AbstractWe prove error bounds on the worst-case error for integration in certain Korobov and Sobolev spaces using rank-1 lattice rules with generating vectors constructed by the component-by-component algorithm. For a prime number of points n a rate of convergence of the worst-case error for multivariate integration in Korobov spaces of O(n−α/2+δ), where α>1 is a parameter of the Korobov space and δ is an arbitrary positive real number, has been shown by Kuo. First we improve the constant of this error bound. Further, we prove an error bound which shows that the rate of convergence is optimal up to a power of logn for prime n. These error bounds are then generalised to the case where the number of points is not a prime number.Numerical resu...
The (fast) component-by-component (CBC) algorithm is an efficient tool for the construction of gener...
We approximate $d$-variate periodic functions in weighted Korobov spaces with general weight paramet...
In this paper, we study an efficient algorithm for constructing point sets underlying quasi-Monte Ca...
AbstractWe prove error bounds on the worst-case error for integration in certain Korobov and Sobolev...
AbstractIt is known from the analysis by Sloan and Woźniakowski that under appropriate conditions on...
Abstract. Lattice rules are a family of equal-weight cubature formulas for approximating highdimensi...
We study multivariate integration of functions that are invariant under permutations (of subsets) of...
It is known that the generating vector of a rank-1 lattice rule can be constructed component-by-comp...
We study multivariate integration of functions that are invariant under the permutation (of a subset...
AbstractWe develop algorithms to construct rank-1 lattice rules in weighted Korobov spaces of period...
Abstract. It is known that the generating vector of a rank-1 lattice rule can be constructed compone...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
Lattice rules for numerical integration were introduced by Korobov in 1959. They were constructed to...
The component-by-component construction is the standard method of finding good lattice rules or poly...
There are many problems in mathematical finance which require the evaluation of a multivariate integ...
The (fast) component-by-component (CBC) algorithm is an efficient tool for the construction of gener...
We approximate $d$-variate periodic functions in weighted Korobov spaces with general weight paramet...
In this paper, we study an efficient algorithm for constructing point sets underlying quasi-Monte Ca...
AbstractWe prove error bounds on the worst-case error for integration in certain Korobov and Sobolev...
AbstractIt is known from the analysis by Sloan and Woźniakowski that under appropriate conditions on...
Abstract. Lattice rules are a family of equal-weight cubature formulas for approximating highdimensi...
We study multivariate integration of functions that are invariant under permutations (of subsets) of...
It is known that the generating vector of a rank-1 lattice rule can be constructed component-by-comp...
We study multivariate integration of functions that are invariant under the permutation (of a subset...
AbstractWe develop algorithms to construct rank-1 lattice rules in weighted Korobov spaces of period...
Abstract. It is known that the generating vector of a rank-1 lattice rule can be constructed compone...
In the conducted research we develop efficient algorithms for constructing node sets of high-quality...
Lattice rules for numerical integration were introduced by Korobov in 1959. They were constructed to...
The component-by-component construction is the standard method of finding good lattice rules or poly...
There are many problems in mathematical finance which require the evaluation of a multivariate integ...
The (fast) component-by-component (CBC) algorithm is an efficient tool for the construction of gener...
We approximate $d$-variate periodic functions in weighted Korobov spaces with general weight paramet...
In this paper, we study an efficient algorithm for constructing point sets underlying quasi-Monte Ca...