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GD
2001
Springer
2001
Springer
Low-Distortion Embeddings of Trees
We prove that every tree T = (V, E) on n vertices with edges of unit length can be embedded in the plane with distortion O( √ n); that is, we construct a mapping f: V → R2 such that ρ(u, v) ≤ f(u) − f(v) ≤ O( √ n) · ρ(u, v) for every u, v ∈ V , where ρ(u, v) denotes the length of the path from u to v in T. The embedding is described by a simple and easily computable formula. This is asymptotically optimal in the worst case. We also construct interesting optimal embeddings for a special class of trees (fans consisting of paths of the same length glued together at a common vertex). Communicated by: P. Mutzel and M. J¨unger; submitted May 2002; revised April 2003. The research was supported by project LN00A056 of the Ministry of Education of the Czech Republic and by Charles University grants No. 158/99 and 159/99.
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| Added | 28 Jul 2010 |
| Updated | 28 Jul 2010 |
| Type | Conference |
| Year | 2001 |
| Where | GD |
| Authors | Robert Babilon, Jirí Matousek, Jana Maxová, Pavel Valtr |
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