Add to ORKGWe introduce a criterion for the evaluation of multidimensional quadrature, or cu-bature, rules for the hypercube: this is the merit of a rule, which is closely related to its trigonometric degree, and which reduces to the Zaremba gure of merit in the case of a lattice rule. We derive a family of rules Q s k having dimension s and merit
AbstractThere has been a great deal of research into good algorithms for approximating multidimensio...
AbstractWe consider lattice rules (i.e. cubature formulas with equal coefficients whose nodes lie on...
Lattice rules are a type of integration rules designed for periodic multivariate functions on a unit...
We introduce a criterion for the evaluation of multidimensional quadrature, or cubature, rules for t...
Abstract. A systematic search for optimal lattice rules of specified trigonometric degree d over the...
In this paper some of the results of a recent computer search [CoLy99] for optimal three- and four-d...
AbstractFor periodic integrands with unit period in each variable, certain error bounds for lattice ...
In classical multivariate quadrature with product rules it is natural to select an appropriate one-d...
Abstract For periodic integrands with unit period in each variable certain error bounds for lattic...
Lattice rules are quasi-Monte Carlo methods for numerical multiple integration that are based on the...
In this paper some of the results of a recent computer search [CoLy99] for optimal three- and four-d...
AbstractAn elementary introduction to lattices, integration lattices and lattice rules is followed b...
Lattice quadrature rules were introduced by Frolov (1977), Sloan (1985) and Sloan and Kachoyan (1987...
We give an explicit formula for the figure of merit ρN of 2-dimensional rank 2 lattice rules in term...
AbstractFor periodic integrands with unit period in each variable, certain error bounds for lattice ...
AbstractThere has been a great deal of research into good algorithms for approximating multidimensio...
AbstractWe consider lattice rules (i.e. cubature formulas with equal coefficients whose nodes lie on...
Lattice rules are a type of integration rules designed for periodic multivariate functions on a unit...
We introduce a criterion for the evaluation of multidimensional quadrature, or cubature, rules for t...
Abstract. A systematic search for optimal lattice rules of specified trigonometric degree d over the...
In this paper some of the results of a recent computer search [CoLy99] for optimal three- and four-d...
AbstractFor periodic integrands with unit period in each variable, certain error bounds for lattice ...
In classical multivariate quadrature with product rules it is natural to select an appropriate one-d...
Abstract For periodic integrands with unit period in each variable certain error bounds for lattic...
Lattice rules are quasi-Monte Carlo methods for numerical multiple integration that are based on the...
In this paper some of the results of a recent computer search [CoLy99] for optimal three- and four-d...
AbstractAn elementary introduction to lattices, integration lattices and lattice rules is followed b...
Lattice quadrature rules were introduced by Frolov (1977), Sloan (1985) and Sloan and Kachoyan (1987...
We give an explicit formula for the figure of merit ρN of 2-dimensional rank 2 lattice rules in term...
AbstractFor periodic integrands with unit period in each variable, certain error bounds for lattice ...
AbstractThere has been a great deal of research into good algorithms for approximating multidimensio...
AbstractWe consider lattice rules (i.e. cubature formulas with equal coefficients whose nodes lie on...
Lattice rules are a type of integration rules designed for periodic multivariate functions on a unit...