We consider randomized QMC methods for approximating the expected recourse in two-stage stochastic optimization problems containing mixed-integer decisions in the second stage. It is known that the second-stage optimal value function is piecewise linear-quadratic with possible kinks and discontinuities at the boundaries of certain convex polyhedral sets. This structure is exploited to provide conditions implying that first and higher order terms of the integrand’s ANOVA decomposition (Math. Comp. 79 (2010), 953–966) have mixed weak first order partial derivatives. This leads to a good smooth approximation of the integrand and, hence, to good convergence rates of randomized QMC methods if the effective (superposition) dimension is lo...
AbstractIn problems of moderate dimensions, the quasi-Monte Carlo method usually provides better est...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
In this paper, we consider a class of stochastic mathematical programs with equilibrium constraints ...
We consider randomized QMC methods for approximating the expected recourse in two-stage stochastic ...
Quasi-Monte Carlo algorithms are studied for generating scenarios to solve two-stage linear stochast...
Quasi-Monte Carlo algorithms are studied for designing discrete approximationsof two-stage linear st...
Quasi-Monte Carlo algorithms are studied for designing discrete approximations of two-stage linear s...
Quasi-Monte Carlo algorithms are studied for designing discrete approximations of two-stage linear s...
Quasi-Monte Carlo algorithms are studied for designing discrete ap-proximations of two-stage linear ...
This paper studies the use of randomized Quasi-Monte Carlo methods (RQMC) in sample approximations o...
Mixed-integer two-stage stochastic programs with fixed recourse matrix, random recourse costs, techno...
This article provides an overview of some interfaces between the theory of quasi-Monte Carlo (QMC) m...
This paper studies the use of randomized Quasi-Monte Carlo methods (RQMC) in sam-ple approximations ...
Abstract. In this paper, we consider a class of stochastic mathematical programs with equilibrium co...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
AbstractIn problems of moderate dimensions, the quasi-Monte Carlo method usually provides better est...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
In this paper, we consider a class of stochastic mathematical programs with equilibrium constraints ...
We consider randomized QMC methods for approximating the expected recourse in two-stage stochastic ...
Quasi-Monte Carlo algorithms are studied for generating scenarios to solve two-stage linear stochast...
Quasi-Monte Carlo algorithms are studied for designing discrete approximationsof two-stage linear st...
Quasi-Monte Carlo algorithms are studied for designing discrete approximations of two-stage linear s...
Quasi-Monte Carlo algorithms are studied for designing discrete approximations of two-stage linear s...
Quasi-Monte Carlo algorithms are studied for designing discrete ap-proximations of two-stage linear ...
This paper studies the use of randomized Quasi-Monte Carlo methods (RQMC) in sample approximations o...
Mixed-integer two-stage stochastic programs with fixed recourse matrix, random recourse costs, techno...
This article provides an overview of some interfaces between the theory of quasi-Monte Carlo (QMC) m...
This paper studies the use of randomized Quasi-Monte Carlo methods (RQMC) in sam-ple approximations ...
Abstract. In this paper, we consider a class of stochastic mathematical programs with equilibrium co...
The aim of my research was to develop new and powerful mathematical tools for computationally challe...
AbstractIn problems of moderate dimensions, the quasi-Monte Carlo method usually provides better est...
We introduce stochastic integer programs with dominance constraints induced by mixed-integer linear ...
In this paper, we consider a class of stochastic mathematical programs with equilibrium constraints ...