Covering of high-dimensional sets
Abstract
Let (X,) be a metric space and λ be a Borel measure on this space defined on the σ-algebra generated by open subsets of X; this measure λ defines volumes of Borel subsets of X. The principal case is where X = Rd, is the Euclidean metric, and λ is the Lebesgue measure. In this article, we are not going to pay much attention to the case of small dimensions d as the problem of construction of good covering schemes for small d can be attacked by the brute-force optimization algorithms. On the contrary, for medium or large dimensions (say, d≥ 10), there is little chance of getting anything sensible without understanding the main issues related to construction of efficient covering designs.
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