Solutions to combinatorial optimization problems frequently rely on heuristics to minimize an objective function. The optimum is sought iteratively and pre-setting the number of iterations dominates in operations research applications, which implies that the quality of the solution cannot be ascertained. Deterministic bounds offer a mean of ascertaining the quality, but such bounds are available for only a limited number of heuristics and the length of the interval may be difficult to control in an application. A small, almost dormant, branch of the literature suggests using statistical principles to derive statistical bounds for the optimum. We discuss alternative approaches to derive statistical bounds. We also assess their performance by...
This talk studies the value of randomized solutions (VRS) in distributionally robust mixed integer p...
We present an approach to couple the resolution of Combinatorial Optimization problems with methods ...
An $f(n)$ $\textit{dominance bound}$ on a heuristic for some problem is a guarantee that the heurist...
Solutions to combinatorial optimization problems, such as problems of locating facilities, frequentl...
The quality of a heuristic solution to a NP-hard combinatorial problem is hard to assess. A few stud...
Combinatorial optimization problems, are one of the most important types of problems in operational ...
In combinatorial optimization, a popular approach to NPhard problems is the design of approximation ...
Since the introduction of mathematical programming it has been all too easy to identify real-world p...
To have good data quality with high complexity is often seen to be important. Intuition says that th...
We consider optimization problems for which the best known approximation algorithms are randomized a...
. The analogy between combinatorial optimization and statistical mechanics has proven to be a fruitf...
Many optimization problems in computer science have been proven to be NP-hard, and it is unlikely th...
The known NP-hardness results imply that for many combinatorial optimization problems there are no e...
AbstractIn this paper, we establish some bounds for the probability that stimulated annealing produc...
In this paper, we compute the tightest possible bounds on the probability that the optimal value of ...
This talk studies the value of randomized solutions (VRS) in distributionally robust mixed integer p...
We present an approach to couple the resolution of Combinatorial Optimization problems with methods ...
An $f(n)$ $\textit{dominance bound}$ on a heuristic for some problem is a guarantee that the heurist...
Solutions to combinatorial optimization problems, such as problems of locating facilities, frequentl...
The quality of a heuristic solution to a NP-hard combinatorial problem is hard to assess. A few stud...
Combinatorial optimization problems, are one of the most important types of problems in operational ...
In combinatorial optimization, a popular approach to NPhard problems is the design of approximation ...
Since the introduction of mathematical programming it has been all too easy to identify real-world p...
To have good data quality with high complexity is often seen to be important. Intuition says that th...
We consider optimization problems for which the best known approximation algorithms are randomized a...
. The analogy between combinatorial optimization and statistical mechanics has proven to be a fruitf...
Many optimization problems in computer science have been proven to be NP-hard, and it is unlikely th...
The known NP-hardness results imply that for many combinatorial optimization problems there are no e...
AbstractIn this paper, we establish some bounds for the probability that stimulated annealing produc...
In this paper, we compute the tightest possible bounds on the probability that the optimal value of ...
This talk studies the value of randomized solutions (VRS) in distributionally robust mixed integer p...
We present an approach to couple the resolution of Combinatorial Optimization problems with methods ...
An $f(n)$ $\textit{dominance bound}$ on a heuristic for some problem is a guarantee that the heurist...