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2011

Untangling planar graphs from a specified vertex position - Hard cases

13 years 6 months ago
Untangling planar graphs from a specified vertex position - Hard cases
Given a planar graph G, we consider drawings of G in the plane where edges are represented by straight line segments (which possibly intersect). Such a drawing is specified by an injective embedding π of the vertex set of G into the plane. Let fix(G, π) be the maximum integer k such that there exists a crossing-free redrawing π′ of G which keeps k vertices fixed, i.e., there exist k vertices v1, . . . , vk of G such that π(vi) = π′ (vi) for i = 1, . . . , k. Given a set of points X, let fixX (G) denote the value of fix(G, π) minimized over π locating the vertices of G on X. The absolute minimum of fix(G, π) is denoted by fix(G). For the wheel graph Wn, we prove that fixX (Wn) ≤ (2 + o(1)) √ n for every X. With a somewhat worse constant factor this is as well true for the fan graph Fn. We inspect also other graphs for which it is known that fix(G) = O( √ n). We also show that the minimum value fix(G) of the parameter fixX (G) is always attainable by a collin...
Mihyun Kang, Oleg Pikhurko, Alexander Ravsky, Math
Added 13 May 2011
Updated 13 May 2011
Type Journal
Year 2011
Where DAM
Authors Mihyun Kang, Oleg Pikhurko, Alexander Ravsky, Mathias Schacht, Oleg Verbitsky
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