Opportunistic evolution: efficient evolutionary computation on large-scale computational grids
Proceedings of the 10th annual conference companion on Genetic and evolutionary computation
Tracer spectrum: a visualisation method for distributed evolutionary computation
Genetic Programming and Evolvable Machines
On the effectiveness of crossover for migration in parallel evolutionary algorithms
Proceedings of the 13th annual conference on Genetic and evolutionary computation
The Gestalt heuristic: emerging abstraction to improve combinatorial search
Natural Computing: an international journal
Homogeneous and heterogeneous island models for the set cover problem
PPSN'12 Proceedings of the 12th international conference on Parallel Problem Solving from Nature - Volume Part I
A fuzzy evolutionary framework for combining ensembles
Applied Soft Computing
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Island models (IMs) are a class of distributed evolutionary algorithms (EAs) in which the population is split into multiple sub-populations called islands. Separate EAs run independently on each island, but they interact by means of migrating individuals. Therefore, IMs are different both from a single-population standard EA, as well as from a set of multiple isolated EAs. IMs are interesting for several reasons. They have been reported to yield better results than standard EAs. IMs are also advantageous when computational tasks must be distributed across multiple machines because their structure is easy to parallelize. However, despite many studies, no comprehensive theory describing their behavior has been developed. Due to the lack of theory and a complex architecture with many control parameters, setting up IMs has been a trial-and-error process, guided mostly by “rules of thumb.” In this dissertation, I adopt a two-level (intra- and inter-island) view of IMs and show how this approach makes understanding their dynamics easier. They behave very differently than standard EAs, and in order to take full advantage of this, I propose a better utilization of the inter-island level of evolution. In particular, I argue for setups with many relatively small islands, and I also show that compositional evolution may scale to the inter-island level. The two levels of evolution influence each other, and I analyze this interaction more deeply. Migrations profoundly change the local dynamics and stimulate evolution, which often ultimately results in better performance. I study the role of genetic operators in this behavior and also create mathematical models of after-migration dynamics. This analysis gives us a better understanding of mixing and the survival of genes locally, and these processes in turn determine the type and level of interaction between islands globally. Further, using island heterogeneity enhances the inter-island evolution. Following the study, I analyze IM behavior on a range of test problems, including two complex domains. This dissertation improves our understanding of the dynamics of IMs and suggests a qualitative change in the way we think about them. This perspective offers new guidelines for configuring IM parameters and opens new directions for future work.