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GD
2009
Springer
2009
Springer
Drawing Hamiltonian Cycles with No Large Angles
Let n ≥ 4 be even. It is shown that every set S of n points in the plane can be connected by a (possibly self-intersecting) spanning tour (Hamiltonian cycle) consisting of n straight line edges such that the angle between any two consecutive edges is at most 2π/3. For n = 4 and 6, this statement is tight. It is also shown that every even-element point set S can be partitioned into at most two subsets, S1 and S2, each admitting a spanning tour with no angle larger than π/2. Fekete and Woeginger conjectured that for sufficiently large even n, every n-element set admits such a spanning tour. We confirm this conjecture for point sets in convex position. A much stronger result holds for large point sets randomly and uniformly selected from an open region bounded by finitely many rectifiable curves: for any ε > 0, these sets almost surely admit a spanning tour with no angle larger than ε.
Real-time Traffic| Added | 24 Jul 2010 |
| Updated | 24 Jul 2010 |
| Type | Conference |
| Year | 2009 |
| Where | GD |
| Authors | Adrian Dumitrescu, János Pach, Géza Tóth |
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