Hybrid Random Concentrated Optimization Without Convexity Assumption
Abstract
We propose a new random method to minimize deterministic continuous functions over subsets S of high-dimensional space RK without assuming convexity. Our procedure alternates between a Global Search (GS) regime to identify candidates and a Concentrated Search (CS) regime to improve an eligible candidate in the constraint set S. Beyond the alternation between those completely different regimes, the originality of our approach lies in leveraging high dimensionality. We demonstrate rigorous concentration properties under the CS regime. In parallel, we also show that GS reaches any point in S in finite time. Finally, we demonstrate the relevance of our new method by giving two concrete applications. The first deals with the reduction of the 1-norm of a LASSO solution. Secondly, we compress a neural network by pruning weights while maintaining performance; our approach achieves significant weight reduction with minimal performance loss, offering an effective solution for network optimization.
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