There are many problems in mathematical finance which require the evaluation of a multivariate integral. Since these problems typically involve the discretisation of a continuous random variable, the dimension of the integrand can be in the thousands, tens of thousands or even more.For such problems the Monte Carlo method has been a powerful and popular technique. This is largely related to the fact that the performance of the method is independent of the number of dimensions. Traditional quasi-Monte Carlo techniques are typically not independent of the dimension and as such have not been suitable for high-dimensional problems. However, recent work has developed new types of quasi-Monte Carlo point sets which can be used in practically limi...
In some definite integral problems the analytical solution is either unknown or hard to compute. As ...
Lattice rules are quasi-Monte Carlo methods for numerical multiple integration that are based on the...
AbstractWe study the problem of multivariate integration on the unit cube for unbounded integrands. ...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
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...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
For high dimensional numerical integration, lattice rules have long been seen as point sets with a p...
Recently, quasi-Monte Carlo methods have been successfully used for approximating multiple integrals...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
The aim of this research is to develop algorithms to approximate the solutions of problems defined o...
In this paper, we study an efficient algorithm for constructing point sets underlying quasi-Monte Ca...
This paper reviews recent work on numerical multiple integration over the d- dimensional unit cube ...
Integration lattices are one of the main types of low discrepancy sets used in quasiMonte Carlo meth...
The aim of this research is to develop algorithms to approximate the solutions of problems defined o...
In some definite integral problems the analytical solution is either unknown or hard to compute. As ...
Lattice rules are quasi-Monte Carlo methods for numerical multiple integration that are based on the...
AbstractWe study the problem of multivariate integration on the unit cube for unbounded integrands. ...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
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...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
For high dimensional numerical integration, lattice rules have long been seen as point sets with a p...
Recently, quasi-Monte Carlo methods have been successfully used for approximating multiple integrals...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
The aim of this research is to develop algorithms to approximate the solutions of problems defined o...
In this paper, we study an efficient algorithm for constructing point sets underlying quasi-Monte Ca...
This paper reviews recent work on numerical multiple integration over the d- dimensional unit cube ...
Integration lattices are one of the main types of low discrepancy sets used in quasiMonte Carlo meth...
The aim of this research is to develop algorithms to approximate the solutions of problems defined o...
In some definite integral problems the analytical solution is either unknown or hard to compute. As ...
Lattice rules are quasi-Monte Carlo methods for numerical multiple integration that are based on the...
AbstractWe study the problem of multivariate integration on the unit cube for unbounded integrands. ...