Context The Next Release Problem involves determining the set of requirements to implement in the next release of a software project. When the problem was first formulated in 2001, Integer Linear Programming, an exact method, was found to be impractical because of large execution times. Since then, the problem has mainly been addressed by employing metaheuristic techniques. Objective In this paper, we investigate if the single-objective and bi-objective Next Release Problem can be solved exactly and how to better approximate the results when exact resolution is costly. Methods We revisit Integer Linear Programming for the single-objective version of the problem. In addition, we integrate it within the Epsilon-constraint method ...
This thesis consists in determining which genetic algorithm performs better to solve the Next Releas...
PhD ThesisThe thesis is concerned largely with Gomory s Method of Integer Forms whereby an intege...
Exactly solving multiobjective integer programming (MOIP) problems is often a very time-consuming pr...
AbstractContextThe Next Release Problem involves determining the set of requirements to implement in...
The Next Release Problem consists in selecting a subset of requirements to develop in the next rele...
Abstract One important issue addressed by software companies is to determine which features should b...
The real world applications of optimisation algorithms often are only interested in the running time...
In software industry, a common problem that the companies face is to decide what requirements should...
Abstract. Selection of the requirements for the next release of a software product is a inherently c...
For software vendors, the process to determine the requirements for the next release of a software p...
We propose an Integer Linear Programming (ILP) approach for solving integer programming problems wit...
Companies developing and maintaining complex software systems need to determine the features that sh...
Many optimal scheduling and resource allocation problems involve large number of integer variables a...
Many real-world optimisation problems involve multiple objectives. When considered concurrently, the...
This article presents an algorithm that finds an e-feasible solution relatively to some constraints ...
This thesis consists in determining which genetic algorithm performs better to solve the Next Releas...
PhD ThesisThe thesis is concerned largely with Gomory s Method of Integer Forms whereby an intege...
Exactly solving multiobjective integer programming (MOIP) problems is often a very time-consuming pr...
AbstractContextThe Next Release Problem involves determining the set of requirements to implement in...
The Next Release Problem consists in selecting a subset of requirements to develop in the next rele...
Abstract One important issue addressed by software companies is to determine which features should b...
The real world applications of optimisation algorithms often are only interested in the running time...
In software industry, a common problem that the companies face is to decide what requirements should...
Abstract. Selection of the requirements for the next release of a software product is a inherently c...
For software vendors, the process to determine the requirements for the next release of a software p...
We propose an Integer Linear Programming (ILP) approach for solving integer programming problems wit...
Companies developing and maintaining complex software systems need to determine the features that sh...
Many optimal scheduling and resource allocation problems involve large number of integer variables a...
Many real-world optimisation problems involve multiple objectives. When considered concurrently, the...
This article presents an algorithm that finds an e-feasible solution relatively to some constraints ...
This thesis consists in determining which genetic algorithm performs better to solve the Next Releas...
PhD ThesisThe thesis is concerned largely with Gomory s Method of Integer Forms whereby an intege...
Exactly solving multiobjective integer programming (MOIP) problems is often a very time-consuming pr...