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DAGSTUHL
2004
2004
Optimal algorithms for global optimization in case of unknown Lipschitz constant
We consider the global optimization problem for d-variate Lipschitz functions which, in a certain sense, do not increase too slowly in a neighborhood of the global minimizer(s). On these functions, we apply optimization algorithms which use only function values. We propose two adaptive deterministic methods. The first one applies in a situation when the Lipschitz constant L is known. The second one applies if L is unknown. We show that for an optimal method, adaptiveness is necessary and that randomization (Monte-Carlo) yields no further advantage. Both algorithms presented have the optimal rate of convergence. Key words: Global optimization, Lipschitz functions, complexity, optimal rate of convergence MSC: primary 90C60, 90C56; secondary 68Q25, 26B35
Real-time TrafficDAGSTUHL 2004 | DAGSTUHL 2007 | Global Optimization | Global Optimization Problem | Lipschitz Functions |
| Added | 30 Oct 2010 |
| Updated | 30 Oct 2010 |
| Type | Conference |
| Year | 2004 |
| Where | DAGSTUHL |
| Authors | Matthias U. Horn |
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