Kirszbraun-type Theorems For Graphs
Abstract
The classical Kirszbraun theorem says that all 1-Lipschitz functions f:A Rn, A⊂ Rn, with the Euclidean metric have a 1-Lipschitz extension to Rn. For metric spaces X,Y we say that Y is X-Kirszbraun if all 1-Lipschitz functions f:A Y, A⊂ X, have a 1-Lipschitz extension to~X. We analyze the case when X and Y are graphs with the usual path metric. We prove that Zd-Kirszbraun graphs are exactly graphs that satisfies a certain Helly property. We also consider complexity aspects of these properties.
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