Distinct volume subsets
Abstract
Suppose that a and d are positive integers with a ≥ 2. Let ha,d(n) be the largest integer t such that any set of n points in Rd contains a subset of t points for which all the non-zero volumes of the t a subsets of order a are distinct. Beginning with Erdos in 1957, the function h2,d(n) has been closely studied and is known to be at least a power of n. We improve the best known bound for h2,d(n) and show that ha,d(n) is at least a power of n for all a and d.
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