Selecting a subset of the best solutions among large-scale problems is an important area of research. When the alternative solutions are stochastic in nature, then it puts more burden on the problem. The objective of this paper is to select a set that is likely to contain the actual best solutions with high probability. If the selected set contains all the best solutions, then the selection is denoted as correct selection. We are interested in maximizing the probability of this selection; P(CS). In many cases, the available computation budget for simulating the solution set in order to maximize P(CS) is limited. Therefore, instead of distributing these computational efforts equally likely among the alternatives, the optimal computing budget...
Ordinal Optimization has emerged as an efficient technique for simulation and optimization. Exponent...
In this paper, we develop an optimal computing budget allocation (OCBA) algorithm for selecting a su...
Tabu search (TS) is a powerful method for solving combinatorial optimization problems. However, when...
Ordinal Optimization offers an efficient approach for simulation optimization by focusing on ranking...
The methodology based on computing budget allocation is an effective tool in solving the problem of ...
Statistical selection procedures are used to select the best simulated system from a finite set of a...
We consider subset selection problems in ranking and selection with tight computational budgets. We ...
We consider an expected-value ranking and selection problem where all k solutions' simulation output...
In this tutorial we consider the problem of finding the best set up to use for a system, where the o...
Sampling-based stochastic programs are extensively applied in practice. However, the resulting model...
Our problem is that of finding the best system—i.e., the system with the largest or smallest primary...
In this paper we address the problem of finding the simulated system with the best (maximum or minim...
Simulation is widely used to identify the best of a finite set of proposed systems, where 'best' is ...
We consider a class of the subset selection problem in ranking and selection. The objective is to id...
Discrete-event systems (DES) simulation is a popular tool for analyzing systems and evaluating decis...
Ordinal Optimization has emerged as an efficient technique for simulation and optimization. Exponent...
In this paper, we develop an optimal computing budget allocation (OCBA) algorithm for selecting a su...
Tabu search (TS) is a powerful method for solving combinatorial optimization problems. However, when...
Ordinal Optimization offers an efficient approach for simulation optimization by focusing on ranking...
The methodology based on computing budget allocation is an effective tool in solving the problem of ...
Statistical selection procedures are used to select the best simulated system from a finite set of a...
We consider subset selection problems in ranking and selection with tight computational budgets. We ...
We consider an expected-value ranking and selection problem where all k solutions' simulation output...
In this tutorial we consider the problem of finding the best set up to use for a system, where the o...
Sampling-based stochastic programs are extensively applied in practice. However, the resulting model...
Our problem is that of finding the best system—i.e., the system with the largest or smallest primary...
In this paper we address the problem of finding the simulated system with the best (maximum or minim...
Simulation is widely used to identify the best of a finite set of proposed systems, where 'best' is ...
We consider a class of the subset selection problem in ranking and selection. The objective is to id...
Discrete-event systems (DES) simulation is a popular tool for analyzing systems and evaluating decis...
Ordinal Optimization has emerged as an efficient technique for simulation and optimization. Exponent...
In this paper, we develop an optimal computing budget allocation (OCBA) algorithm for selecting a su...
Tabu search (TS) is a powerful method for solving combinatorial optimization problems. However, when...