Add to ORKGWe study numerical approximations of integrals [0,1]s f(x) dx by averaging the func-tion at some sampling points. Monte Carlo (MC) sampling yields a convergence of the root mean square error (RMSE) of order N−1/2 (where N is the number of samples). Quasi-Monte Carlo (QMC) sampling on the other hand achieves a convergence of order N−1+ε, for any ε> 0. Randomized QMC (RQMC), a combination of MC and QMC, achieves a RMSE of order N−3/2+ε. A combination of RQMC with local antithetic sam-pling achieves a convergence of the RMSE of order N−3/2−1/s+ε (where s ≥ 1 is the dimension). QMC, RQMC and RQMC with local antithetic sampling require that the integrand has some smoothness (for instance, bounded variation). Stronger smoothness assumptions on...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
We prove that a class of Monte Carlo methods, including averages based on randomized digital nets, L...
This paper is a contemporary review of QMC (“Quasi-Monte Carlo”) meth-ods, i.e., equal-weight rules ...
AbstractHybrids of equidistribution and Monte Carlo methods of integration can achieve the superior ...
This article studies the variance of quadrature over a scrambled union of two nets, ( 0 ; 0; m; s)-n...
Quasi-Monte Carlo is usually employed to speed up the convergence of Monte Carlo in approximating mu...
Quasi-Monte Carlo rules are equal weight integration formulas used to approximate integrals over the...
Quasi-Monte Carlo (QMC) methods have been successfully used for the estimation of numerical integrat...
Exact error estimates for evaluating multi-dimensional integrals are considered. An estimate is call...
AbstractHybrids of equidistribution and Monte Carlo methods of integration can achieve the superior ...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
Abstract. Let P ⊂ [0, 1)S be a finite point set of cardinality N in an S-dimensional cube, and let f...
The efficient construction of higher-order interlaced polynomial lattice rules introduced recently i...
Let $f$ be analytic on $[0,1]$ with $|f^{(k)}(1/2)|\leq A\alpha^kk!$ for some constant $A$ and $\alp...
In some definite integral problems the analytical solution is either unknown or hard to compute. As ...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
We prove that a class of Monte Carlo methods, including averages based on randomized digital nets, L...
This paper is a contemporary review of QMC (“Quasi-Monte Carlo”) meth-ods, i.e., equal-weight rules ...
AbstractHybrids of equidistribution and Monte Carlo methods of integration can achieve the superior ...
This article studies the variance of quadrature over a scrambled union of two nets, ( 0 ; 0; m; s)-n...
Quasi-Monte Carlo is usually employed to speed up the convergence of Monte Carlo in approximating mu...
Quasi-Monte Carlo rules are equal weight integration formulas used to approximate integrals over the...
Quasi-Monte Carlo (QMC) methods have been successfully used for the estimation of numerical integrat...
Exact error estimates for evaluating multi-dimensional integrals are considered. An estimate is call...
AbstractHybrids of equidistribution and Monte Carlo methods of integration can achieve the superior ...
This paper is a contemporary review of quasi-Monte Carlo (QMC) methods, that is, equal-weight rules ...
Abstract. Let P ⊂ [0, 1)S be a finite point set of cardinality N in an S-dimensional cube, and let f...
The efficient construction of higher-order interlaced polynomial lattice rules introduced recently i...
Let $f$ be analytic on $[0,1]$ with $|f^{(k)}(1/2)|\leq A\alpha^kk!$ for some constant $A$ and $\alp...
In some definite integral problems the analytical solution is either unknown or hard to compute. As ...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
We prove that a class of Monte Carlo methods, including averages based on randomized digital nets, L...
This paper is a contemporary review of QMC (“Quasi-Monte Carlo”) meth-ods, i.e., equal-weight rules ...