Randomized quasi-Monte Carlo methods have been introduced with the main purpose of yielding a computable measure of error for quasi-Monte Carlo approximations through the implicit application of a central limit theorem over independent randomizations. But to increase precision for a given computational budget, the number of independent randomizations is usually set to a small value so that a large number of points are used from each randomized low-discrepancy sequence to benefit from the fast convergence rate of quasi-Monte Carlo. While a central limit theorem has been previously established for a specific but impractical type of randomization, it is also known in general that fixing the number of randomizations and increasing the length of...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...
International audienceWe survey basic ideas and results on randomized quasi-Monte Carlo (RQMC) metho...
Quasi-Monte Carlo algorithms are studied for designing discrete approximationsof two-stage linear st...
Randomized quasi-Monte Carlo methods have been introduced with the main purpose of yielding a comput...
International audienceRandomized quasi-Monte Carlo (RQMC) can produce an estimator of a mean (i.e., ...
International audienceRandomized Quasi-Monte Carlo (RQMC) methods provide unbiased estimators whose ...
In problems of moderate dimensions, the quasi-Monte Carlo method usually provides better estimates t...
International audienceMonte Carlo is one of the most versatile and widely used numerical methods. It...
International audienceWe compare two approaches for quantile estimation via randomized quasi-Monte C...
AbstractWe study the approximation of d-dimensional integrals. We present sufficient conditions for ...
This paper develops a general central limit theorem (CLT) for post-stratified Monte Carlo estimators...
filters, ” refers to a general class of iterative algorithms that performs Monte Carlo approximation...
This paper develops a general central limit theorem (CLT) for post-stratified Monte Carlo estimators...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...
International audienceWe survey basic ideas and results on randomized quasi-Monte Carlo (RQMC) metho...
Quasi-Monte Carlo algorithms are studied for designing discrete approximationsof two-stage linear st...
Randomized quasi-Monte Carlo methods have been introduced with the main purpose of yielding a comput...
International audienceRandomized quasi-Monte Carlo (RQMC) can produce an estimator of a mean (i.e., ...
International audienceRandomized Quasi-Monte Carlo (RQMC) methods provide unbiased estimators whose ...
In problems of moderate dimensions, the quasi-Monte Carlo method usually provides better estimates t...
International audienceMonte Carlo is one of the most versatile and widely used numerical methods. It...
International audienceWe compare two approaches for quantile estimation via randomized quasi-Monte C...
AbstractWe study the approximation of d-dimensional integrals. We present sufficient conditions for ...
This paper develops a general central limit theorem (CLT) for post-stratified Monte Carlo estimators...
filters, ” refers to a general class of iterative algorithms that performs Monte Carlo approximation...
This paper develops a general central limit theorem (CLT) for post-stratified Monte Carlo estimators...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...
International audienceWe survey basic ideas and results on randomized quasi-Monte Carlo (RQMC) metho...
Quasi-Monte Carlo algorithms are studied for designing discrete approximationsof two-stage linear st...