Banach-Mazur Distance from p3 to ∞3
Abstract
The maximum of the Banach-Mazur distance dBMM(X,∞n), where X ranges over the set of all n-dimensional real Banach spaces, is difficult to compute. In fact, it is already not easy to get the maximum of dBMM(pn,∞n) for all p∈ [1,∞]. We prove that dBMM(p3,∞3)≤ 9/5,~∀ p∈[1,∞]. As an application, the following result related to Borsuk's partition problem in Banach spaces is obtained: any subset A of p3 having diameter 1 is the union of 8 subsets of A whose diameters are at most 0.9.
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