Constrained ranking and selection (R&S) refers to the problem of selecting the best feasible design where both main objective and constraint measures need to be estimated via stochastic simulation. Despite the growing interests in constrained R&S, none has considered other selection qualities than a statistical measure called the probability of correct selection (!"#). In contrast, several new developments in other R&S literatures have considered financial significance as the selection quality. This paper aims to lay the foundation of using other selection qualities by attempting to minimize the opportunity cost in allocating the limited simulation budget. The opportunity cost is defined and two allocation rules which minim...
In many real-world applications, designs can only be evaluated pairwise, relative to each other. Nev...
This is the author accepted manuscript. The final version is available from ACM via the DOI in this ...
Selecting a subset of the best solutions among large-scale problems is an important area of research...
We consider subset selection problems in ranking and selection with tight computational budgets. We ...
We consider a class of the subset selection problem in ranking and selection. The objective is to id...
Ranking and selection procedures are standard methods for selecting the best of a finite number of s...
The methodology based on computing budget allocation is an effective tool in solving the problem of ...
This paper proposes a bound-based simulation budget allocation (BSBA) procedure for solving ranking ...
Ordinal Optimization offers an efficient approach for simulation optimization by focusing on ranking...
This article presents a novel heuristic for constrained optimization of computationally expensive ra...
Selection procedures are used in many applications to select the best of a finite set of alternative...
Statistical ranking and selection (R&S) is a collection of experiment design and analysis techniques...
This article presents a novel heuristic for constrained optimization of computationally expensive ra...
Statistical ranking and selection (R&S) is a collection of experiment design and analysis techniques...
We describe the basic principles of ranking and selection, a collection of experiment-design techniq...
In many real-world applications, designs can only be evaluated pairwise, relative to each other. Nev...
This is the author accepted manuscript. The final version is available from ACM via the DOI in this ...
Selecting a subset of the best solutions among large-scale problems is an important area of research...
We consider subset selection problems in ranking and selection with tight computational budgets. We ...
We consider a class of the subset selection problem in ranking and selection. The objective is to id...
Ranking and selection procedures are standard methods for selecting the best of a finite number of s...
The methodology based on computing budget allocation is an effective tool in solving the problem of ...
This paper proposes a bound-based simulation budget allocation (BSBA) procedure for solving ranking ...
Ordinal Optimization offers an efficient approach for simulation optimization by focusing on ranking...
This article presents a novel heuristic for constrained optimization of computationally expensive ra...
Selection procedures are used in many applications to select the best of a finite set of alternative...
Statistical ranking and selection (R&S) is a collection of experiment design and analysis techniques...
This article presents a novel heuristic for constrained optimization of computationally expensive ra...
Statistical ranking and selection (R&S) is a collection of experiment design and analysis techniques...
We describe the basic principles of ranking and selection, a collection of experiment-design techniq...
In many real-world applications, designs can only be evaluated pairwise, relative to each other. Nev...
This is the author accepted manuscript. The final version is available from ACM via the DOI in this ...
Selecting a subset of the best solutions among large-scale problems is an important area of research...