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GECCO
2008
Springer
2008
Springer
Focused no free lunch theorems
Proofs and empirical evidence are presented which show that a subset of algorithms can have identical performance over a subset of functions, even when the subset of functions is not closed under permutation. We refer to these as focused sets. In some cases focused sets correspond to the orbit of a permutation group; in other cases, the focused sets must be computed heuristically. In the smallest case, two algorithms can have identical performance over just two functions in a focused set. These results particularly exploit the case where search is limited to m steps, where m is significantly smaller than the size of the search space. Category and Subject Descriptors: I.2.8 [Artificial Intelligence]: Problem Solving, Control Methods, Search General Terms: Theory, Algorithms
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| Added | 09 Nov 2010 |
| Updated | 09 Nov 2010 |
| Type | Conference |
| Year | 2008 |
| Where | GECCO |
| Authors | Darrell Whitley, Jonathan E. Rowe |
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