We consider a class of the subset selection problem in ranking and selection. The objective is to identify the top m out of k designs based on simulated output. Traditional procedures are conservative and inefficient. Using the optimal computing budget allocation framework, we formulate the problem as that of maximizing the probability of correc tly selecting all of the top-m designs subject to a constraint on the total number of samples available. For an approximation of this corre ct selection probability, we derive an asymptotically optimal allocat ion and propose an easy-to-implement heuristic sequential allocation procedure. Numerical experiments indicate that the resulting allocatio ns are superior to other methods in the literature...
In this tutorial we consider the problem of finding the best set up to use for a system, where the o...
Abstract. Ordinal Optimization has emerged as an efficient technique for simulation and optimization...
Tabu search (TS) is a powerful method for solving combinatorial optimization problems. However, when...
We consider subset selection problems in ranking and selection with tight computational budgets. We ...
In many real-world applications, designs can only be evaluated pairwise, relative to each other. Nev...
This paper proposes a bound-based simulation budget allocation (BSBA) procedure for solving ranking ...
The methodology based on computing budget allocation is an effective tool in solving the problem of ...
Constrained ranking and selection (R&S) refers to the problem of selecting the best feasible des...
Statistical selection procedures are used to select the best simulated system from a finite set of a...
This is the author accepted manuscript. The final version is available from ACM via the DOI in this ...
10.1109/CoASE.2012.6386330IEEE International Conference on Automation Science and Engineering230-23
We consider the problem of allocating a given simulation budget among a set of design alternatives i...
Selecting a subset of the best solutions among large-scale problems is an important area of research...
In this paper we address the problem of finding the simulated system with the best (maximum or minim...
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...
Abstract. Ordinal Optimization has emerged as an efficient technique for simulation and optimization...
Tabu search (TS) is a powerful method for solving combinatorial optimization problems. However, when...
We consider subset selection problems in ranking and selection with tight computational budgets. We ...
In many real-world applications, designs can only be evaluated pairwise, relative to each other. Nev...
This paper proposes a bound-based simulation budget allocation (BSBA) procedure for solving ranking ...
The methodology based on computing budget allocation is an effective tool in solving the problem of ...
Constrained ranking and selection (R&S) refers to the problem of selecting the best feasible des...
Statistical selection procedures are used to select the best simulated system from a finite set of a...
This is the author accepted manuscript. The final version is available from ACM via the DOI in this ...
10.1109/CoASE.2012.6386330IEEE International Conference on Automation Science and Engineering230-23
We consider the problem of allocating a given simulation budget among a set of design alternatives i...
Selecting a subset of the best solutions among large-scale problems is an important area of research...
In this paper we address the problem of finding the simulated system with the best (maximum or minim...
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...
Abstract. Ordinal Optimization has emerged as an efficient technique for simulation and optimization...
Tabu search (TS) is a powerful method for solving combinatorial optimization problems. However, when...