International audienceMonte Carlo is one of the most versatile and widely used numerical methods. Its convergence rate, O(N~1^2), is independent of dimension, which shows Monte Carlo to be very robust but also slow. This article presents an introduction to Monte Carlo methods for integration problems, including convergence theory, sampling methods and variance reduction techniques. Accelerated convergence for Monte Carlo quadrature is attained using quasi-random (also called low-discrepancy) sequences, which are a deterministic alternative to random or pseudo-random sequences. The points in a quasi-random sequence are correlated to provide greater uniformity. The resulting quadrature method, called quasi-Monte Carlo, has a convergence r...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
his paper will trace the history and development of a useful stochastic method for approximating cer...
International audienceMonte Carlo is one of the most versatile and widely used numerical methods. It...
Abstract. Quasi-Monte Carlo methods are based on the idea that ran-dom Monte Carlo techniques can of...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...
Quasi-Monte Carlo methods are deterministic versions of Monte Carlo methods. Random numbers are repl...
Summary. This article presents a survey of low-discrepancy sequences and their applications to quasi...
AbstractWe study the approximation of d-dimensional integrals. We present sufficient conditions for ...
International audienceWe survey basic ideas and results on randomized quasi-Monte Carlo (RQMC) metho...
In this article we investigate Quasi-Monte Carlo methods for multidimensional improper integrals wit...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
Quasi-Monte Carlo (QMC) methods have been successfully used for the estimation of numerical integrat...
Randomized quasi-Monte Carlo methods have been introduced with the main purpose of yielding a comput...
This paper introduces and illustrates a new version of the Monte Carlo method that has attractive pr...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
his paper will trace the history and development of a useful stochastic method for approximating cer...
International audienceMonte Carlo is one of the most versatile and widely used numerical methods. It...
Abstract. Quasi-Monte Carlo methods are based on the idea that ran-dom Monte Carlo techniques can of...
The standard Monte Carlo approach to evaluating multi-dimensional integrals using (pseudo)-random in...
Quasi-Monte Carlo methods are deterministic versions of Monte Carlo methods. Random numbers are repl...
Summary. This article presents a survey of low-discrepancy sequences and their applications to quasi...
AbstractWe study the approximation of d-dimensional integrals. We present sufficient conditions for ...
International audienceWe survey basic ideas and results on randomized quasi-Monte Carlo (RQMC) metho...
In this article we investigate Quasi-Monte Carlo methods for multidimensional improper integrals wit...
This talk gives an introduction to quasi-Monte Carlo methods for high-dimensional integrals. Such me...
Quasi-Monte Carlo (QMC) methods have been successfully used for the estimation of numerical integrat...
Randomized quasi-Monte Carlo methods have been introduced with the main purpose of yielding a comput...
This paper introduces and illustrates a new version of the Monte Carlo method that has attractive pr...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
his paper will trace the history and development of a useful stochastic method for approximating cer...