An optimal algorithm for Global Optimization and adaptive covering

The general class of zero-order Global Optimization problems is split into subclasses according to a proposed “Complexity measure” and the computational complexity of each subclass is rigorously estimated. Then, the laboriousness (computational demand) of general Branch-and-Bound (BnB) methods is es...

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Veröffentlicht in:Journal of global optimization 2016-11, Vol.66 (3), p.535-572
Hauptverfasser: Shishkin, Serge L., Finn, Alan M.
Format: Artikel
Sprache:eng
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Zusammenfassung:The general class of zero-order Global Optimization problems is split into subclasses according to a proposed “Complexity measure” and the computational complexity of each subclass is rigorously estimated. Then, the laboriousness (computational demand) of general Branch-and-Bound (BnB) methods is estimated for each subclass. For conventional “Cubic” BnB based on splitting an n -dimensional cube into 2 n sub-cubes, both upper and lower laboriousness estimates are obtained. The value of the Complexity measure for a problem subclass enters linearly into all complexity and laboriousness estimates for that subclass. A new BnB method based on the lattice A n ∗ is presented with upper laboriousness bound that is, though conservative, smaller by a factor of O ( ( 4 / 3 ) n ) than the lower bound of the conventional method. The optimality of the new method is discussed. All results are extended to the class of Adaptive Covering problems—that is, covering of a large n-dimensional set by balls of different size, where the size of each ball is defined by a locally computed criterion.
ISSN:0925-5001
1573-2916
DOI:10.1007/s10898-016-0416-6