Faster Black-Box Algorithms Through Higher Arity Operators
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We extend the work of Lehre and Witt (GECCO 2010) on the unbiased black-box model by considering higher arity variation operators. In particular, we show that already for binary operators the black-box complexity of drops from Θ(n^2) for unary operators to O(n n). For , the Ω(n n) unary black-box complexity drops to O(n) in the binary case. For k-ary operators, k ≤ n, the -complexity further decreases to O(n/ k).
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