We present quasi-Monte Carlo analogs of Monte Carlo methods for some linear algebra problems: solving systems of linear equations, computing extreme eigenvalues, and matrix inversion. Reformulating the problems as solving integral equations with a special kernels and domains permits us to analyze the quasi-Monte Carlo methods with bounds from numerical integration. Standard Monte Carlo methods for integration provide a convergence rate of O(N^(−1/2)) using N samples. Quasi-Monte Carlo methods use quasirandom sequences with the resulting convergence rate for numerical integration as good as O((logN)^k)N^(−1)). We have shown theoretically and through numerical tests that the use of quasirandom sequences improves both the magnitude of the e...
Many problems in science and engineering can be represented by Systems of Linear Algebraic Equations...
This article provides an overview of some interfaces between the theory of quasi-Monte Carlo (QMC) m...
Linear algebra operations play an important role in scientific computing and data analysis. With inc...
Abstract. The convergence of Monte Carlo method for numerical in-tegration can often be improved by ...
Abstract. Quasi-Monte Carlo methods are based on the idea that ran-dom Monte Carlo techniques can of...
AbstractWe briefly discuss the following issues in quasi-Monte Carlo methods: error bounds and error...
International audienceA new Walk on Equations (WE) Monte Carlo algorithm for Linear Algebra (LA) pro...
AbstractWe study the approximation of d-dimensional integrals. We present sufficient conditions for ...
The problem of obtaining the smallest and the largest generalised eigenvalues using quasi Monte Carl...
International audienceMonte Carlo is one of the most versatile and widely used numerical methods. It...
Quasi-Monte Carlo algorithms are studied for designing discrete approximationsof two-stage linear st...
AbstractRecently, quasi-Monte Carlo algorithms have been successfully used for multivariate integrat...
In this work we study the computational complexity of a class of grid Monte Carlo algorithms for int...
In this paper we deal with performance analysis of Monte Carlo algorithm for large linear algebra pr...
Quasi-Monte Carlo algorithms are studied for designing discrete ap-proximations of two-stage linear ...
Many problems in science and engineering can be represented by Systems of Linear Algebraic Equations...
This article provides an overview of some interfaces between the theory of quasi-Monte Carlo (QMC) m...
Linear algebra operations play an important role in scientific computing and data analysis. With inc...
Abstract. The convergence of Monte Carlo method for numerical in-tegration can often be improved by ...
Abstract. Quasi-Monte Carlo methods are based on the idea that ran-dom Monte Carlo techniques can of...
AbstractWe briefly discuss the following issues in quasi-Monte Carlo methods: error bounds and error...
International audienceA new Walk on Equations (WE) Monte Carlo algorithm for Linear Algebra (LA) pro...
AbstractWe study the approximation of d-dimensional integrals. We present sufficient conditions for ...
The problem of obtaining the smallest and the largest generalised eigenvalues using quasi Monte Carl...
International audienceMonte Carlo is one of the most versatile and widely used numerical methods. It...
Quasi-Monte Carlo algorithms are studied for designing discrete approximationsof two-stage linear st...
AbstractRecently, quasi-Monte Carlo algorithms have been successfully used for multivariate integrat...
In this work we study the computational complexity of a class of grid Monte Carlo algorithms for int...
In this paper we deal with performance analysis of Monte Carlo algorithm for large linear algebra pr...
Quasi-Monte Carlo algorithms are studied for designing discrete ap-proximations of two-stage linear ...
Many problems in science and engineering can be represented by Systems of Linear Algebraic Equations...
This article provides an overview of some interfaces between the theory of quasi-Monte Carlo (QMC) m...
Linear algebra operations play an important role in scientific computing and data analysis. With inc...