Abstract
Some powerful algorithms for multi-extremal non-convex-constrained optimization problems are based on reducing these multi-dimensional problems to those of one dimension by applying Peano-type space-filling curves mapping a unit interval on the real axis onto a multi-dimensional hypercube. Here is presented and substantiated a new scheme simultaneously employing several joint Peano-type scannings which conducts the property of nearness of points in many dimensions to a property of nearness of pre-images of these points in one dimension significantly better than in the case of a scheme with a single space-filling curve. Sufficient conditions of global convergence for the new scheme are investigated.
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Strongin, R.G. Algorithms for multi-extremal mathematical programming problems employing the set of joint space-filling curves. J Glob Optim 2, 357–378 (1992). https://doi.org/10.1007/BF00122428
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DOI: https://doi.org/10.1007/BF00122428