arXiv:math/0201077 Abstract

arXiv:math/0201077 [math.GN]Abstract References Reviews Resources

A family of pseudo metrics on B^3 and its application

Published 2002-01-10, updated 2007-02-15Version 5

Let B^3 be the closed unit ball in R^3 and S^2 its boundary. We define a family of pseudo metrics on B^3. As an application, We prove that for any countable-to-one function f:S^2\to [0,a], the set NM^n_f={x\in S^2 | there exists y\in S^2 such that f(x)-f(y)>nd_E(x,y)} is uncountable for all natural number n, where d_E is the Euclidean metric on R^3.

Comments: 14 pages, 5 figures, A section of v3 is appeared on Rocky Mountain Journal of Mathematics 36(2006) no.6 1927-1935. Similar construction is in GN/0702453

Categories: math.GN, math.GT

Subjects: 57N05, 57M40

Keywords: pseudo metrics, application, closed unit ball, countable-to-one function, natural number

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