Controlling Lipschitz functions
Abstract
Given any positive integers m and d, we say the a sequence of points (xi)i∈ I in Rm is Lipschitz-d-controlling if one can select suitable values yi\; (i∈ I) such that for every Lipschitz function f: Rm→ Rd there exists i with |f(xi)-yi|<1. We conjecture that for every m d, a sequence (xi)i∈ I⊂ Rm is d-controlling if and only if n∈ N|\i∈ I\, :\, |xi| n\|nd=∞. We prove that this condition is necessary and a slightly stronger one is already sufficient for the sequence to be d-controlling. We also prove the conjecture for m=1.
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