N$ is the number of points, independently of dimension) to so-called “product and order dependent” (POD) weights, as seen in s...
AbstractWe study the worst-case error of quasi-Monte Carlo (QMC) rules for multivariate integration ...
Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces of functio...
Recently, quasi-Monte Carlo methods have been successfully used for approximating multiple integrals...
This paper is a contemporary review of QMC ("quasi-Monte Carlo") methods, i.e., equal-weight rules f...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
This paper is a contemporary review of QMC (“Quasi-Monte Carlo”) meth-ods, i.e., equal-weight rules ...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
The efficient construction of higher-order interlaced polynomial lattice rules introduced recently i...
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 rules are equal weight integration formulas used to approximate integrals over the...
The aim of this research is to develop algorithms to approximate the solutions of problems defined o...
AbstractWe study the worst-case error of quasi-Monte Carlo (QMC) rules for multivariate integration ...
Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces of functio...
Recently, quasi-Monte Carlo methods have been successfully used for approximating multiple integrals...
This paper is a contemporary review of QMC ("quasi-Monte Carlo") methods, i.e., equal-weight rules f...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
This paper is a contemporary review of QMC (“Quasi-Monte Carlo”) meth-ods, i.e., equal-weight rules ...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
The efficient construction of higher-order interlaced polynomial lattice rules introduced recently i...
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 rules are equal weight integration formulas used to approximate integrals over the...
The aim of this research is to develop algorithms to approximate the solutions of problems defined o...
AbstractWe study the worst-case error of quasi-Monte Carlo (QMC) rules for multivariate integration ...
Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces of functio...
Recently, quasi-Monte Carlo methods have been successfully used for approximating multiple integrals...