Chebyshev Distance

Roland Coghetto

doi:10.1515/forma-2016-0010

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Chebyshev Distance

Formalized Mathematics

Volume 24 (2016): Issue 2 (June 2016)

By: Roland Coghetto

Open Access

|Dec 2016

Abstract

In [21], Marco Riccardi formalized that ℝN-basis n is a basis (in the algebraic sense defined in [26]) of $ℰ_{T}^{n}$ ${\cal E}_T^n $ and in [20] he has formalized that $ℰ_{T}^{n}$ ${\cal E}_T^n $ is second-countable, we build (in the topological sense defined in [23]) a denumerable base of $ℰ_{T}^{n}$ ${\cal E}_T^n $.

Then we introduce the n-dimensional intervals (interval in n-dimensional Euclidean space, pavé (borné) de ℝⁿ[16], semi-intervalle (borné) de ℝⁿ[22]).

We conclude with the definition of Chebyshev distance [11].

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