In this paper we analyze the approximation of multivariate integrals over the Euclidean space for functions which are analytic. We show explicit upper bounds which attain the exponential rate of convergence. We use an infinite grid with different mesh sizes in each direction to sample the function, and then truncate it. In our analysis, the mesh sizes and the truncated domain are chosen by optimally balancing the truncation error and the discretization error. This paper derives results in comparable function space settings, extended to $\R^s$, as which were recently obtained in the unit cube by Dick, Larcher, Pillichshammer and Wo{\'z}niakowski (2011). They showed that both lattice rules and regular grids, with different mesh sizes i...
We study multivariate integration over the s-dimensional unit cube in a weighted space of infinitely...
AbstractWe prove error bounds on the worst-case error for integration in certain Korobov and Sobolev...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
In this paper we analyze the approximation of multivariate integrals over the Euclidean space for fu...
We study multivariate integration over R^s for analytic functions. For functions characterized by an...
In this talk we study multivariate integration over R^s for weighted analytic functions, whose Fouri...
In this talk we study multivariate integration over R^s for weighted function space of infinitely ma...
Although many applications involve integrals over unbounded domains, most of the theory for numerica...
We study multivariate integration of functions that are invariant under permutations (of subsets) of...
Abstract. We study the optimal rate of convergence of algorithms for integrating and approximating d...
AbstractWe study the multivariate integration problem ∫Rdf(x)ρ(x)dx, with ρ being a product of univa...
A theorem is proved concerning approximation of analytic functions by multivariate polynomials in th...
Abstract. Lattice rules are a family of equal-weight cubature formulas for approximating highdimensi...
AbstractIt is known from the analysis by Sloan and Woźniakowski that under appropriate conditions on...
We study multivariate integration of functions that are invariant under the permutation (of a subset...
We study multivariate integration over the s-dimensional unit cube in a weighted space of infinitely...
AbstractWe prove error bounds on the worst-case error for integration in certain Korobov and Sobolev...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
In this paper we analyze the approximation of multivariate integrals over the Euclidean space for fu...
We study multivariate integration over R^s for analytic functions. For functions characterized by an...
In this talk we study multivariate integration over R^s for weighted analytic functions, whose Fouri...
In this talk we study multivariate integration over R^s for weighted function space of infinitely ma...
Although many applications involve integrals over unbounded domains, most of the theory for numerica...
We study multivariate integration of functions that are invariant under permutations (of subsets) of...
Abstract. We study the optimal rate of convergence of algorithms for integrating and approximating d...
AbstractWe study the multivariate integration problem ∫Rdf(x)ρ(x)dx, with ρ being a product of univa...
A theorem is proved concerning approximation of analytic functions by multivariate polynomials in th...
Abstract. Lattice rules are a family of equal-weight cubature formulas for approximating highdimensi...
AbstractIt is known from the analysis by Sloan and Woźniakowski that under appropriate conditions on...
We study multivariate integration of functions that are invariant under the permutation (of a subset...
We study multivariate integration over the s-dimensional unit cube in a weighted space of infinitely...
AbstractWe prove error bounds on the worst-case error for integration in certain Korobov and Sobolev...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...